Nonlinear Analysis

Topics are

\begin{equation}{\label{a}}\tag{A}\mbox{}\end{equation}

Banach Algebras.

\item Alexamder, J.C.:
Compact Banach Algebras,
{\em Proc. London Math. Soc.} 18 (1968) 1-18.

\item Alling, N.L. and Campbell, L.A.:
Real Banach Algebras II,
{\em Math. Z.} 125 (1972) 79-100.

\item Ambrose, W.:
Structure Theorems for a Special Class of Banach Algebras,
{\em Trans. Amer. Math. Soc.} 57 (1945) 364-386.

\item Arens, R.:
Extensions of Banach Algebras,
{\em }1-16.

\item Arhippainen, J. and M\”{u}ller, V.:
Norms on Unitizations of Banach Algebras Revisited,
{\em Acta Math. Hungar} 114 (2007) 201-204.

\item Bade, W.G. adn Curtis, P.C.:
Homomorphisms of Commutative Banach Algebras,
{\em American Journal of Mathematics} 82 (1960) 589-608.

\item Bade, W.G. adn Curtis, P.C.:
Embedding Theorems for Commutative Banach Algebras,
{\em Pacific Journal of Mathematics} 18 (1966) 391-409.

\item Barnes, B.A.:
On the Existence of Minimal Ideals in a Banach Algebra,
{\em Trans. Amer. Math. Soc.} 133 (1968) 511-517.

\item Barnes, B.A.:
Banach Algebras which are Ideals in a Banach Algebras,
{\em Pacific Journal of Mathematics} 38 (1971) 1-7.

\item Beauwens, R. and Van Binnebeek, J.-J.: (Banach Algebras)
Convergence Theorems in Banach Algebras,
{\em Pacific Journal of Mathematics} 68 (1977) 13-24.

\item Behncke, H.:
Nilpotent Elements in Banach Algebras,
{\em Proc. Amer. Math. Soc.} 37 (1973) 137-141.

\item Bhatt, S.J. and Dedania, H.V.:
Uniqueness of the Uniform Norm and Adjoining Identity in Banach Algebras,
{\em Proc. Indian Acad. Sci.} 105 (1995) 405-409.

\item Bhatt, S.J. and Dedania, H.V.:
Banach Algebras with Unique Uniform Norm,
{\em Proc. Amer. Math. Soc.} 124 (1996) 579-584.

\item Birtel, F.T.:
On a Commutative Extension of a Banach Algebra,
{\em Proc. Amer. Math. Soc.} 13 (1962) 815-822.

\item Bohnenblust, H.F. and Karlin, S.:
Geometrical Properties of the Unit Sphere of Banach Algebras,
{\em Annals of Mathematics} 62 (1955) 217-229.

\item Bonsall, F.F.:
A Survey of Banach Algebra Theory,
{\em Bull. London Math. Soc.} 2 (1970) 257-274.

\item Bonsall, F.F:
A Minimal Property of the Norm in Some Banach Algebras,
{\em } 156-164.

\item Bonsall, F.F. and Duncan, J.:
Dual Representations of Banach Algebras,
{\em }80-102.

\item Bre\v{s}ar, M.:
On Automorphism of Banach Algebras,
{\em Archiv der Mathematik} 78 (2002) 297-320.

\item Bridges, D., Havea, R. and Schuster, P.:
Ideals in Constructive Banach Algebra Theory,
{\em Journal of Complexity} 22 (2006) 729-737.

\item Brown, D.T.:
A Class of Banach Algebras with a Unique Norm Topology,
{\em Proc. Amer. Math. Soc.} 17 (1966) 1429-1434.

\item Buoni, J.J.:
Differentiability in Banach Algebras,
{\em The American Mathematical Monthly} 81 (1974) 493-495.

\item Burnham, J.T.:
Closed Ideals in Subalgebras of Banach Algebras II: Ditkin’s Condition,
{\em Monatshefte f\”{u}r Mathematik 78 (1974) 1-3.

\item Civin, P. and Yood, B.:
Involutions on Banach Algebras,
{\em } 415-436.

\item Coddington, E.A.:
Some Banach Algebras,
{\em Proc. Amer. Math. Soc.} 8 (1957) 258-261.

\item Cui, J.L., Hou, J.C.:
A Characterization of Homomorphism between Banach Algebras,
{\em Acta Mathematica Sinica} 20 (2004) 761-768.

\item Dales, H.G. and McClure, J.P.:
Continuity of Homomorphisms into Certain Commutative Banach Algebras,
{\em Proc. London Math. Soc.} 26 (1973) 69-81.

\item Dhage, B.C.:
On a Fixed Point Theorem in Banach Algebras with Applications
{\em Applied Mathematics Letters} 18 (2005) 273-280.

\item Dietrich, W.E.:
On the Ideal Structure of Banach Algebras,
{\em Trans. Amer. Math. Soc.} 169 (1972) 59-74.

\item Feinstein, J.F. and Kamowitz, H.:
Quasicompact and Riesz Endomorphism of Banach Algebras,
{\em Journal of Functional Analysis} 225 (2005) 427-438.

\item Fell, J.M.G.:
The Dual Spaces of Banach Algebras,
{\em Trans. Amer. Math. Soc.} 114 (1965) 227-250.

\item Filali, M.:
The Ideal Structure of Some Banach Algebras,
{\em Math. Proc. Camb. Phil. Soc.} 111 (1992) 567-576.

\item Gaur, A.K. and Kov\'{a}\v{r}\'{i}k, Z.V.:
Norms on Unitizations of Banach Algebras,
{\em Proc. Amer. Math. Soc.} 117 (1993) 111-113.

\item Gelbaum, B.R.:
Note on the Tensor Product of Banach Algebras,
{\em Proc. Amer. Math. Soc.} 12 (1961) 750-757.

\item Gelbaum, B.R.:
Banach Algebras and Their Applications,
{\em The American Mathematical Monthly} 71 (1964) 248-256.

\item Gelbaum, B.R.:
Tensor Products of Banach Algebras II,
{\em Proc. Amer. Math. Soc.} 25 (1970) 470-474.

\item Ghahramani, F., Lau, A.T. and Losert, L.V.:
Isometric Isomorphisms between Banach Algebras Related to Locally Compact Groups,
{\em Trans. Amer. Math. Soc.} 321 (1990) 273-283.

\item Giotopoulos, S.:
Single Elements in Banach Algebras,
{\em Journal of Mathematical Analysis and Applications} 270 (2002) 129-142.

\item Glickfeld, B.W.:
The Riemann Sphere of a Commutative Banach Algebra,
{\em Trans. Amer. Math. Soc.} 134 (1968) 1-28.

\item Grabiner, S.:
Nilpotents in Banach Algebras,
{\em Journal of London Math. Soc.} 14 (1976) 7-12.

\item Green, M.D.:
Maximal One-Sided Ideals in Banach Algebras,
{\em Math. Proc. Camb. Phil. Soc.} 80 (1976) 109-111.

\item Guerrero, J.B., Burgos, M., Kaidi, E.A. and Rodr\'{i}guez-Palacios, A.:
Nonassociative Unitary Banach Algebras,
{\em Journal of Algebra} 320 (2008) 3383-3397.

\item Hansen, M.L., Kadison, R.V.:
Banach Algebras with Unitary Norms,
{\em Pacific Journal of Mathematics} 175 (1996) 535-552.

\item Hausner, A.:
Ideals in Certain Banach Algebra,
{\em Proc. Amer. Math. Soc.} 8 (1957) 246-249.

\item Hedberg, L.I.:
The Stone-Weierstrass Theorem in Certain Banach Algebras of Fourier Type,
{\em Arkiv F\”{o}r Matematik} Band 6 nr 5 (1965) 77-102.

\item Herzog, G. and Schmoeger, C.:
An Example on Ordered Banach Algebras,
{\em Proc. Amer. Math. Soc.} 135 (2007) 3949-3954.

\item Huang, D.:
Generalized Inverses over Banach Algebras,
{\em Integr. Equat. Oper. Th.} 15 (1992) 454-469.

\item Huang, Q. and Ma, J.:
On the Semi-Continuity of Generalized Inverse in Banach Algebras,
{\em Linear Algebra and Its Applications} 419 (2006) 172-179.

\item Ingelstam, L.:
Real Banach Algebras,
{\em Arkiv F\”{o}r Matematik} Band 5 nr 16, 239-270.

\item Jarosz, K.:
Isometries in Semisimple, Commutaive Banach Algebra,
{\em Proc. Amer. Math. Soc.} 94 (1985) 65-71.

\item Johnson, B.E.:
Automorphisms of Commutative Banach Algebras,
{\em Proc. Amer. Math. Soc.} 40 (1973) 497-499.

\item Johnson, B.E.:
Weakly Compact Homomorphisms between Banach Algebras,
{\em Math. Proc. Camb. Phil. Soc.} 112 (1992) 157-163.

\item Johnson, G.P.:
Spaces of Functions with Values in a Banach Algebra,
{\em Trans. Amer. Math. Soc.} 92 (1959) 411-429.

\item Kamowitz, H.:
Compact Endomorphisms of Banach Algebras,
{\em Pacific Journal of Mathematics} 89 (1980) 313-325.

\item Kaplansky, I.:
Symmetry of Banach Algebras,
{\em Proc. Amer. Math. Soc.} 3 (1952) 396-399.

\item Katznelson, Y. and Rudin, W.:
The Stone-Weierstrass Property in Banach Algebras,
{\em } 253-265.

\item Kelley, J.L. and Vaught, R.L.:
The Positive Cone in Banach Algebra,
{\em Trans. Amer. Math. Soc.} 74 (1953) 44-55.

\item Keown, E.R.:
Reflexive Banach Algebras,
{\em Proc. Amer. Math. Soc.} 6 (1955) 252-259.

\item Kolha, J.J.:
Some Convergence Theorems in Banach Algebras,
{\em Pacific Journal of Mathematics} 52 (1974) 467-473.

\item Koopman, B.O.:
A Probabilistic Generalization of Matric Banach Algebras,
{\em Proc. Amer. Math. Soc.} 2 (1951) 404-413.

\item Laursen, K.B.:
Continuity of Homomorphisms from $C^{*}$-Algebras into Commutative Banach Algebra,
{\em Journal of London Math. Soc.} 36 (1987) 165-175.

\item Leptin, H.:
On Symmetry of Some Banach Algebras,
{\em Pacific Journal of Mathematics} 53 (1974) 203-206.

\item Loy, R.J.:
Uniqueness of the Complete Norm Topology and Continuity of Derivations on Banach Algebras,
{\em Tohoku Math. Journal} 22 (1970) 371-378.

\item Loy, R.J.:
Commutative Banach Algebras with Non-Unique Complete Norm Topology,
{\em Bull. Austral. Math. Soc.} 10 (1974) 409-420.

\item Loy, R.J.:
Multilinear Mappings and Banach Algebras,
{\em Journal of London Math. Soc.} 14 (1976) 423-429.

\item Lucht, L.:
An Application of Banach Algebra Techniques to Multiplicative Functions,
{\em Mathematische Zeitschrift} 214 (1993) 287-295.

\item Miao, T.:
Unital Banach Algebras and Their Subalgebras,
{\em Math. Proc. Camb. Phil. Soc.} 143 (2007) 343-347.

\item Mustafayev, H.S.:
A Class of Banach Algebras whose Duals have the Randon-Nikodym Property,
{\em Archiv der Mathematik} 87 (2006) 449-457.

\item Nieto, J.I.:
Gateaux Differentials in Banach Algebras,
{\em Math. Z.} 139 (1974) 23-34.

\item Olubummo, A.:
On the Existence of an Absolutely Minimal Norm in a Banach Algebra,
{\em Proc. Amer. Math. Soc.} 11 (1960) 718-722.

\item Pt\'{a}k, V.:
Banach Algebras with Involution,
{\em Manuscripta Math.} 6 (1972) 245-290.

\item Rickart, C.E.:
Banach Algebras with an Adjoint Operation,
{\em The Annals of Mathematics} 47 (1946) 528-550.

\item Rickart, C.E.:
The Uniqueness of Norm Problem in Banach Algebras,
{\em The Annals of Mathematics} 51 (1950) 615-628.

\item Rickart, C.E.:
An Elementary Proof of a Fundamental Theorem in the Theory of Banach Algebras,
{\em } 75-78.

\item Saworotnow, P.P.:
Generalized Positive Linear Functionals on a Banach Algebra with an Involution,
{\em Proc. Amer. Math. Soc.} 31 (1972) 299-304.

\item Sherbert, D.R.:
Banach Algebras of Lipschitz Functions,
{\em }1387-1399.

\item Sinclair, A.M.:
Continuous Derivations on Banach Algebras,
{\em Proc. Amer. Math. Soc.} 20 (1969) 166-170.

\item Smyth, M.R.F.:
Riesz Theory in Banach Algebras,
{\em Math. Z.} 145 (1975) 145-155.

\item Somerset, D.W.B.:
Minimal Primal Ideals in Banach Algebras,
{\em Math. Proc. Camb. Phil. Soc.} 115 (1994) 39-52.

\item Tomiyama, J.:
Tensor Products of Commutative Banach Algebras,
{\em } 148-154.

\item Torrance, E.:
Maximal $C^{*}$-Subalgebras of a Banach Algebra,
{\em Proc. Amer. Math. Soc.} 25 (1970) 622-624.

\item Villena, A.R.:
Elements in a Commutative Banach Algebra Determining the Norm Topology,
{\em Proc. Amer. Math. Soc.} 129 (2000) 1057-1064.

\item Walsh, B.:
Algebras of Scalar-Type Elements,
{\em Proc. Amer. Math. Soc.} 16 (1965) 1167-1170.

\item White, A.J.:
Ordered Banach Algebras,
{\em Journal of London Math. Soc.} 11 (1975) 175-178.

\item Wong, P.-K.:
On Dual Banach Algebras,
{\em Proc. Amer. Math. Soc.} 108 (1990) 899-904.

\item Yood, B.:
Banach Algebras of Continuous Functions,
{\em American Journal of Mathematics} 73 (1951) 30-42.

\item Yood, B.:
Topological Properties of Homomorphisms between Banach Algebras,
{\em American Journal of Mathematics} 76 (1954) 155-167.

\item Yood, B.:
Commutativity Theorems for Banach Algebras,
{\em Michigan Mathematics Journal} 37 (1990) 203-210.

\item Zame, W.R.:
Strong Uniqueness of the Functional Calculus for Some Commutative Banach Algebras,
{\em Journal of London Math. Soc.} 13 (1976) 13-18.

\item Zhang, Y.:
Nilpotent Ideals in a Class of Banach Algebras,
{\em Proc. Amer. Math. Soc.} 127 (1999) 3237-3242.

\begin{equation}{\label{b}}\tag{B}\mbox{}\end{equation}

Bernstein Polynomials.

\item Abel, U., Gupta, V. and Mohapatra, R.N.:
Local Approximation by a Variant of Bernstein-Durmeyer Operators,
{\em Nonlinear Analysis} 68 (2008) 3372-3381.

\item Abel, U. and Li, Z.:
A New Proof of an Identity of Jetter and St\”{o}ckler for Multivariate Bernstein Polynomials,
Computer Aided Geometric Design} 23 (2006) 297-301.

\item Babu, G.J., Canty, A.J. and Chaubey, Y.P.:
Application of Bernstein Polynomials for Smooth Estimation of a Distribution and Density Function,
{\em Journal of Statistical Planning and Inference} 105 (2002) 377-392.

\item Babu, G.J. and Chaubey, Y.P.:
Smooth Estimation of a Distribution and Density Function on a Hypercube Using Bernstein Polynomials for Dependent Random Vectors,
{\em Statistics and Probability Letters} 76 (2006) 959-969.

\item Baj\v{s}anski, B. and Bojani\'{c}, R.:
A Note on Approximation by Bernstein Polynomials,
{\em } (1964) 675-677.

\item Bhatta, D. and Bhatti, M.I.:
Numerical Solution of KdV Equation Using Modified Bernstein Polynomials,
{\em Applied Mathematics and Computation} 174 (2006) 1255-1268.

\item Bhatti, M.I. and Bracken, P.:
Solutions of Differential Equations in a Bernstein Polynomials Basis,
{\em Journal of Computational and Applied Mathematics} 205 (2007) 272-280.

\item Boyer, R.P.:
Generalized Bernstein Polynomials and Symmetric Functions,
{\em Advances in Applied Mathematics} 28 (2002) 17-39.

\item Braess, D. and Sauer, T.:
Bernstein Polynomials and Learning Theory,
{\em Journal of Approximation Theory} 128 (2004) 187-206.

\item Bustoz, J. and Groetsch, C.W.:
On Generalized Bernstein Polynomials,
{\em SIAM Journal on Mathematical Analysis} 5 (1974) 256-262.

\item Butzer, P.L.:
On the Extensions of Bernstein Polynomials to the Infinite Interval,
{\em Proceedings of the American Mathematical Society} 5 (1954) 547-553.

\item B\”{u}y\”{u}kyazici, I. and Ibikli, E.:
The Approximation Properties of Generalized Bernstein Polynomials of Two Variables,
{\em Applied Mathematics and Computation} 156 (2004) 367-380.

\item Cao, J.-D.:
A Generalization of the Bernstein Polynomials,
{\em Journal of Mathematical Analysis and Applications} 209 (1997) 140-146.

\item C\'{a}rdenas-Morales, D., Jim\'{e}nez-Pozo, M.A. and Munoz-Delgado, F.J.:
Some Remarks on H\”{o}lder Approximation by Bernstein Polynomials,
{\em Applied Mathematics Letters} 19 (2006) 1118-1121.

\item Chak, P.M., Madras, N. and Smith, B.:
Semi-Nonparametric Estimation with Bernstein Polynomials,
{\em Economics Letters} 89 (2005) 153-156.

\item Chang, G,-Z.:
Bernstein Polynomials via the Shifting Operator,
{\em The American Mathematical Monthly} 91 (1984) 634-638.

\item Chang, I.-S., Hsiung, C.A., Wu, Y.-J. and Yang, C.-C.:
Bayesian Survival Analysis Using Bernstein Polynomials,
{\em Board of the Foundation of the Scandinavian Journal of Statistic} (2005) 447-466.

\item Ciesielski, Z.:
Explicit Formula Relating the Jacobi, Hahn and Benrstein Polynomials,
{\em SIAM Journal on Mathematical Analysis} 18 (1987) 1573-1575.

\item D’Ambrosio, L.:
Extension of Bernstein Polynomials to Infinite Dimensional Case,
{\em Journal of Approximation Theory} 140 (2006) 191-202.

\item Felten, M.:
Direct and Inverse Estimates for Bernstein Polynomials,
{\em Constructive Approximation} 14 (1998) 459-468.

\item Guo, S., Yue, S., Li, C., Yang, G. and Sun, Y.:
A Pointwise Approximation Theorem for Linear Combinations of Bernstein Polynomials,
{\em } (1996) 397-406.

\item Herzog, F. and Hill, J.D.:
The Bernstein Polynomials for Discontinuous Functions,
{\em American Journal of Mathematics} 68 (1946) 109-124.

\item Ill’inski, A.:
Convergence of Generalized Bernstein Polynomials,
{\em Journal of Approximation Theory} 116 (2002) 100-112.

\item Impens, C.:
Dini Bounds for Differentiated Bernstein Polynomials,
{\em Journal of Approximation Theory} 145 (2007) 128-132.

\item Impens, C. and Vernaeve, H.:
Asymptotics of Differentiated Bernstein Polynomials,
{\em Constructive Approximation} 17 (2001) 47-57.

\item Jetter, K. and St\”{o}ckler, J.:
An Identity for Multivariate Bernstein Polynomials,
{\em Computer Aided Geometric Design} 20 (2003) 563-577.

\item J\”{u}ttler, B.:
The Dual Basis Functions for the Bernstein Polynomials,
{\em Advances in Computational Mathematics} 8 (1998) 345-352.

\item Kakizawa, Y.:
Bernstein Polynomials Probability Density Estimation,
{\em Journal of Nonparametric Statistics} 16 (2004) 709-729.

\item Kakizawa, Y.:
Bernstein Polynomial Estimation of a Spectral Density,
{\em Journal of Time Series Analysis} 27 (2005) 253-287.

\item Kelisky, R.P. and Rivlin, T.J.:
Iterates of Bernstein Polynomials,
{\em Pacific Journal of Mathematics} 21 (1967) 511-520.

\item Kingsley, E.H.:
Bernstein Polynomials for Functions of Two Variables of Class $C(k)$,
{\em Proceedings of the American Mathematical Society} 2 (1951) 64-71.

\item Lewanowicz, S. and Wo\'{z}ny, P.:
Generalized Bernstein Polynomials,
{\em BIT Numerical Mathematics} 44 (2004) 63-78.

\item Li, Z.:
Bernstein Polynomials and Modulus of Continuity,
{\em Journal of Approximation Theory} 102 (2000) 171-174.

\item Linden, H.:
Scaled Generalized Bernstein Polynomials and Containment Regions for the Zeros of Polynomials,
{\em Journal of Computational and Applied Mathematics} 206 (2007) 216-228.

\item Lorentz, G.G.:
Deferred Bernstein Polynomials,
{\em Proceedings of the American Mathematical Society} 2 (1951) 72-76.

\item Mandal, B.N. and Bhattacharya, S.:
Numerical Solution of Some Classes of Integral Equations Using Bernstein Polynomials,
{\em Applied Mathematics and Computation} 190 (2007) 1707-1716.

\item Mastroianni, G. and Occorsio, D.:
An Extension of Bernstein Polynomials on the Semi-Axis,
{\em Mediterranean Journal of Mathematics} 2 (2005) 1-18.

\item Mathe, P.:
Approximation of H\”{o}lder Continuous Functions by Bernstein Polynomials,
{\em The American Mathematical Monthly} 106 (1999) 568-574.

\item May, C.P.:
A Saturation Theorem for Modified Bernstein Polynomials in $L^{p}$-Spaces,
{\em SIAM Journal on Mathematical Analysis} 10 (1979) 321-330.

\item Oruc, H. and Phillips, G.M.:
$q$-Bernstein Polynomials and B\'{e}zier Curves,
{\em Journal of Computational and Applied Mathematics} 151 (2003) 1-12.

\item Oruc, H. and Tuncer, N.:
On the Convergence and Iterates of $q$-Bernstein Polynomials,
{\em Journal of Approximation Theory} 117 (2002) 301-313.

\item Ostrovska, S.:
$q$-Bernstein Polynomials and Their Iterates,
{\em Journal of Approximation Theory} 123 (2003) 232-255.

\item Ostrovska, S.:
The Approximation by $q$-Bernstein Polynomials in the Case $q\downarrow 1$,
{\em Archiv der Mathematik} 86 (2006) 282-288.

\item Petrone, S.:
Bayesian Density Estimation Using Bernstein Polynomials,
{\em The Canadian Journal of Statistics} 27 (1999) 105-126.

\item Petrone, S.:
Random Bernstein Polynomials,
{\em Board of the Foundation of the Scandinanvian Journal of Statistics} 26 (1999) 373-393.

\item Petrone, S. and Wasserman, L.:
Consistency of Bernstein Polynomial Posteriors,
{\em Journal of Royal Statistical Society, B} 64 (2002) 79-100.

\item Phillips, G.M.:
A De Casteljau Algorithm for Generalized Bernstein Polynomial,
{\em Bit} 36 (1996) 232-236.

\item Price, M.:
Convergence for Bernstein Polynomials,
{\em Proc. Amer. Math. Soc.} 19 (1968) 551-554.

\item Price, M.:
On the Variation of the Bernstein Polynomials of a Function of Unbounded Variation,
{\em Pacific Journal of Mathematics} 27 (1968) 119-122.

\item Pych-Taberska, P.:
Rate of Pointwise Convergence of Bernstein Polynomials for Some Absolutely Continuous Functions,
{\em Journal of Mathematical Analysis and Applications} 212 (1997) 9-19.

\item Rosenberg, L.:
Bernstein Polynomials and Monte Carlo Integration,
{\em SIAM Journal on Numerical Analysis} 4 (1967) 566-574.

\item Szafnicki, B.:
On the Degree Elevation of Bernstein Polynomials Representation,
{\em Journal of Computational and Applied Mathematics} 180 (2005) 443-459.

\item Totik, V.:
Approximation by Bernstein Polynomials,
{\em American Journal of Mathematics} 116 (1994) 995-1018.

\item Tucker. D.H.:
A Note on Bernstein Polynomial Type Approximation,
{\em Proc. Amer. Math. Soc.} 18 (1967) 492-494.

\item Vecchia, B.D., Mastroianni, G. and Szabados, J.:
Weighted Approximation of Functions on the Real Line by Bernstein Polynomials,
{\em Journal of Approximation Theory} 127 (2004) 223-239.

\item Wang, H.:
Voronovskaya-type Formulas and Saturation of Convergence for $q$-Bernstein Polynomials for $0<q(1$,
{\em Journal of Approximation Theory} 145 (2007) 182-195.

\item Wang, H.:
Properties of Convergence for $\omega ,q$-Bernstein Polynomials,
{\em Journal of Mathematical Analysis and Applications} 340 (2008) 1096-1108.

\item Wang, H. and Meng, F.:
The Rate of Convergence of $q$-Bernstein Polynomials for $0<q<1$,
{\em Journal of Approximation Theory} 136 (2005) 151-158.

\item Wang, H. and Wu, X.Z.:
Saturation of Convergence for $q$-Bernstein Polynomials in the Case $q\geq 1$,
{\em Journal of Mathematical Analysis and Applications} 337 (2008) 744-750.

\item Winkel, R.:
Generalized Bernstein Polynomials and B\'{e}zier Curves: An Application of Umbral Calculus to Computer Aided Geometric Design,
{\em Advances in Applied Mathematics} 27 (2001) 51-81.

\item Winkler, J.R.:
A Resultant Matrix for Scaled Bernstein Polynomials,
{\em Linear Algebra and Its Applications} 319 (2000) 179-191.

\item Winkler, J.R.:
A Companion Matrix Resultant for Bernstein Polynomials,
{\em Linear Algebra and Its Applications} 362 (2003) 153-175.

\item Winkler, J.R.:
The Numerical Condition of Univariate and Bovariate Degree Elevated Bernstein Polynomials,
{\em Journal of Computational and Applied Mathematics} 191 (2006) 32-49.

\item Xie, L.S.:
Pointwise Approximation Theorem for Combinations and Derivatives of Bernstein Polynomials,
{\em Acta Mathematica Sinica} 21 (2005) 1241-1248.

\begin{equation}{\label{c}}\tag{C}\mbox{}\end{equation}

Complementarity Problems

\begin{enumerate}

\item Ahmad, K., Kazmi, K.R. \& Rehman, N. :
Fixed-Point Technique for Implicit Complementarity Problem in Hilbert Lattice,
{\em J. Optimization Theory and Applications} 93 (1997) 67-72.

\item Allen, G. :
Variational Inequalities, Complementarity Problems, and Duality Theorems,
{\em J Math. Anal. Appl.} 58 (1977) 1-10.

\item Anderson, E.J. \& Wu, S.-Y. :
The Continuous Complementarity Problem,
{\em Optimization} 22 (1991) 419-426.

\item Bazaraa, M.S., Goode, J.J. \& Nashed, M.Z. :
A Nonlinear Complementarity Problem in Mathematical Programming in Banach
Space,
{\em Proc. Amer. Math. Soc.} 35 (1972) 165-170.

\item Bodo, E.P. \& Hanson, M.A. :
A Class of Continuous Nonlinear Complementarity Problems,
{\em J. Optimization Theory and Applications} 24 (1978) 243-262.

\item Borwein, J.M. :
Generalized Linear Complementarity problems Treated without Fixed-Point
Theory,
{\em J. Optimization Theory and Applications} 43 (1984) 343-356.

\item Chang, S.-S., Lee, H.W. and Wu, D.P.:
A Class of Random Complementarity Problems in Hilbert Spaces,
{\em Mathematical Communications} 10 (2005) 95-100.

\item Chen, B., Harker, P.T. and Pinar, M.C.:
Continuation Method for Nonlinear Complementarity Problem via Normal Maps,
{\em European Journal of Operational Research} 116 (1999) 591-606.

\item Chen, G.-Y. \& Yang, X.-Q. :
The Vector Complementarity Problem and Its Equivalences with the Weak
Minimal Elements in Oedered Speces,
{\em J. Math. Anal. Appl.} 153 (1990) 136-158.

\item Cottle, R.W. \& Dantzig, G.B. :
Complementary Pivot Theory of Mathematical Programming,
{\em Linear Algebra and Its Applications} 1 (1968) 103-125.

\item Cottle, R.W. \& Pang, J.-S. :
On Solving Linear Complementarity Problems as Linear Programs,
{\em Mathematical Programming Study} 7 (1978) 88-107.

\item Cottle, R.W., Pang, J.-S. \& Venkateswaran, V. :
Sufficient Matrices and the Linear Complementarity Problem,
{\em Linear Algebra and Its Applications} 114/115 (1989) 231-249.

\item Cottle, R.W. \& Yao, J.C. :
Pseudo-Monotone Complementarity Problems in Hilbert Space,
{\em J. Optimization Theory and Applications} 75 (1992) 281-295.

\item Cottle, R.W. \& Pang, J.-S. :
A Least-Element Theory of Solving Linear Complementarity Problems as Linear
Programs,
{\em Mathematics of Operations Research} 3 (1978) 155-170.

\item Cryer, C.W. \& Dempster, M.A.H. :
Equivalence of Linear Complementarity Problems and Linear Programs in Vector
Lattice Hilbert Spaces,
{\em SIAM J. Control and Optimization} 18 (1980) 76-90.

\item Dash, A.T. \& Nanda, S. :
A Complementarity Problem in Mathematical Programming in Banach Space,
{\em J. Math. Anal. Appl.} 98 (1984) 328-331.

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The Linear Complementarity Problem,
{\em Management Science} 17 (1971) 612-634.

\item Eaves, B.C. :
On the Basic Theorem of Complementarity Problem,
{\em Methamatical Programming} 1 (1971) 68-75.

\item Fisher, M.L. \& Gould, F.J. :
A Simplicial Algorithm for the Nonlinear Complementarity Problem,
{\em Mathematical Programming} 6 (1974) 281-300.

\item Garcia, C.B. :
Some Classes of Matrices in Linear Complementarity Theory,
{\em Mathematical Programming} 5 (1973) 299-310.

\item Giwda, M.S. \& Seidman, T.I. :
Generalized Linear Complementarity Problems,
{\em Mathematical Programming} 46 (1990) 329-340.

\item Gowda, M.S. :
Complementarity Problems over Locally Compact Cones,
{\em SIAM J. Control and Optmization} 27 (1989) 836-841.

\item Gowda, M.S. \& Seidman, T.I. :
Generalized Linear Complementarity Problem,
{\em Mathematical Programming} 46 (1990) 329-340.

\item Gowda, M.S. \& Pang, J.-S. :
On Solution Stability of the Linear Complementarity Problem,
{\em Mathematics of Operations Research} 17 (1992) 77-83.

\item Gowda, M.S. \& Pang, J.-S. :
The Basic Theorem of Complementarity Revisited,
{\em Mathematical Programming} 58 (1993) 161-177.

\item Gould, F.J. \& Tolle, J.W. :
A Unified Approach to Complementarity in Optimization,
{\em Discrete Mathematics} 7 (1974) 225-271.

\item G\”{u}ler, O. :
Existemce of Interior Points and Interior Paths in Nonlinear Monotone
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A Note on a Quadratic Formulation for Linear Complementarity Problems,
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\item Ha, C.D. : Application of Degree Theory in Stability of Complementarity
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Existence Theory for Genralized Nonlinear Complementarity Problems,
{\em J. Optimization Theory and Applications} 7 (1971) 223-239.

\item Harker, P.T. \& Xiao, B. :
Newton’s Method for the Nonlinear Complemenatrity Problem : A B-differentiable
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Nonlinear Complementarity Problem and Galerkin Method,
{\em J. Math. Anal. Appl.} 108 (1985) 563-574.

\item Isac, G. :
On the Implicit Complementarity Problem in Hilbert Spaces,
{\em Bull. Astral, Math. Soc.} 32 (1985) 251-260.

\item Isac, G. \& Kostreva, M. :
The Generalized Order Complementarity Problem,
{\em J. Optimization Theory and Applications} 71 (1991) 517-534.

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A New Nonsmooth Equations Approach to Nonlinear Complementarity Problems,
{\em SIAM J. Control Optim} 35 (1997) 178-193.

\item Kanzow, C. :
Nonlinear Complementarity as Unconstrained Optimization,
{\em J. Optimization Theory and Applications} 88 (1996) 139-155.

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An Existence Theorem for the Complementarity Problem,
{\em J. Optimization Theory and Applications} 19 (1976) 227-232.

\item Karamardian, S. :
The Nonlinear Complementarity Problem with Applications Part 1, Part 2,
{\em J. Optimization Theory and Applications} 4 (1969) 87-98; 167-181.

\item Karamardian, S. :
Generalized Complementarity Problem,
{\em J. Optimization Theory and Applications} 8 (1971) 161-168.

\item Karamardian, S. :
The Complementarity Problem,
{\em Mathematical Programming} 2 (1972) 107-129.

\item Karamardian, S. :
Complementarity Problems over Cones with Monotone and Pseudomonotone Maps,
{\em J. Optimization Theory and Applications} 18 (1976) 445-454.

\item Kojima, M. :
A Unification of the Existence Theorems of the Complementarity Problem,
{\em Mathematical Programming} 9 (1975) 257-277.

\item Kojima, M., Nishino, H. \& Sekine, T. :
An Extension of Lemke’s Method to the Piecewise Linear Complementarity
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{\em SIAM J. Appl. Math.} 31 (1976) 600-613.

\item Kojima, M., Shinodoh, S. \& Hara, S. :
Interior-Point Methods for the Monotone Semidefinite Linear Complementarity
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{\em SIAM J. Optim.} 7 (1997) 86-125

\item Kojima, M., Megiddo, N. \& Noma, T. :
Homotopy Continuation Methods for Nonlinear Complementarity Problems,
{\em Mathematics of Operations Research} 16 (1991) 754-774.

\item Kojima, M., Mizuno, S. \& Noma, T. :
A New Continuation Method for Complementarity Problems with Uniform P-Functions,
{\em Mathematical Programming} 43 (1989) 107-113.

\item Kojima, M., Mizuno, S. \& Noma, T. :
Limiting Behavior of Trajectories Generated by a Continuation Method for
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{\em Mathematics of Operations Research} 15 (1990) 662-675.

\item Kong, L., Xiu, N. and Han, J.:
The Solution Set Structure of Monotone Linear Complementarity Problems
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{\em Operations Research Letters} 36 (2008) 71-76.

\item Lemke, C.E. :
Bimatrix Equilibrium Points and Mathematical Programming,
{\em Management Science} 11 (1965) 681-689.

\item Lemke, C.E. :
Recent Results on Complementarity Problems,
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NY, 1970, pp. 349-384.

\item Lescrenier, M. :
Convergence of Trust Region Algorithms for Optimization with Bounds, when
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{\em SIAM J. Numer. Anal.} 28 (1991) 476-495.

\item Lin, Y. \& Cryer, C.W. :
An Alternating Direction Implicit Algorithm for the Solution of Linear
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{\em Appl. Math. Optim.} 13 (1985) 1-17.

\item Luo, Z.-Q., Mangasarian, O.L., Ren, J. \& Solodov, M.V. :
New Error Bounds for the Linear Complementarity Problem,
{\em Mathematics of Operations Research} 19 (1994) 880-892.

\item Luo, Z.-Q. \& Tseng, P. :
On the Convergence of a Matrix Splitting Algorithm for the Symmetric Monotone
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{\em SIAM J. Control and Optimization} 29 (1991) 1037-1060.

\item L\”{u}thi, H.-J. :
A Simplicial Approximation of a Solution for the Nonlinear Complementarity
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{\em Mathematical Programming} 9 (1975) 278-293.

\item Mangasarian, O.L. :
Equivalence of the Complementarity Problem to a System of Nonlinear
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{\em SIAM J. Appl. Math.} 31 (1976) 89-92.

\item Mangasarian, O.L. :
Linear Complementarity Problems Solvable by a Single Linear Program,
{\em Mathematical Programming} 10 (1976) 263-270.

\item Mangasarian, O.L. :
Locally Unique Solutions of Quadratic Programs, Linear and Nonlinear
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{\em Mathematical Programming} 19 (1980) 200-212.

\item Mangasarian, O.L. :
Characterizations of Bounded Solutions of Linear Complementarity Problems,
{\em Mathematical Programming Study} 19 (1982) 153-166.

\item Mangasarian, O.L. \& Shiau, T.-H. :
Lipschitz Continuity of Solutions of Linear Inequalities, Programs and
Complementarity Problems,
{\em SIAM J. Control and Optimization} 25 (1987) 583-595.

\item Mangasarian, O.L. \& Solodov, M.V. :
Nonlinear Complementarity as Unconstrained and Constrained Minimization,
{\em Mathematical Programming} 62 (1993) 277-297.

\item McLinden, L. :
An Analogue of Moreau’s Proximation Theorem, with Applications to the
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{\em Pacific J. Math.} 88 (1980) 101-161.

\item Megiddo, N. \& Kojima, M. :
On the Existence and Uniqueness of Solutions in Nonlinear Complementarity
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{\em Mathematical Programming} 12 91977) 110-130.

\item Mo\'{r}e, J.J. :
Classes of Functions and Feasibility Conditions in Nonlinear Complementarity
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{\em Mathematical Programming} 6 (1974) 327-338.

\item Mo\'{r}e, J.J. :
Coercivity Coditions in Nonlinear Complementarity Problems,
{\em SIAM Review} 16 (1974) 1-16.

\item Murty, K.G. :
On the Number of Solutions to the Complementarity Problem and Spanning
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\item Nanda, S. \& Nanda, S. :
A Complex Nonlinear Complementariry Problem,
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\item Nanda, S. \& Nanda, S. :
On Stationary Points and the Complementarity Problem,
{\em Bull. Austral. Math. Soc.} 20 (1979) 77-86.

\item Nanda, S. \& Nanda, S. :
A Nonlinear Complementarity Problem in Mathematical Programming in Hilbert
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{\em Bull. Austral. Math. Soc.} 20 (1979) 233-236.

\item Nanda, S. \& Nanda, S. :
A Nonlinear Complementarity Problem in Banach Space,
{\em Bull. Austral. Math. Soc.} 21 (1980) 351-356.

\item Noor, M.A. :
Fixed Point Approach for Complementarity Problems,
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\item Noor, M.A. :
Nonlinear Quasi Complementarity Problems,
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\item Noor, M.A. :
On the Nonlinear Complementarity Problem,
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\item Oettli, W. \& Yen, N.D. :
Quasicomplementarity Problems of Typs $R_{0}$,
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\item Pang, J.-S. :
On Cone Orderings and the Linear Complementarity Problem,
{\em Linear Algebra and Its Applications} 22 (1978) 267-281.

\item Pang, J.-S. :
On a Class of Least-Element Complementarity Problems,
{\em Mathematical Programming} 16 (1979) 111-126.

\item Pang, J.-S. :
Two Characterization Theorems in Complementarity Theory,
{\em Operations Research Letters} 7 (1988) 27-31.

\item Pang, J.-S. :
A B-differentiable Equation-Based, Globally and Locally Quadratically
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\item Pang, J.-S. \& Gabriel, S.A. :
NE/SQP : A Robust Algorithm for the Nonlinear Complementarity Problem,
{\em Mathematical Programming} 60 (1993) 295-337.

\item Pang, J.-S. :
Convergence of Splitting and Newton Methods for Complementarity Problems :
An Application of Some Sensitivity Results,
{\em Mathematical Programming} 58 (1993) 149-160.

\item Pardalos, P.M. \& Rosen, J.B. :
Global Optimization Approach to the Linear Complementarity Problem,
{\em SIAM J. Sci. Stat. Comput.} 9 (1988) 341-353.

\item Patrizi, G. :
The Equivalence of an LCP to a Parametric Linear Program with a Scalar
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A Large-Step Infeasible-Interior-Point Method for the $P_{*}$-Matrix LCP,
{\em SIAM J. Optim.} 7 (1997) 318-335.

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On the Connectedness of the Solution Set to Linear Complementarity Systems,
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Equivalence of Nonlinear Complementarity Problems and Least Element problems
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Extention of the Generalized Complementarity Problem,
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A Quadratically Convergent Infeasible-Interior-Point Algorithm for LCP with
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\item Smith, T.E. :
A Solution Condition for Cpmplementarity Problems : with an Applications to
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\item Solodov, M.V. :
Stationary Points of Bound Constrained Minimization Reformulations of
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Monotonicity of Mangasarian’s Iterative Algorithm for Generalized Linear
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On the Number of Solutions to the Linear Complementarity Problem,
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Minimality and Complementarity Properties Associated with Z-Functions and
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Existence Results for the Nonlinear Complementarity Problem and Applications
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A Generalized Complementarity Pivoting Algorithm
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Orientation in Complementary Pivot Algorithms,
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Growth Behavior of a Class of Merit Functions for the Nonlinear
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Solving the Nonlinear Complementarity Problem by a Homotopy Method,
{\em SIAM J. Control Optimization} 17 (1979) 36-46.

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Note on the Equivalence of Kuhn-Tucker Complementarity Conditions to an
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On Stationary Points of the Implicit Lagrangian for Nonlinear
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Vector Complementarity and Minimal Element Problems,
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\begin{equation}{\label{d}}\tag{D}\mbox{}\end{equation}

Computable Analysis.

\item Brattka, V.:
Effective Borel Measurability and Reducibility of Functions,
{\em Math. Log. Quart.} 51, No. 1 (2005) 19-44.

\item Brattka, V.:
Recursive Quasi-Metric Spaces,
{\em Theoretical Computer Science} 305 (2003) 17-42.

\item Brattka, V.:
Borel Complexity and Computability of the Hahn-Banach Theorem,
{\em Arch. Math. Logic} 46 (2008) 547-564.

\item Brattka, V. and Gherardi, G.:
Borel Complexity of Topological Operations on Computable Metric Spaces,
{\em } 19 (2008) 45-76.

\item Bridges, D.S.:
Constructive Mathematics: A Foundation For Computable Analysis,
{\em Theoretical Computer Science} 219 (1999) 95-109.

\item Cenzer, D. and Remmel, J.B.:
Index Sets in Computable Analysis,
{\em Theoretical Computer Science} 219 (1999) 111-150.

\item G\'{a}cs, P.:
Uniform Test of Algorithmic Randomness over a General Space,
{\em Theoretical Computer Science} 341 (2005) 91-137.

\item Grubba, T., Schr\”{o}der, M. and Weihrauch, K.:
Computable Metrization,
{\em Math. Log. Quart. 53} No. 4/5 (2007) 381-395.

\item Hoyrup, M. and Rojas, C.:
Computability of Probability Measures and Martin-Lof Randomness over Metric Spaces,
{\em Information and Computation} 207 (2009) 830-847.

\item Lambov, B.:
The Basic Feasible Functionals in Computable Analysis,
{\em Journal of Complexity} 22 (2006) 909-917.

\item Matheson, A and Mcnicholl, T.H.:
Computable Analysis and Blaschke Products,
{\em Proc. Ams. Math. Soc.} 136 (2008) 321-332.

\item Takeuti, I.:
Effective Fixed Point Theorem over aNon-computably Separable Metric Space,
{\em } (2001) 310-322.

\item Weihrauch, K.:
Computability on Computable Metric Spaces
{\em Theoretical Computer Science} 113 (1993) 191-210.

\item Weihrauch, K.:
On Computable Metric Spaces Tietze-Urysohn Extension is Computable,
{\em } (2001) 357-368.

\item Weihrauch, K.:
Computational complexity on computable metric spaces
{\em Math. Log. Quart.} 53 (2003) 3-21.

\item Weihrauch, K. and Zheng, X.:
Effectiveness of The Global Modulus of Continuity on Metric Spaces,
{\em Theoretical Computer Science} 219 (1999) 439-450.

\item Weihrauch, K. and Zhong, N.:
Computable analysis of the abstract Cauchy problem in a Banach space and its applications I
{\em Math. Log. Quart.} 53 (2007) 511-531.

\item Wu, Y. and Ding, D.:
Computability of Measurable Sets via Effective Metrics,
{\em Math. Log. Quart.} 51, No. 6 (2005) 543-559.

\item Yasugi, M., Mori, T. and Tsujii, Y.:
Effective Properties of Sets And Functions in Metric Spaces with Computability Structure,
{\em Theoretical Computer Science} 219 (1999) 467-486.

\item Zhong, N.:
Computable Analysis of a Boundary-Value Problem for the Korteweg�Vde Vries Equation,
{\em Theory of Computing Systems} 41 (2007) 155-175.

\item Zhou, Q.:
Grzegorczyk’S Hierarchy of Computable Analysis,
{\em Theoretical Computer Science} 243 (2000) 449-466.

\item Zhou, Q. and Hu, W.:
Decidability in Analysis,
{\em Computing} 75 (2005) 31-336.

\begin{equation}{\label{e}}\tag{E}\mbox{}\end{equation}

Cone Metric Spaces.

\item Abbas, M. and Jungck, G,:(E-Articles)(Paper Articles)
Common Fixed Point Results for Noncommuting Mappings without Continuity in Cone Metric Spaces.
{\em Journal of Mathematical Analysis and Applications} 341 (2008) 416-420.

\item Abbas, M., Khan, M.A. and Radenovi\'{c}: (E-Article)(Paper Artcile)
Common Coupled Fixed Point Theorems in Cone Metric Spaces for $w$-Compatible Mappings,
{\em Applied Mathematics and Computation} 217 (2010) 195-202.

\item Abbas, M. and Rhoades, B.E.: (Cone Metric Spaces)(E-Articles)(Paper Articles)
Fixed and Periodic Point Results in in Cone Metric Spaces,
{\em Applied Mathematics Letters} 22 (2009) 511-515.

\item Abbas, M., Rhoades, B.E. and Nazir, T.: (E-Articles)(Paper Articles)
Common Fixed Points for Four Maps in Cone Metric Spaces,
{\em APplied Mathematics and Computation} 216 (2010) 80-86.

\item Altun, I., Damjanovi\'{c}, B. and Djori\'{c}, D.: (E-Articles)(Paper Articles)
Fixed Point and Common Fixed Point Theorems on Ordered Cone Metric Spaces,
{\em Applied Mathematics Letters} 23 (2010) 310-316.

\item Altun, I. and Durmaz, G.: (E-Articles)(Paper Articles)
Some Fixed Point Theorems on Ordered Cone Metric Spaces,
{\em Rendiconti Del Circolo Mathematico Di Palermo} 58 (2009) 319-325.

\item Altun, I. and Rako\v{c}evi\'{c}, V.: (E-Article)(Paper Artcile)
Ordered Cone Metric Spaces and Fixed Point Results,
{\em Computers and Mathematics with Applications} 60 (2010) 1145-1151.

\item Amini-Harandi, A. and Fakhar, M.: (Cone Metric Spaces)(E-Article)(Paper Artcile)
Fixed Point Theory in Cone Metric Spaces Obtained via the Scalarization Method,
{\em Computers and Mathematics with Applications} 59 (2010) 3529-3534.

\item Arshad, M., Azam, A. and Verto, P.:
Some Common Fixed Point Results in Cone Metric Spaces,
{\em Fixed Point Theory and Applications} 2009, Article ID 493065.

\item Asadi, M., Soleimani, H. and Vaezpour, S.M.:
An Order on Subsets of Cone Metric Spaces and Fixed Points of Set-Valued Contractions,
{\em Fixed Point Theory and Applications} 2009, Article ID 723203.

\item Asadi, M., Soleimani, H. and Vaezpour, S.M. and Rhoades, B.E.: (Cone Metric Spaces)
On $T$-Stability of Picard Iteration in Cone Metric Spaces,
{\em Fixed Point Theory and Applications} 2009, Article ID 751090.

\item Aydi, H., Nashine, H.K., Sametc, B. and Yazidi, H.:(Cone Metric Spaces)(E-Articles)(Paper Articles)
Coincidence And Common Fixed Point Results In Partially Ordered Cone Metric Spaces And Applications To Integral Equations
{\em Nonlinear Analysis}

\item Azam, A., Arshad, M. and Beg, I.: (Cone Metric Spaces)(E-Articles)(Paper Articles)
Common Fixed Points of Two Maps in Cone Metric Spaces,
{\em Rendiconti Del Circolo Mathematico Di Palermo} 57 (2008) 433-441.

\item Azam, A., Beg, I. and Arshad, M.:
Fixed Point in Topological Vector Space-valued Cone Metric Spaces.
{\em Fixed Point Theory and Applications} 2010, Article ID 604084.

\item Beg, I., Azam, A. and Arshad, M.: (Cone Metric Spaces)
Common Fixed Points for Maps on Topological Vector Space Valued Cone Metric Spaces.
{\em Fixed Point Theory and Applications} 2009, Article ID 560264.

\item Choudhury, B.S. and Metiya, N.: (E-Articles)(Paper Articles)
Fixed Points of Weak COntractions in Cone Metric Spaces,
{\em Nonlinear Analysis} 72 (2010) 1589-1593.

\item Deutsch, E.:
On Vectorial Norms and Pseudonorms,
{\em Proceedings of the American Mathematical Society} 28 (1971) 18-24.

\item Deutsch, E.: (Cone Metric Spaces)
On Matricial Norms Subordinates to Vectorial Norms,
{\em Math. Z.} 122 (1971) 142-150.

\item Di Bari, C. and Verto, P.:(E-Articles)(Paper Articles)
$\phi$-Pairs and Common Fixed Points in Cone Metric Spaces,
{\em Rendiconti Del Circolo Mathematico Di Palermo} 57 (2008) 279-285.

\item Di Bari, C. and Verto, P.:(E-Articles)(Paper Articles)
Weakly $\phi$-Pairs and Common Fixed Points in Cone Metric Spaces,
{\em Rendiconti Del Circolo Mathematico Di Palermo} 58 (2009) 125-132.

\item Du, W.-S.:
Nonlinear Contractive Conditions for Coupled Cone Fixed Point Theorems.
{\em Fixed Point Theory and Applications} 2010, Article ID 784578.

\item Filip, A.-D. and Petrusel, A.:
Fixed Point Theorems on Spaces Endowed with Vector-Valued Metrics,
{\em Fixed Point Theory and Applications} 2010, Article ID 281381.

\item Gaji\'{c}, L., lli\'{c}, D. and Rako\v{c}evi\'{c}, V.: (E-Article)(Paper Artcile)
On \'{C}iri\'{c} Maps with a Generalized COntractive Iterate at a Point and Fisher’s Quasi-Contractions in Cone Metric Space,
{\em Applied Mathematics and Computation} 216 (2010) 2240-2247.

\item Haghi, R.H. and Rezapour, S.: (E-Articles)(Paper Articles)
Fixed Points of Multifunctions on Regular Cone Metric Spaces,
{\em Expositiones Mathematicae} 28 (2010) 71-77.

\item Huang, L.-G. and Zhang, X.:(E-Articles)(Paper Articles)
Cone Metric Spaces and Fixed Point THeorems of Contractive Mappings,
{\em Journal of Mathematical Analysis and Applications} 332 (2007) 1468-1476.

\item Huang, X., Zhu, C. and Wen, X.:
Common Fixed Point Theorem for Four Non-Self-Mappings in Cone Metric Spaces,
{\em Fixed Point Theory and Applications} 2010, Artcile ID 983802.

\item Ili\'{c}, D. and Rako\v{c}evo\'{c}, V.:(E-Articles)(Paper Articles)
Common Fixed Points for Maps on Cone Metric Spaces,
{\em Journal of Mathematical Analysis and Applications} 341 (2008) 876-882.

\item Ili\'{c}, D. and Rako\v{c}evo\'{c}, V.:(E-Articles)(Paper Articles)
Quasi-Contraction on a Cone Metric Space,
{\em Applied Mathematics Letters} 22 (2009) 728-731.

\item Izadi, Z. and Nourouzi, K.: (Cone Metric Spaces)(E-Article)(Paper Artcile)
Fixed Points of Correspondences defined on Cone Metric Spaces.
{\em Computers and Mathematics with Applications} 60 (2010) 653-659.

\item Jankovi\'{c}, S., Kadelburg, Z. and Radenovi\'{c}, S.: (E-Articles)(Paper Articles)
On Cone Metric Spaces: A Survey.
{\em Nonlinear Analysis} 74 (2011) 2591-2601.

\item Jankovi\'{c}, S., Kadelburg, Z., Radenovi\'{c}, S. and Rhoades, B.E.:
Assad-Kirk-Type Fixed Point THeorems for a Pair of Nonself Mappings on Cone Metric Spaces.
{\em Fixed Point Theory and Applications} 2009, Article ID 761086.

\item Jungck, G., Radenvoi\'{c}, S., Radojevi\'{c}, S. and Rako\v{c}evi\'{c}, V.:
Common Fixed Point Theorems for Weakly Compatible Pairs on Cone Metric Spaces,
{\em Fixed Point Theory and Applications} 2009, Article ID 643840.

\item Kadelburg, Z., Radenovi\'{c}, S. and Rako\v{c}evi\'{c}, V.: ((E-Articles)(Paper Articles)
Remarks on “Quasi-Contraction on a Cone Metric Space”,
{\em Applied Mathematics Letters} 22 (2009) 1674-1679.

\item Kadelburg, Z., Pavlovi\'{c}, M. and Radenovi\'{c}, S.: (Cone Metric Spaces)(E-Articles)(Paper Articles)
Common Fixed Point Theorems for Ordered Contractions and Quasicontractions in Ordered Cone Metric Spaces,
{\em Computers and Mathematics with Applications} 59 (2010) 3148-3159.

\item Kadelburg, Z., Radenovi\'{c}, S. and Rako\v{c}evi\'{c}, V.:
Topological Vector Space-Valued Cone Metric Spaces and FIxed Point Theorems,
{\em Fixed Point Theory and Applications}, 2010, Article ID 170253.

\item Kadelburg, Z., Radenovi\'{c}, S. and Rako\v{c}evi\'{c}, V.: (Cone Metric Spaces)(E-Articles)(Paper Articles)
A Note on the Equivalence of Some Metric and Cone Metric Fixed Point Results,
{\em Applied Mathematics Letters} 24 (2011) 370-374.

\item Kadelburg, Z., Radenovi\'{c}, S. and Rosi\'{c}, B.: (Cone Metric Spaces)
Strict Contractive Conditions and Common Fixed Point Theorems in Cone Metric Spaces,
{\em Fixed Point Theory and Applications}, 2009, Article ID 173838.

\item Karapinar, E.: (Cone Metric Spaces)
Fixed Point Theorems in Cone Banach Spaces.
{\em Fixed Point Theory and Applications} 2009, Article ID 609281.

\item Karapinar, E.: (Cone Metric Spaces)(E-Article)(Paper Artcile)
Coupled Fixed Point Theorems for Nonlinear Contractions in Cone Metric Spaces.
{\em Computers and Mathematics with Applications} 59 (2010) 3656-3668.

\item Karapinar, E. and T\”{u}rko\v{g}lu, D.:
Best Approximations Theorem for a Couple in Cone Banach Spaces.
{\em Fixed Point Theory and Applications} 2010, Article ID 784578.

\item Khamsi, M.A.: (Cone Metric Spaces)
Remarks on Cone Metric Spaces and Fixed Point Theorems of Contractive Mappings.
{\em Fixed Point Theory and Applications} 2010, Article ID 315398.

\item Khani, M. and Pourmahdian, M.: (Cone Metric Spaces)(E-Articles)
On the Metrizability of Cone Metric Spaces,
{\em Topology and its Applications} 158 (2011) 190-193.

\item Khojasteh, F., Goodarzi, Z. and Razani, A.: (Cone Metric Spaces)
Some Fixed Point Theorems of Integral Type Contraction in Cone Metric Spaces.
{\em Fixed Point Theory and Applications} 2010, Article ID 189684.

\item Klim, D. and Wardowski, D.: (E-Articles)(Paper Articles)
Dynamic Processes and Fixed Points of Set-Valued Nonlinear Contractions in Cone Metric Spaces,
{\em Nonlinear Analysis} 71 (2009) 5170-5175.

\item Latif, A. and Shaddad, F.Y.:
Fixed Point Results for Multivalued Maps in Cone Metric Spaces.
{\em Fixed Point Theory and Applications} 2010, Article ID 941371.

\item Olaleru, J.O.:
Some Generalizations of Fixed Point Theorems in Cone Metric Spaces,
{\em Fixed Point Theory and Applications} 2009, Article ID 657914.

\item O’Regan, D. and Precup, R.:
Continuation Theory for Contractions on Spaces with Two Vector-Valued Metrics,
{\em Applicable Analysis} 82 (2003) 131-144.

\item Pathak, H.K. and Shahzad, N.: (Cone Metric Spaces)
Fixed Point Results for Generalized Quasicontraction Mappings in Abstract Metric Spaces,
{\em Nonlinear Analysis} 71 (2009) 6068-6076.

\item Radenovi\'{c}, S.: (Cone Metric Spaces)(E-Articles)(Paper Articles)
Common Fixed Points under Contractive Conditions in Cone Metric Spaces,
{\em Computers and Mathematics with Applications} 58 (2009) 1273-1278.

\item Radenovi\'{c}, S. and Kadelburg, Z.:
Quasi-Contractions on Symmetric and Cone Symmetric Metric Spaces,
{\em Banach Journal of Mathematical Analysis} 5 (2011) 38-50.

\item Radenovi\'{c}, S. and Rhoades, B.E.:(E-Articles)(Paper Articles)
Fixed Point Theorem for Two Non-Self Mappings in Cone Metric Spaces,
{\em Computers and Mathematics with Applications} 57 (2009) 1701-1707.

\item Raja, P. and Vaezpour, S.M.:
Some Extensions of Banach’s Contraction Principle in Complete Cone Metric Spaces,
{\em Fixed Point Theory and Applications} 2008, Artcile ID 768294.

\item Rezapour, Sh. and Hamlbarani, R.: (E-Articles)(Paper Articles)
Some Notes on the Paper “Cone Metric Spaces and Fixed Point Theorems of Contractive Mappings,
{\em Journal of Mathematical Analysis and Applications} 345 (2008) 719-724.

\item Sabetghadam, F. and Masiha, H.P.: (Cone Metric Spaces)
Common Fixed Points for Generalized $\phi$-Pair Mappings on Cone Metric Spaces.
{\em Fixed Point Theory and Applications} 2010, Article ID 718340.

\item Sabetghadam, F., Masiha, H.P. and Sanatpour, A.H.: (Cone Metric Spaces)
Some Coupled Fixed Point Theorems in Cone Metric Spaces.
{\em Fixed Point Theory and Applications} 2009, Article ID 125426.

\item Song, G., Sun, X., Zhao, Y. and Wang, G.: (E-Article)(Paper Artcile)
New Common Fixed Point Theorems for Maps on Cone Metric Spaces,
{\em Applied Mathematics Letters} 23 (2010) 1033-1037.

\item S\”{o}nmez, A.: (Cone Metric Spaces)(E-Articles)(Paper Articles)
On Paracompactness in Cone Metric Spaces,
{\em Applied Mathematics Letters} 23 (2010) 494-497.

\item Sumitra, R., Uthariaraj, V.R., Hemavathy, R. and Vijayaraju, P.:
Common Fixed Point Theorem for Non-Self-Mappings Satisfying Generalized \'{C}iri\'{c} Type Contraction Condition in Cone Metric Spaces,
{\em Fixed Point Theory and Applications} 2010, Artcile ID 408086.

\item Turkoglu, D., Abuloha, M. and Abdeljawad, T.: (E-Articles)(Paper Articles)
KKM Mappings in Cone Metric Spaces and Some Fixed Point Theorems,
{\em Nonlinear Analysis} 72 (2010) 348-353.

\item Vetro, P.:(E-Articles)(Paper Articles)
Common Fixed Points in Cone Metric Spaces,
{\em Rendiconti Del Circolo Mathematico Di Palermo}, Series II, LVI (2007) 464-468.

\item Wanka, G.:
On Duality in the Vectorial Control-Approximation Problem,
{\em ZOR} 35 (1991) 309-320.

\item Wanka, G.
Properly Efficient Solutions for Vectorial Norm Approximation,
{\em OR Spektrum} 16 (1994) 261-265.

\item Wardowski, D.:(E-Articles)(Paper Articles)
Endpoints and Fixed Points of Set-Valued Contractions in Cone Metric Spaces,
{\em Nonlinear Analysis} 71 (2009) 512-516.

\item Wlodarczyk, K. and Plebaniak, R.: (Cone Metric Spaces)
Periodic Point, Endpoint, and Convergence Theorems for Dissipative Set-Valued Dynamic Systems with Generalized Pesudodistances in Cone Uniform and Uniform Spaces,
{\em Fixed Point Theory and Applications} 2010, Article ID 864536.

\item Wlodarczyk, K., Plebaniak, R. and Doli\'{n}ski, M.: (Cone Metric Spaces)(E-Articles)(Paper Articles)
Cone Uniform, Cone LOcally Convex and Cone Metric Spaces, Endpoints, Set-Valued Dynamic Systems and Quasi-Asymptotic Contractions,
{\em Nonlinear Analysis} 71 (2009) 5022-5031.

\begin{equation}{\label{f}}\tag{F}\mbox{}\end{equation}

Quasi-Metric Spaces.

\item Alegre, C. and Mar\'{i}n, J.: (E-Articles)
Modified w-distances on quasi-metric spaces and a fixed point theorem on complete quasi-metric spaces,
{\em Topology and its Applications} 203 (2016) 32-41.

\item Ali-Akbari, M. and Pourmahdian, M.: (E-Articles)
Completeness of hyperspaces of compact subsets of quasi-metric spaces,
{\em Acta Math. Hungar.} 127 (2010) 260-272.

\item Cao, J. and Rodr\'{i}guez-L\'{o}pez, J.: (E-Articles)
On hyperspace topologies via distance functionals in quasi-metric spaces,
{\em Acta Math. Hungar.} 112 (2006) 249-268.

\item Cobzas, S.: (E-Articles)
Completeness in quasi-metric spaces and Ekeland Variational Principle,
{\em Topology and its Applications} 158 (2011) 1073-1084.

\item Collins Agyingi, A., Haihambo, P. and K\”{u}nzi, H.-P. A.: (E-Articles)
Endpoints in $T_{0}$-quasi-metric spaces,
{\em Topology and its Applications} 168 (2014) 82-93.

\item Doitchinov, D.: (E-Articles)
On completeness in quasi-metric spaces,
{\em Topology and its Applications} 30 (1988) 127-148.

\item K\”{u}nzi, H.-P. A.: (E-Articles)
A construction of the B-completion of a $T_{0}$-quasi-metric space,
{\em Topology and its Applications} 170 (2014) 25-39.

\item K\”{u}nzi, H.-P. A. and Kivuvu, C.M.: (E-Articles)
The B-completion of a $T_{0}$-quasi-metric space,
{\em Topology and its Applications} 156 (2009) 2070-2081.

\item K\”{u}nzi, H.-P. A. and Yildiz, F.: (E-Articles)
Convexity structures in $T_{0}$-quasi-metric spaces,
{\em Topology and its Applications} 200 (2016) 2-18.

\item Romaguera, S and Antonino, J.A.: (E-Articles)
On convergence complete strong quasi-metrics,
{\em Acta Math. Hungar.} 64 (1994) 65-73.

\item Triebel, H.: (E-Articles)
A new approach to function spaces on quasi-metric spaces,
{\em Revista Matem\'{a}tica Complutense} 18 (2005) 7-48.

\item Ume, J.S. : (E-Articles)
A minimization theorem in quasi-metric spaces and its applications,
{\em International Journal of Mathematics and Mathematical Science} 31:7 (2002) 443-447

\item Vitolo, P.: (E-Articles)
A representation theorem for quasi-metric spaces,
{\em Topology and its Applications} 65 (1995) 101-104.

\begin{equation}{\label{g}}\tag{G}\mbox{}\end{equation}

Probabilistic Metric Spaces.

\item Aghajani, A. and Nourouzi, K.:
Convex Sets in Probabilistic Normed Spaces,
{\em Chaos, Solitions and Fractals} 36 (2008) 322-328.

\item Alsina, C. :
On Countable Products and Algebraic Convexifications of Probabilistic Metric Spaces,
{\em Pacific J. Math.} 76 (1978) 291-300.

\item Alsina, C., Schweizer, B. and Sklar, A.:
Continuity Properties of Probabilistic Norms,
{\em Journal of Mathematical Analysis and Applications} 208 (1997) 446-452.

\item Amer, M.A. and Morsi, N.N.:
Bounded Linear Transformations between Probabilistic Normed Vector Spaces,
{\em Fuzzy Sets and Systems} 73 (1995) 167-183.

\item Anthony, J.M., Sherwood, H. \& Taylor, M. :
Sequential Convergence and Probabilistic Metric Spaces,
{\em Rev. Roum. Math. Pures Appl.} 19 (1974) 1177-1187.

\item Bahrami, F.:
Some Topologies on a \v{S}erstnev Probabilistic Normed space,
{\em Journal of Mathematical Analysis and Applications} 344 (2008) 857-868.

\item Bahrami, F. and Nikfar, M.:
The Topological Structure of a Certain Menger Space,
{\em Journal of Mathematical Analysis and Applications} 334 (2007) 172-182.

\item C\v{a}dariu, L. and Radu, V.:
Fixed Points and Stability for Functional Equations in Probabilistic Metric and Random Normed Space,
{\em Fixed Point Theory and Applications} 2009, Article ID 589143.

\item Chang, S.-S., Lee, B.S., Cho, Y.J., Chen, Y.Q., Kang, S.M. and Jung, J.S.:
Generalized Contraction Mapping Principle and Differential Equations
in Probabilistic Metric Spaces,
{\em Proceedings of American Mathematical Society} 124 (1996) 2367-2376.

\item Chang, S.-S., Cho, Y.J. and Wang, F.:
On the Existence and Uniqueness Problems of Solutions for
Set-Valued and Single-Valued Nonlinear Operator Equations in Probabilistic Normed Spaces,
{\em International Journal of Mathematics and Mathematical Sciences} 17 (1994) 389-396.

\item Charpentier, A. and Segers, J.:
Convergence of Archimedean Copulas,
{\em Statistics and Probability Letters} 78 (2008) 412-419.

\item Chicourrat, M. and Horv\'{a}th, C.D.:
Pre-topologies, Pre-uniformities and Probabilistic Metric Spaces,
{\em Acta Math. Hungar.} 110 (2006) 91-116.

\item Cho, Y.J., Huang, N.J. and Kang, S.M.:
Nonlinear Equations for Fuzzy Mappings in Probabilistic Normed Spaces,
{\em Fuzzy Sets and Systems} 110 (2000) 115-122.

\item Cho, Y.J., Park, K.S. and Chang, S.-S.:
Fixed Point Theorems in Metric Spaces and Probabilistic Metric Spaces,
{\em International Journal of Mathematics and Mathematical Sciences} 9 (1996) 243-252.

\item Egbert, R.J. :
Products and Quotients of Probabilistic Metric Spaces,
{\em Pacific J. Math.} 24 (1968) 437-455.

\item Erber, T., Schweizer, B. and Sklar, A.:
Probabilistic Metric Spaces and Hysteresis Systems,
{\em Commun. Math. Phys.} 20 (1971) 205-219.

\item Fang, J.-X.:
On Nonlinear Equations for Fuzzy Mappings in Probabilistic Normed Spaces,
{\em Fuzzy Sets and Systems} 131 (2002) 357-364.

\item Fang, J.-X. and Gao, Y.:
Common Fixed Point Theorems under Strict Contractive Conditions in Menger Spaces,
{\em Nonlinear Analysis} 70 (2009) 184-193.

\item Frank, M.J. :
Probabilistic Topological Spaces,
{\em J. Math. Anal. Appl.} 34 (1971) 67-81.

\item Ghaemi, M.B., Lafuerza-Guillen, B. and Razani, A.:
A Common Fixed Point for Operators in Probabilistic Normed Spaces,
{\em Chaos, Solitions and Fractals} (2009) 1361-1366.

\item Ghaemi, M.B. and Razani, A.:
Fixed and Periodic Points in the Probabilistic Normed and Metric Spaces,
{\em Chaos, Solitions and Fractals} 28 (2006) 1181-1187.

\item Guill\'{e}n, B.L., Lallena, J.A.R. and Sempi, C.:
Completion of Probabilistic Normed spaces,
{\em International Journal of Mathematics and Mathematical Sciences} 18 (1995) 649-652.

\item Guill\'{e}n, B.L., Lallena, J.A.R. and Sempi, C.:
Probabilistic Norm for Linear Operators,
{\em Journal of Mathematical Analysis and Applications} 220 (1998) 462-476.

\item Guill\'{e}n, B.L., Lallena, J.A.R. and Sempi, C.:
A Study of Boundedness in Probabilistic Normed Spaces,
{\em Journal of Mathematical Analysis and Applications} 232 (1999) 183-196.

\item Had\v{z}i\'{c}, O., Pap, E. and Radu, V.:
Generalized Contraction Mapping Principles in Probabilistic Metric Space,
{\em Acta Math, Hungar.} 101 (2003) 131-148.

\item Je\v{s}i\'{c}, S.N., O’Regan, D. amd Baba\v{c}ev, N.:
A Common Fixed Point Theorem for R-Weakly Commuting Mappings in Probabilistic Spaces with Nonlinear Contractive Conditions,
{\em Applied Mathematics and Computation} 201 (2008) 272-281.

\item Kingman, J.F.C. :
Metrics for Wald Spaces,
{\em J. London Math. Soc.} 39 (1964) 129-130.

\item Kohli, J.K. and Vashistha, S.:
Common Fixed Point Theorems in Probabilistic Metric Spaces,
{\em Acta Math. Hungar.} 115 (2007) 37-47.

\item Kolumb\'{a}n, J., So\'{o}s, A. and Varga, I.:
Self-Similar Random Fractal Measure Using Contraction Method in
Probabilistic Metric Spaces,
{\em International Journal of Mathematics and Mathematical Sciences} 52 (2003) 3299-3313.

\item Lafuerza-Guill\'{e}n, B. and Sempi, C.:
Probabilistic Norms and Convergence of Random Variables,
{\em Journal of Mathematical Analysis and Applications} 280 (2003) 9-16.

\item Lafuerza-Guill\'{e}n, B., Sempi, C., Zhang, G. and Zhang, M.: (Probabilistic Metric Spaces)
Countable Products of Probabilistic Normed Spaces,
{\em Nonlinear Analysis} 71 (2009) 4405-4414.

\item Liu, M.:
A Representation Theorem for Probabilistic Metric Spaces in General,
{\em Czechoslocak Mathematical Journal} 50 (2000) 551-554.

\item Mihet, D.:
On Set-Valued Nonlinear Equations in Menger Probabilistic Normed Spaces,
{\em Fuzzy Sets and Systems} 158 (2007) 1823-1831.

\item Mihet, D.:
Altering Distances in Probabilistic Menger Spaces,
{\em Nonlinear Analysis} 71 (2009) 2734-2738.

\item Mihet, D.:
A Note on a Fixed Point Theorem in Menger Probabilistic Quasi-Metric Spaces,
{\em Chaos, Solitions and Fractals} (2009) 2349-2352.

\item Mihet, D.:
Fixed Point Theorems in Probabilistic Metric Spaces,
{\em Chaos, Solitions and Fractals} 41 (2009) 1014-1019.

\item Moynihan, R. and Schweizer, B. :
Betweenness Relations in Probabilistic Metric Spaces,
{\em Pacific J. Math.} 81 (1979) 175-196.

\item Pap, E. and Had\v{z}i\'{c}, O.:
A Fixed Point Theorem in Probabilistic Metric Spaces and an Application,
{\em Journal of Mathematical Analysis and Applications} 202 (1996) 433-449.

\item Pourmoslemi, A. and Salimi, M.:
Probabilistic $n$-Normed Spaces, ${\cal D}$-n-Compact Sets and ${\cal D}$-n-Bounded Sets,
{\em Chaos, Solitions and Fractals} 42 (2009) 2729-2734.

\item Razani, A. and Fouladgar, K.:
Extension of Contractive Maps in the Menger Probabilistic Metric Space,
{\em Chaos, Solitions and Fractals} 34 (2007) 1724-1731.

\item Saleski, A. :
A Conditional Entropy for the Space of Pseudo-Menger Maps,
{\em Pacific J. Math.} 59 (1975) 525-533.

\item Saleski, A. :
Entropy of Self-Homeomorphisms of Statistical Pseudo-Metric Spaces,
{\em Pacific J. Math.} 51 (1974) 537-542.

\item Schweizer, B. and Sklar, A. :
Statistical Metric Spaces,
{\em Pacific Journal of Mathematics} 10 (1960) 313-334.

\item Schweizer, B., Sklar, A. and Thorp, E. :
The Metrization of Statistical Metric Spaces,
{\em Pacific J. Math.} 10 (1960) 673-675.

\item Schweizer, B. \& Sklar, A. :
Triangle Inequalities in a Class of Statistical Metric Spaces,
{\em J. London Math. Soc.} 38 (1963) 401-406.

\item Sempi, C.:
A Short and Partial History of Probabilistic Normed Spaces,
{\em Mediterranean Journal of Mathematics} 3 (2006) 283-300.

\item Shams, M. and Vaezpour, S.M.:
Best Approximation on Probabilistic Normed Spaces,
{\em Chaos, Solitions and Fractals} 41 (2009) 1661-1667.

\item Sherwood, H. :
On E-Spaces and Their Relation to Other Classes of Probabilistic Metric Spaces,
{\em J. London Math. Soc.} 44 (1969) 441-448.

\item Sherwood, H. :
Betweenness in Probabilistic Metric Spaces,
{\em Rev. Roum. Math. Pures Appl.} 15 (1970) 1061-1068.

\item Sherwood, H. :
Complete Probabilistic Metric Spaces,
{\em Z. Wahrscheinlichkeitstheorie verw. Geb.} 20 (1971) 117-128.

\item Tardiff, R.M. :
Topologies for Probabilistic Metric Spaces,
{\em Pacific J. Math.} 65 (1976) 233-251.

\item Thorp, E.:
Best Possible Triangle Inequalities for Statistical Metric Spaces,
{\em Proceedings of American Mathematical Society} 11 (1960) 734-740.

\item Ying, M.:
On Probabilistic Normed Spaces under $\tau_{T,L}$,
{\em International Journal of Mathematics and Mathematical Sciences} 13 (1990) 731-736.

\item Zhang, G. and Zhang, M.:
On the Normability of Generalized \v{S}erstnev PN Spaces,
{\em Journal of Mathematical Analysis and Applications} 340 (2008) 1000-1011.

\begin{equation}{\label{h}}\tag{H}\mbox{}\end{equation}

Partially Ordered Sets.

\item Abian, A. and Deever, D.:
On Representation of Partially Ordered Sets,
{\em Math. Zeitschr.} 92 (1966) 353-355.

\item Abian, A. and Deever, D.:
On Representation of Partially Ordered Sets,
{\em Math. Annalen} 169 (1967) 328-330.

\item Baker, K.A.:
A Krein-Milman Theorem for Partially Ordered Sets,
{\em The American Mathematical Monthly} 76 (1969) 282-283.

\item Banaschewski, B. and Lowen, R.:
A Cancellation Law for Partially Ordered Ses and $T_{0}$ Spaces,
{\em Proc. Amer. Math. Soc.} 132 (2004) 3463-3466.

\item Banaschewski, B. and Nelson, E.:
Completions of Partially Ordered Sets,
{\em SIAM Journal on Computing} 11 (1982) 521-528.

\item Beg, I.:
On Fuzzy Zorn’s Lemma,
{\em Fuzzy Sets and Systems} 101 (1999) 181-183.

\item Belding, W.R.:
Bases for the Positive Cone of a Partially Ordered Module,
{\em Trans. Amer. Math. Soc.} 235 (1978) 305-313.

\item Bell, J.L.:
Zorn’s Lemma and Complete Boolean Algebras in Intuitionistic Type Theories,
{\em The Journal of Symbolic Logic} 62 (1997) 1265-1279.

\item Bell, J.L.:
Some New Intuitionistic Equivalents of Zorn’s Lemma,
{\em Arch. Math. Logic} 42 (2003) 811-814.

\item Bell, M. and Ginsburg, J.:
On Complete Partially Ordered Sets and Compatible Topologies,
{\em Order} 4 (1987) 69-78.

\item Boldi, P., Chierichetti, F. and Vigna, S.:
Pictures from Mongolia. Extracting the Top Elements from a Partially Ordered Set,
{\em Theory Comput. Syst.} 44 (2009) 269-288.

\item Bonsall, F.F.:
Sublinear Functionals and Ideals in Partially Ordered Vector Spaces,
{\em Proc. London Math. Soc.} 4 (1954) 402-418.

\item Bonsall, F.F.:
Endomorphisms of a Partially Ordered Vector Spaces,
{\em } (1954) 133-144.

\item Bonsall, F.F.:
Endomorphisms of a Partially Ordered Vector Spaces without Order Unit,
{\em } (1954) 144-153.

\item Braude, E.J.:
Co-continuity I: A Urysohn’s Lemma for Partially Ordered Sets,
{\em Journal of London Math. Soc.} 18 (1978) 365-373.

\item Buchi, J.R.:
Investigation of the Equivalence of the Axiom of Choice and Zorn’s Lemma from the Viewpoint of the Hierarchy of Types,
{\em Journal of Symbolic Logic} 18 (1953) 125-135.

\item Candeal-Haro, J.C. and Indurain-Eraso, E.:
Utility Functions on Partially Ordered Topological Groups,
{\em Proc. Amer. Math. Soc.} 115 (1992) 765-767.

\item Caro, Y. and Tuza, Z.:
Decompositions of Partially Ordered Sets into Chains and Antichain of Given Size,
{\em Order} 5 (1988) 245-255.

\item Dai, T.-Y. amd DeMarr, R.:
A Property for Inverses in a Partially Ordered Linear Algebra,
{\em Trans. Amer. Math. Soc.} 215 (1976) 285-292.

\item Dai, T.-Y. amd DeMarr, R.:
Positive Derivations on Partially Ordered Linear Algebra with an Order Unit,
{\em Proc. Amer. Math. Soc.} 72 (1978) 21-26.

\item DeMarr, R.:
A Class of Partially Ordered Linear Algebras,
{\em Proc. Amer. Math. Soc.} 39 (1973) 255-260.

\item Duffus, D. and Wille, R.:
A Theorem on Partially Ordered Sets of Order-Preserving Mappings,
{\em Proc. Amer. Math. Soc.} 76 (1979) 14-16.

\item Dushnik, B. and Miller, E.W.:
Partially Ordered Sets,
{\em American Journal of Mathematics} 63 (1941) 600-610.

\item Elbassion, K.M.:
Algorithms for Dualization over Products of Partially Ordered Sets,
{\em SIAM Journal on Discrete Mathematics} 23 (2009) 487-510.

\item Ellis, A.J.:
Linear Operators in Partially Ordered Normed Vector Spaces,
{\em Journal of London Math. Soc.} 41 (1966) 323-332.

\item Ern\'{e}, M.:
Topologies on Products of Partially Ordered Sets I: Interval Topologies,
{\em Algebra Universalis} 19 (1980) 295-311.

\item Ern\'{e}, M.:
Topologies on Products of Partially Ordered Sets III: Order Convergence and Order Topologies,
{\em Algebra Universalis} 13 (1981) 1-23.

\item Georgiou, N., Kuchta, M., Morayne, M. and Niemiec, J.:
On a Universal Best Choice Algorithm for Partially Ordered Sets,
{\em Random Structure and Algorithm} (2007) 263-273.

\item Ginsburg, S.:
Real-Valued Functions on Partially Ordered Sets,
{\em Proc. Amer. Math. Soc.} 4 (1953) 356-359.

\item Harper, J.M. and Rubin, J.E.:
Variations of Zorn’s Lemma, Principles of Cofinality, and Hausdorff Maximal Principle, Part I: Set Forms and Part II:Class Forms,
{\em Notre Dame Journal of Formal Logic} XVII (1976) 565-588 and 151-163.

\item Hwang, F.K.:
Majorization on a Partially Ordered Set,
{\em Proc. Amer. Math. Soc.} 76 (1979) 199-203.

\item Isbell, J.R. and Rubin, H.:
Limit-Preserving Embeddings of Partially Ordered Sets in Directed Sets,
{\em Proc. Amer. Math. Soc.} 7 (1956) 812-813.

\item Jameson, G.J.O.:
Unconditional Convergence in Partially Ordered Linear Spaces,
{\em Math. Ann.} 200 (1973) 227-233.

\item Kannai, Y.:
Existence of a Utility in Infinite Dimensional Partially Ordered Spaces,
{\em } (1963) 229-234.

\item Kemp, P.:
Representation of Partially Ordered Sets,
{\em Algebra Universalis} 30 (1993) 348-351.

\item Lewin, J.:
A Simple Proof of Zorn’s Lemma,
{\em The American Mathematical Monthly} 98 (1991) 353-354.

\item Li, S. and Wang, Z.-Q.:
Ljusternik-Schnirelman Theory in Partially Ordered Hilbert Spaces,
{\em Trans. Amer. Math. Soc.} 354 (2002) 3207-3227.

\item Macneille, H.M.:
Partially Ordered Sets,
{\em Trans. Amer. Math. Soc.} 42 (1937) 416-460.

\item Martinez, J.:
Unique Factorization in Partially Ordered Sets,
{\em Proc. Amer. Math. Soc.} 33 (1972) 213-220.

\item Matsushima, Y.:
Hausdorff Interval Topology on a Partially Ordered Set,
{\em Proc. Amer. Math. Soc.} 11 (1960) 233-235.

\item Marlow, A.R.:
Empirical Topology: Topologies from Partially Ordered Sets,
{\em International Journal of Theoretical Physics} 19 (1980) 515-521.

\item Milner, E.C. and Sauer, N.:
On Chains and Antichains in Well Founded Partially Ordered Sets,
{\em Journal of London Math. Soc.} 24 (1981) 15-33.

\item Ng, K.-F.:
A Note on Partially Ordered Banach Spaces,
{\em Journal of London Mathematical Society} 1 (1969) 520-524.

\item Ng, K.-F.:
The Duality of Partially Ordered Banach Spaces,
{\em Proceeding of the London Mathematical Society} 19 (1969) 269-288.

\item Ng, K.-F.:
A Duality Theorem on Partially Ordered Normed Spaces,
{\em Journal of London Mathematical Society} 3 (1971) 403-404.

\item Ng, K.-F.:
$L_{p}$-Conditions in Partially Ordered Banach Spaces,
{\em Journal of London Mathematical Society} 5 (1972) 387-394.

\item Papageorgiou, N.S.:
Nonsmooth Analysis on Partially Ordered Vector Space,
{\em Pacific Journal of Mathematics} 107 (1983) 403-495.

\item Pavlakos, P.K.:
Convolutions and Products of Partially Ordered Vector-Valued Positive Measures,
{\em Mathematische Annalen} 287 (1990) 335-341.

\item Pini, M.S., Rossi, F., Brent, K. and Walsh, T.:
Aggregating Partially Ordered Preferences,
{\em } 19 (2008) 475-502.

\item Puerto, J., Fern\'{a}ndez, F.R. and Hinojosa, Y.:
Partially Ordered Cooperative Games: Extended Core and Shapley Value,
{\em Annals of Operations Research} 158 (2008) 143-159.

\item Riedl, J.:
Partially Ordered Locally Convex Vector Spaces and Extensions of Positive Continuous Linear Mappings,
{\em Math. Annalen} 157 (1964) 95-124.

\item Ritter, K.:
Dual Nonlinear Programming Problems on Partially Ordered Banach Spaces,
{\em Z. Wahrscheinlichkeitscheorie verw. Geb. 14 (1970) 257-263.

\item Robison, G.B. and Wolk, E.S.:
The Imbedding Operations on a Partially Ordered Set,
{\em Proc. Amer. Math. Soc.} 8 (1957) 551-559.

\item Schmerl, J.H.:
Partially Ordered Sets and the Independence Property,
{\em The Journal of Symbolic Logic} 54 (1989) 396-401.

\item Seidenfeld, T., Schervish, M.J. and Kadane, J.B.:
A Representation of Partially Ordered Preference,
{\em The Annals of Statistics} 23 (1995) 2168-2217.

\item Todorcevic, S.:
Two Examples of Borel Partially Ordered Sets with the Countable Chain Condition,
{\em Proc. Amer. Math. Soc.} 112 (1991) 1125-1128.

\item Tunnicliffe, W.R.:
The Completion of a Partially Ordered Set with respect tp a Polarization,
{\em Proc. London Math. Soc.} 28 (1974) 13-27.

\item Tunnicliffe, W.R.:
A Criterion for the Existence of an Extension of a Function on a Partially Ordered Set,
{\em Journal of London Math. Soc.} 8 (1974) 352-354.

\item Tymchatyn, E.D.:
Antichains and Products in Partially Ordered Spaces,
{\em Trans. Amer. Math. Soc.} 146 (1969) 511-520.

\item Vandergraft, J.S.:
Newton’s Method for Convex Operators in Partially Ordered Spaces,
{\em SIAM Journal on Numerical Analysis} 4 (1967) 406-432.

\item Van Gaans, O. and Kalauch, A.:
Disjointness in Partially Ordered Vector Spaces,
{\em Positivity} 10 (2006) 573-589.

\item Vincent-Smith, G.F.:
Positive Maps between Partially Ordered Bimodules,
{\em Proc. London Math. Soc.} 19 (1969) 661-674.

\item Ward, L.E.:
Partially Ordered Topological Spaces,
{\em Proc. Amer. Math. Soc.} 5 (1954) 144-161.

\item Waterman, A.G.:
The Normal Completion of Certain Partially Ordered Vector Spaces,
{\em Proc. Amer. Math. Soc.} 25 (1970) 141-144.

\item Weston, J.D.:
A Short Proof of Zorn’s Lemma,
{\em } (1957) 279.

\item Wickstead, A.W.:
Compact Subsets of Partially Ordered Banach Spaces,
{\em Math. Ann.} 212 (1975) 271-284.

\item Wolk, E.S.:
Representation Theorems for Partially Ordered Sets,
{\em Proc. Amer. Math. Soc.} 7 (1956) 589-594.

\item Wolk, E.S.:
Order-Compatible Topologies on a Partially Ordered Set,
{\em Proc. Amer. Math. Soc.} 9 (1958) 524-529.

\item Wolk, E.S.:
On Partially Ordered Sets Possessing a Unique Order-Compatible Topology,
{\em Proc. Amer. Math. Soc.} 11 (1960) 487-492.

\item Wolk, E.S.:
On Decompositions of Partially Ordered Sets,
{\em Proc. Amer. Math. Soc.} 15 (1964) 197-199.

\item Wright, J.D.M.:
Measures with Values in a Partially Ordered Vector Space,
{\em Proc. London Math. Soc.} 25 (1972) 675-688.

\item Wright, R.K.:
On Algebraic Extensions and Order-Preserving Isomorphisms of Certain Partially Ordered Fields,
{\em Trans. Amer. Math. Soc.} 137 (1969) 101-114.

\item Zhao, B. and Zhao, D.:
Lim-inf Convergence in Partially Ordered Sets,
{\em Journal of Mathematical Analysis and Applications} 309 (2005) 701-708.

\item Zhou, J.X.:
Extension of the Zorn’s Lemma to General Nontransitive Binary Relations,
{\em Journal of Optimization Theory and Applications} 80 (1994) 333-347.

\begin{equation}{\label{i}}\tag{I}\mbox{}\end{equation}

Differential Inclusions.

\item Abbasbandy, S., Nieto, J.J. and Alavi, M.:
Tuning of Reachable Set in One-Dimensional Fuzzy Differential Inclusions,
{\em Chaos, Solitions and Fractals} 26 (2005) 1337-1341.

\item Aizicovici, S., Papageorgiou, N.S. and Staicu, V.:
Periodic Solutions for Second Order Differential Inclusions with the Scalar $p$-Laplacian,
{\em Journal of Mathematical Analysis and Applications} 322 (2006) 913-929.

\item Andres, J., Fi\v{s}er, J. and J\”{u}ttner, L.:
On a Multivalued Version of the Sharkovskii Theorem and Its Application to Differential Inclusions,
{\em Set-Valued Analysis} 10 (2002) 1-14.

\item Andres, J., Ko\v{z}u\v{s}n\'{i}kov\'{a}, M. and Malaguti, L.: (Differential Inclusions)
Bound Sets Approach to Boundary Value Problems for Vector Second-Order Differential Inclusions,
{\em Nonlinear Analysis} 71 (2009) 28-44.

\item Augustynowicz, A., Dzedzej, Z. and Gelman, B.D.: (Differential Inclusions)
The Solution Set to BVP for Some Functional Differential Inclusions,
{\em Set-Valued Analysis} 6 (1998) 257-263.

\item Ayoola, E.O.: (Differential Inclusions)
Construction of Approximate Attainability for Lipschitzian Quantum Stochastic Differential Inclusions,
{\em Stochastic Analysis and Applications} 19 (2001) 461-471.

\item Ayoola, E.O.: (Differential Inclusions)
Error Estimates for Discretized Quantum Stochastic Differential Inclusions,
{\em Stochastic Analysis and Applications} 21 (2003) 1215-1230.

\item Agarwal, R.P., Grace, S.R. and O’Regan, D.:
On Nonoscillatory Solutions of Differential Inclusions
{\em Proc. Amer. Math, Soc.} 131 (2002) 129-140.

\item Agarwal, R.P., O’Regan, D. and Lakshmikantham, V.:
Discrete Second Order Inclusions,
{\em Journal of Difference Equation and Applications} 9 (2003) 879-885.

\item Aubin, J.-P., Da Prato, G. and Frankowska, H.:
Stochastic Invariance for Differential Inclusions,
{\em Set-Valued Analysis} 8 (2000) 181-201.

\item Ayoola, E.O.: (Differential Inclusions)
Exponential Formula for the Reachable Sets of Quantum Stochastic Differential Inclusions,
{\em Stochastic Analysis and Applications} 21 (2003) 515-543.

\item Ayoola, E.O.:
Error Estimates for Discretized Quantum Stochastic Differential Inclusions,
{\em Stochastic Analysis and Applications} 21 (2003) 1215-1230.

\item Azhmyakov, V,:
Stability of Differential Inclusions: A Computational Approach,
{\em Mathematical Problems in Engineering}.

\item Bacciotti, A., Ceragioli, F. and Mazzi, L.: (Differential Inclusions)
Differential Inclusions and Monotonicity Conditions for Nonsmooth Lyapunove Functions,
{\em Set-Valued Analysis} 8 (2000) 299-309.

\item Bader, R. and Kryszewski, W.:
On the Solution Sets of Constrained Differential Inclusions with Applications,
{\em Set-Valued Analysis} 9 (2001) 289-313.

\item Balasubramaniam, P. and Ntouyas, S.K.:
Controllability for Neutral Stochastic Functional Differential Inclusions with Infinite Delay in Abstract Space,
{\em Journal of Mathematical Analysis and Applications} 324 (2006) 161-176.

\item Balasubramaniam, P. and Vinayagam, D.:
Existence of Solutions of Nonlinear Neutral Stochastic Differential Inclusions in a Hilbert Space,
{\em Stochastic Analysis and Applications} 23 (2005) 137-151.

\item Barabanov, N.E.:
Asymptotic Behavior of Extremal Solutions and Structure of Extremal Norms of Linear Differential Inclusions of Order Three,
{\em Linear Algebra and Applications} 428 (2008) 2357-2367.

\item Baskakov, A., Obukhovskii, V. and Zecca, P.:
On Solutions of Differential Inclusions in Homogeneous Spaces of Functions,
{\em Journal of Mathematical Analysis and Applications} 324 (2006) 1310-1323.

\item Bena\”{i}m, M., Hofbauer, J. and Sorin, S.: (Differential Inclusions)
Stochastic Approximations and Differential Inclusions,
{\em SIAM Journal on Control and Optimization} 41 (2005) 328-348.

\item Benchohra, M., Henderson, J., Ntouyas, S.K. and Ouahab, A.:
Upper and Lower Solutions Method for First-Order Impulsive Differential Inclusions with Nonlinear Boundary Conditions,
{\em Computers and Mathematics with Applications} 47 (2004) 1069-1078.

\item Benchohra, M., Henderson, J. and Ntouyas, S.L.: (Differential Inclusions)
Existence Results for Impulsive Multivalued Semilinear Neutral Functional Differential Inclusions in Banach Space,
{\em Journal of Mathematical Analysis and Applications} 263 (2001) 763-780.

\item Benchohra, M., Henderson, J. and Ntouyas, S.L.: (Differential Inclusions)
Impulsive Neutral Functional Differential Inclusions in Banach Space,
{\em Applied Mathematics Letters} 15 (2002) 917-924.

\item Benchohra, M. and Ntouyas, S.L.:
Existence of Mild Solutions on Noncompact Intervals to Second-Order Initial Problems for a Class of Differential Inclusions with Nonlocal Conditions,
{\em Computers and Mathematics with Applications} 39 (2000) 11-18.

\item Benchohra, M. and Ntouyas, S.L.:
An Existence Result on Noncompact Intervals for Second-Order Functional Differential Inclusions,
{\em Journal of Mathematical Analysis and Applications} 248 (2000) 520-531.

\item Benchohra, M. and Ntouyas, S.L.:
Controllability for an Infinite-Time Horizon of Second-Order Differential Inclusions in Banach Spaces with Nonlocal Conditions,
{\em Journal of Optimization Theory and Applications} 109 (2001) 85-98.

\item Benchohra, M. and Ouahab, A.:
Controllabilty Results for Functional Semilinear Differential Inclusions in Fr\'{e}chet Spaces,
{\em Nonlinear Analysis} 61 (2005) 405-423.

\item Benedetti, I., Malaguti, L. and Taddei, V.:
Semilinear Differential Inclusions via Weak Topologies,
{\em Journal of Mathematical Analysis and Applications} 368 (2010) 90-102.

\item Boucherif, A.:
First-Order Differential Inclusions with Nonlocal Initial Conditions,
{\em Applied Mathematics Letters} 15 (2002) 409-414.

\item Bressan, A. and Wang, Z.:
Classical Solutions to Differential Inclusions with Totally Disconnected Right-Hand Side,
{\em Journal of Differential Equations} 246 (2009) 629-640.

\item Caraballo, T., Langa, J.A. and Valero, J.:
On the Relationship between Solutions of Stochastic and Random Differential Inclusions,
{\em Stochastic Analysis and Applications} 21 (2003) 545-557.

\item Cardinali, T. and Servadei, R.:
Periodic Solutions of Nonlinear Impulsive Differential Inclusions with Constraints,
{\em Proc. Amer. Math. Soc.} 132 (2004) 2339-2349.

\item Cardinali, T. and Rubbioni, P.:
On the Existence of Mild Solutions of Semilinear Evolution Differential Inclusions,
{\em Journal of Mathematical Analysis and Applications} 308 (2005) 620-635.

\item Cardinali, T. and Rubbioni, P.:
Implusive Semilinear Differential Inclusions: Topological Structure of the Solution Set and Solutions on Non-compact Domains,
{\em Nonlinear Analysis} 69 (2008) 75-84.

\item Carja, O., Necula, M. and Vrabie, I.I.:
Tangent Sets, Viability for Differential Inclusions and Applications,
{\em Nonlinear Analysis} 71 (2009) e979-e990.

\item Cellina, A. and Ornelas, A.:
Existence of Solutions to Differential Inclusions and to Time Optimal Control Problems in the Autonomous Case,
{\em SIAM Journal on Control and Optimization} 42 (2003) 260-265.

\item Cernea, A.:
Some Second-Order Necessary Conditions for Nonconvex Hyperbolic Differential Inclusion Problems,
{\em Journal of Mathematical Analysis and Applications} 253 (2001) 616-639.

\item Chang, Y.-K. and Li, W.-T.:
Existence Results for Second Order Impulsive Functional Differential Inclusions,
{\em Journal of Mathematical Analysis and Applications} 301 (2005) 477-490.

\item Chang, Y.-K., Li, W.-T. and Nieto, J.J.:
Controllability of Evolution Differential Inclusions in Banach Spaces,
{\em Nonlinear Analysis} 67 (2007) 623-632.

\item Chang, Y.-K. and Nieto, J.J.:
Some New Existence Results for Fractional Differential Inclusions with Boundary Conditions,
{\em Mathematical and Computer Modelling} 49 (2009) 605-609..

\item Chang, Y.-K., Nieto, J.J. and Li, W.-S.:
On Impulsive Hyperbolic Differential Inclusions with Nonlocal Initial Conditions,
{\em Journal of Optimization Theory and Applications} 140 (2009) 431-442.

\item Cicho\'{n}, M. and Kubiaczyk, I.:
Some Remarks on the Structure of the Solution Set for Differential Inclusions in Banach Spaces,
{\em Journal of Mathematical Analysis and Applications} 233 (1999) 597-606.

\item Dai, G.:
Three Symmetric Solutions for a Differential Inclusion System Involving the $(p(x),q(x))$-Laplacian in $\mathbb{R}^{N}$,
{\em Nonlinear Analysis} 71 (2009) 1763-1771.

\item Dai, G. and Liu, W.:
Three Solutions for a Differential Inclusion Problem Involving the $p(x)$-Laplacian,
{\em Nonlinear Analysis} 71 (2009) 5318-5326.

\item Dhage, B.C.:
Existence Results for Neutral Functional Differential Inclusions in Banach Algebras,
{\em Nonlinear Analysis} 64 (2006) 1290-1306.

\item Dhage, B.C.:
A General Multi-Valued Hybrid Fixed Point Theorem and Perturbed Differential Inclusions,
{\em Nonlinear Analysis} 64 (2006) 2747-2772.

\item Dhage, B.C.:
A General Multi-Valued Hybrid Fixed Point Theorem and Perturbed Differential Inclusions,
{\em Applied Mathematics Letters} 19 (2006) 894-900.

\item Dhage, B.C.:
Existence Theorems for Hyperbolic Differential Inclusions in Banach Spaces,
{\em Journal of Mathematical Analysis and Applications} 335 (2007) 225-242.

\item Diamond, P. and Opoitsev, V.:
Differential Inclusions and Robust Control Theory,
{\em International Journal of Systems Science} 32 (2001) 1063-1073.

\item Diamond, P. and Watson, P.: (Differential Inclusions)
Regularity of Solution Sets for Differential Inclusions Quasi-Concave in a Parameter,
{\em Applied Mathematics Letters} 13 (2000) 31-35.

\item Djebali, S., Gorniewicz, L. and Ouahab, A.:
First-Order Periodic Impulsive Semilinear Differential Inclusions: Existence and Structure of Solution Sets,
{\em Mathematical and Computer Modelling} 52 (2010) 683-714.

\item Donchev, T.:
Approximation of Lower Semicontinuous Differential Inclusions,
{\em Numerical Functional Analysis and Optimization} 22 (2001) 55-67.

\item Donchev, T. , Farkhi, E. and Mordukhovich, B.S.:
Discrete Approximation, Relaxation, and Optimization of One-Sided Lipschitzian Differential Inclusions in Hilbert Spaces,
{\em Journal of Differential Equations} 243 (2007) 301-328.

\item Drici, Z., Mcrae, F.A. and Devi, J.A.:
Set Differential Equations with Causal Operators,
{\em Mathematical Problems in Engineering} 2005:2 (2005) 185-194.

\item Douka, P. and Papageorgiou, N.S.:
Extremal Solutions for Nonlinear Second Order Differential Inclusions,
{\em Math. Nachr.} 278 (2005) 43-52.

\item Fryszkowski, A. and G\'{o}rniewicz, L.:
Mixed Semicontinuous Mappings and Their Applications to Differential Inclusions,
{\em Set-Valued Analysis} 8 (2000) 203-217.

\item Fu, X. and Cao, Y.:
Existence for Neutral Impulsive Differential Inclusions with Nonlocal Conditions,
{\em Nonlinear Analysis} 68 (2008) 3707-3718.

\item Gabor, G. and Quincampoix, M.:
On Attainability of a Set by at Least One Solution to a Differential Inclusion,
{\em Optimization} 53 (2004) 563-582.

\item Gao, H., Lin, G. and Duan, J.:
Differential Equations with Fuzzy Parameters via Differential Inclusions,
{\em Journal of Mathematical Analysis and Applications} 247 (2000) 198-216.

\item Gatsori, E., Ntouyas, S.K. and Sficas, Y.:
On a Nonlocal Cauchy Problem for Differential Inclusions,
{\em Abstract and Applied Analysis} 5 (2004) 425-434.

\item G\'{o}rniewicz, L., Ntouyas, S.K. and O’Regan, D.:
Existence and Controllability Results for First- and Second-Order Functional Semilinear Differential Inclusions with Nonlocal Conditions,
{\em Numerical Functional Analysis and Optimization} 28 (2007) 53-82.

\item Goblet, J.:
A Peano Type Theorem for a Class of Nonconvex-Valued Differential Inclusions,
{\em Set-Valued Analysis} 16 (2008) 913-921.

\item Graef, J.R. and Ouahab, A.:
Existence Results for Functional Semilinear Differential Inclusions in Fr\'{e}chet Spaces,
{\em Mathematical and Computer Modelling} 48 (2008) 1708-1718.

\item Grammel, G.:
Towards Fully Discretized Differential Inclusions,
{\em Set-Valued Analysis} 11 (2003) 1-8.

\item G\”{u}ler, O.:
Convergence Rate Estimates for the Gradient Differential Inclusion,
{\em Optimization Methods and Software} 20 (2005) 729-735.

\item Guo, M., Xue, X. and Li, R.:
Impulsive Functional Differential Inclusions and Fuzzy Population Models,
{\em Fuzzy Sets and Systems} 138 (2003) 601-615.

\item Halidias, N. and Papageorgiou, N.S.:
Existence of Solutions for Quasilinear Second Order Differential Inclusions with Nonlinear Boundary Conditions,
{\em Journal of Computational and Applied Mathematics} 113 (2000) 51-64.

\item Henderson, J. and Ouahab, A.:
Fractional Functional Differential Inclusions with Finite Delay,
{\em Nonlinear Analysis} 70 (2009) 2091-2105.

\item Hong, S.: (Differential Inclusions)
Solvability of Nonlinear Impulsive Volterra Integral Inclusions and Functional Differential Inclusions,
{\em Journal of Mathematical Analysis and Applications} 295 (2004) 331-340.

\item Hu, S., Kandilakis, D.A. and Papageorgiou, N.S.:
Periodic Solutions for Nonconvex Differential Inclusions,
{\em Proc. Amer. Math. Soc.} 127 (1999) 89-94.

\item Kang, J.-R., Kwun, Y.-C. and Park, J.-Y.:
Controllability of the Second-Order Differential Inclusions in Banach Spaces,
{\em Journal of Mathematical Analysis and Applications} 285 (2003) 537-550.

\item Krist\'{a}ly, A.:
Infinitely Many Solutions for a Differential Inclusion Problem in $\mathbb{R}^{N}$,
{\em Journal of Differential Equations} 220 (2006) 511-530.

\item Kisielewicz, M.:
Weak Compactness of Solution Sets to Stochastic Differential Inclusions with Non-Convex Right-Hand Sides,
{\em Stochastic Analysis and Applications} 23 (2005) 871-901.

\item Kisielewicz, M.:
Stochastic Differential Inclusions and Diffusion Processes,
{\em Journal of Mathematical Analysis and Applications} 334 (2007) 1039-1054.

\item Kisielewicz, M.:
Stochastic Representation of Partial Differential Inclusions,
{\em Journal of Mathematical Analysis and Applications} 353 (2009) 592-606.

\item Kourogenis, N.C.:
Strongly Nonlinear Second Order Differential Inclusions with Generalized Boundary COnditions,
{\em Journal of Mathematical Analysis and Applications} 287 (2003) 348-364.

\item Krastanov, M.I., Ribarska, N.K. and Tsachev, T.Y.:
On the Existence of Solutions to Differential Inclusions with Nonconvex Right-Hand Sides,
{\em SIAM Journal on Optimization} 18 (2007) 733-751.

\item Krist\'{a}ly, A., Marzantowicz, W. and Varga, C.: (Differential Inclusions)
A Non-Smooth Three Critical Points Theorem with Applications in Differential Inclusions,
{\em Journal of Global Optimization} 46 (2010) 49-62.

\item Kryszewski, W. and Plaskacz, S.:
Periodic Solutions to Impulsive Differential Inclusions with Constraints,
{\em Nonlinear Analysis} 65 (2006) 1794-1804.

\item Kyritsi, S., Matzakos, N. and Papageorgiou, N.S.:
Periodic Problems for Strongly Nonlinear Second-Order Differential Inclusions,
{\em Journal of Differential Equations} 183 (2002) 279-302.

\item Lakshmikantham, V., Liu, X. and Leela, S.:
Variational Lyapunov Method and Stability Theory,
{\em Mathematical Problems in Engineering} 3 (1998) 555-571.

\item Li, G. and Xue, X.:
On the Existence of Periodic Solutions for Differential Inclusion Problems,
{\em Journal of Mathematical Analysis and Applications} 276 (2002) 168-183.

\item Li, Y. and Liu, B.:
Existence of Solutions of Nonlinear Neutral Stochastic Differential Inclusions with Infinite Delay,
{\em Stochastic Analysis and Applications} 25 (2007) 397-415.

\item Lin, L.-J.:
Systems of Variational Inclusion Problems and Differential Inclusion Problems with Applications,
{\em Journal of Global Optimization} 44 (2009) 579-591.

\item Lisei, H. and Varga, C.:
Multiple Solutions for a Differential Inclusion Problem with Nonhomogeneous Boundary Conditions,
{\em Numerical Functional Analysis and Optimization} 30 (2009) 566-581.

\item Liu, B.:
Controllabilty of Impulsive Neutral Functional Differential Inclusions with Infinite Delay,
{\em Nonlinear Analysis} 60 (2005) 1533-1552.

\item Liu, L., Han, Z., Cai, X. and Huang, J.:
Robust Stabilization of Linear Differential Inclusion System with Time Delay,
{\em Mathematics and Computers in Simulation} 80 (2010) 951-958.

\item Marco, L. and Murillo, J.A.:
Viability Theorems for Higher-Order Differential Inclusions,
{\em Set-Valued Analysis} 6 (1998) 21-37.

\item Marco, L. and Murillo, J.A.:
Lyapunov Functions for Second-Order Differential Inclusions: A Viability Approach,
{\em Journal of Mathematical Analysis and Applications} 262 (2001) 339-354.

\item Mahmudov, E.N.: (Differential Inclusions)
The Optimality Principle for Discrete and First Order Partial Differential Inclusions,
{\em Journal of Mathematical Analysis and Applications} 308 (2005) 605-619.

\item Mahmudov, E.N.:
Sufficient Conditions for Optimality for Differential Inclusions of Parabolic Type and Duality,
{\em Journal of Global Optimization} 41 (2008) 31-42.

\item Mahmudov, E.N.:
Optimal Control of Higher Order Differential Inclusions of Bolza Type with Varying Time Interval,
{\em Nonlinear Analysis} 69 (2008) 1699-1709.

\item Miglierina, E.: (Differential Inclusions)
Slow Solutions of a Differential Inclusion and Vector Optimization,
{\em Set-Valued Analysis} 12 (2004) 345-356.

\item Mordukhovich, B.S. and Wang, D.:
Optimal Control of Semilinear Unbounded Differential Inclusions,
{\em Nonlinear Analysis} 63 (2005) 847-853.

\item Mordukhovich, B.S. and Wang, L.:
Optimal Control of Nonautonomous Functional-Differential Inclusions of Neutral Type,
{\em Nonlinear Analysis} 63 (2005) 840-846.

\item M\”{u}ller, S. and Sychev, M.A.:
Optimal Existence Theorems for Nonhomogeneous Differential Inclusions,
{\em Journal of Functional Analysis} 181 (2001) 447-475.

\item Orpel, A.:
On Solutions of the Dirichlet Problem for a Class of Partial Differential Inclusions with Superlinear Nonlinearities,
{\em Numerical Functional Analysis and Optimization} 23 (2002) 367-381.

\item Ouahab, A.:
Some Results for Fractional Boundary Value Problem of Differential Inclusions,
{\em Nonlinear Analysis} 69 (2008) 3877-3896.

\item Paicu, A.: (Differential Inclusions)
Periodic Solutions for a Class of Differential Inclusions in General Banach Spaces,
{\em Journal of Mathematical Analysis and Applications} 337 (2008) 1238-1248.

\item Papageorgiou, N.S. and Staicu, V.:
The Method of Upper-Lower Solutions for Nonlinear Second Order Differential Inclusions,
{\em Nonlinear Analysis} 67 (2007) 708-726.

\item Papalini, F.:
Solvability of Strongly Nonlinear Boundary Value Problems for Second Order Differential Inclusions,
{\em Nonlinear Analysis} 66 (2007) 2166-2189.

\item Park, J.Y., Kwun, Y.C. and Lee, H.J.:
Controllability of Second-Order Neutral Functional Differential Inclusions in Banach Spaces,
{\em Journal of Mathematical Analysis and Applications} 285 (2003) 37-49.

\item Pearson, D.W.:
Simplex Type Differential Inclusions,
{\em Applied Mathematics Letters} 13 (2000) 17-21.

\item Rze\v{z}uchowski, T.:
Continuous Parametrization of Attainable Sets by Solutions of Differential Inclusions,
{\em Set-Valued Analysis} 7 (1999) 347-355.

\item Rze\v{z}uchowski, T. and Wasowski, J.:
Differential Equations with Fuzzy Parameters via Differential Inclusions,
{\em Journal of Mathematical Analysis and Applications} 255 (2001) 177-194.

\item Simsen, J. and Gentile, C.B.: (Differential Inclusions)
On $p$-Laplacian Differential Inclusions — Global Existence, Compactness Properties and Asymptotic Behavior,
{\em Nonlinear Analysis} 71 (2009) 3488-3500.

\item Smajdor, A.:
On a Multivalued Differential Problem,
{\em International Journal of Bifurcation and Chaos} 13 (2003) 1877-1882.

\item Stewart, D.: (Differential Inclusions)
Formulating Measure Differential Inclusions in Infinite Dimensions,
{\em Set-Valued Analysis} 8 (2000) 273-293.

\item Sun, Y.-J.:
Global Exponential Stabilizability for a Class of Differential Inclusion Systems with Multiple Time Delays,
{\em Journal of Mathematical Analysis and Applications} 263 (2001) 695-707.

\item Tabor, J.:
Generalized Differential Inclusions in Banach Spaces,
{\em Set-Valued Analysis} 14 (2006) 121-148.

\item Wang, L.:
Convergence of discrete Approximations to Optimization Problems of Neutral Functional-Differential Inclusions,
{\em Applied Mathematics and Computation} 165 (2005) 375-391.

\item Wang, L.:
Discrete Approximations to Optimization Problems of Neutral Functional-Differential Inclusions,
{\em Journal of Mathematical Analysis and Applications} 309 (2005) 474-488.

\item Wang, Z.:
Multiplicity of Periodic Solutions of Semilinear Duffing’s Equation at Resonance,
{\em Journal of Mathematical Analysis and Applications} 237 (1999) 166-187.

\item Yu, J., Yuan, G.X.-Z. and Isac, G.: (Differential Inclusions)
The Stability of Solutions for Differentail Inclusions and Differential Equations in the Sense of Baire Category Theory,
{\em Applied Mathematics Letters} 11 (1998) 51-56.

\item Yu, X., Xiang, X. and Wei, W.: (Differential Inclusions)
Solution Bundle for a Class of Impulsive Differential Inclusions on Banach Spaces,
{\em Journal of Mathematical Analysis and Applications} 327 (2007) 220-232.

\item Zhang, Q.:
Nonlinear Second Order Differential Inclusions with a Series of Convex Functions,
{\em Nonlinear Analysis} 72 (2010) 4053-4062.

\item Zhang, Q. and Li, G.:
Nonlinear Boundary Value Problems for Second Order Differential Inclusions,
{\em Nonlinear Analysis} 70 (2009) 3390-3406.

\item Zhang, Q. and Li, G.:
On a Class of Second Order Differential Inclusions Driven by the Scalar $p$-Laplacian,
{\em Nonlinear Analysis} 72 (2010) 151-163.

\item Zhu, Y. and Rao, L.:
Differential Inclusions for Fuzzy Maps,
{\em Fuzzy Sets and Systems} 112 (2000) 257-261.

\begin{equation}{\label{j}}\tag{J}\mbox{}\end{equation}

Fixed Point Theorems.

\item Aamri, M. and El Moutawakil, D.: (Fixed Point Theorems)
Some New Common FIxed Point Theorems under Strict Contractive Conditions,
{\em Journal of Mathematical Analysis and Applications} 270 (2002) 181-188.

\item Abalo, K. and Kostreva, M.:
Berge Equilibrium: Some Recent Results from Fixed-Point Theorems,
{\em Applied Mathematics and Computation} 169 (2005) 624-638.

\item Abbas, M., Khan, A.R. and Nazir, T.: (E-Article)
Coupled Common Fixed Point Results in Two Generalized Metric Spaces,
{\em Applied Mathematics and Computation} 217 (2011) 6328-6336.

\item Abian, A.:
A Fixed-Point Theorem for Mappings,
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{\em Rev. Roumaine Math. Pures Appl.} 26 (1981) 431-435.

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Single-Valued Mappings, Multivalued Mappings and Fiexd-Point Theorems,
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Caristi’s Fixed Point Theorem and Selections of Set-Valued Contractions,
{\em Journal of Mathematical Analysis and Applications} 227 (1998) 55-67.

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Fixed Point Theorems in Metric and Uniform Spaces via the Knaster-Tarski Principle,
{\em Nonlinear Analysis, Theory, Methods and Applications} 32 (1998) 225-233.

\item Jachymski, J.R.: (Fixed Point Theorems)
Around Browder’s Fixed Point Theorem for Constractions,
{\em Journal of Fixed Point Theory and Applications} 5 (2009) 47-61.

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Fixed Point Theorems under the Interior Condition,
{\em Proceedings of the AMS} 134 (2005) 501-507.

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An Application of Ky-Fan Fixed Point Theorem to an Optimization Problem,
{\em Nonlinear Analysis, Theory, Methods, and Applications} 13 (1989) 259-261.

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A Generalization of Brouwer’s Fixed Point Theorem, 457-459.

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Fixed Points of Nonexpansive Mappings Associated with Invariant Means in a Banach Space,
{\em Nonlinear Analysis} 68 (2008) 3316-3324.

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Spaces Not Containing $\L_{1}$ Have Weak Approximate Fixed Point Property,
{\em Journal of Mathematical Analysis and Applications} 373 (2011) 134-137.

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Results on Fixed Points — II,
{\em The American Mathematical Monthly} 76 (1969) 405-408.

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A Constructive Proof of the Brouwer Fixed Point Theorem and Computational Results,
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Sadovskii’s Fixed Point Theorem without Convexity,
{\em Nonlinear Analysis} 53 (2003) 829-837.

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Fixed Points of Nonexpansive Mappings in Banach Lattices,
{\em Proceedings of the American Mathematical Society 105 (1989) 102-110.

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Common Fixed Point Theorems for Multivalued Mappings,
{\em Pacific Journal of Mathematics} 95 (1981) 337-347.

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Three Fixed Point Theorems for Generalized Contractions with Constants in Complete Metric Spaces,
{\em Nonlinear Analysis} 69 (2008) 2942-2949.

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Some Similarity between Contractions and Kannan Mappings,
{\em Fixed Point Theory and Applications} (2008).

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Comments on Some Fixed Point Theorems in Hyperconvex Metric Spaces,
{\em Journal of Mathematical Analysis and Applications} 291 (2004) 154-164.

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Fixed Point Theorems for Lipschitzian Mappings in Banach Spaces,
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Some Applications of the Kakutani Fixed Point Theorem,
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Fixed Point Theorems for Nonlinear Nonexpansive and Generalized Contraction Mappings,
{\em Pacific Journal of Mathematics} 38 (1971) 89-94.

\item Kirk, W.A.:
An Iteration Process for Nonexpansive Mappings with Applications to Fixed Point Theory in Product Spaces,
{\em Proceedings of the American Mathematical Society} 107 (1989) 411-415.

\item Kirk, W.A.:
Some Recent Results in Metric Fixed Point Theory,
{\em Journal of Fixed Point Theory and Applications} 2 (2007) 195-207.

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The Fixed Point Property for Nonexpansive Mappings in Certain Product Spaces,
{\em Houston Journal of Mathematics} 10 (1984) 207-214.

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Nonexpansive and Locally Nonexpansive Mappings in Product Spaces,
{\em Nonlinear Analysis} 12 (1988) 719-725.

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Fixed Point Theorems for Point-to-Set Mappings and the Set of Fixed Points,
{\em Pacific Journal of Mathematics} 42 (1972) 369-379.

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Some Computational Aspects of Metric Fixed Point Theory,
{\em Nonlinear Analysis} 61 (2005) 823-837.

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The Approximate Fixed Point Property In Product Spaces,
{\em Nonlinear Analysis} 66 (2007) 806-818.

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Fixed Point Theorems in Product Spaces,
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A Remark On The Approximate Fixed-Point Property,
{\em Abstract and Applied Analysis} 2 (2003) 93-99.

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Sandwich Method for Find Fixed Points,
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A Fixed-Point Theorem for Decreasing Mappings,
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Fixed Point Theorems in Ordered Banach Spaces via Quasilinearization,
{\em Nonlinear Analysis} 71 (2009) 3448-3458.

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Coupled Fixed Point Theorems for Nonlinear Contractions in Partially Ordered Metric Spaces,
{\em Nonlinear Analysis} 70 (2009) 4341-4349.

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A Fixed-Point Theorem and Applications to Problesm on Sets with Convex Sections and to Nash Equilibria,
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On the Use of KKM Multifunctins in Fixed Point Theory and Related Topics,
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Some Results On Coincidence Points,
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Fixed Point Properties for Semigroup of Nonexpansive Mappings on Fr\'{e}chet Spaces,
{\em Nonlinear Analysis} 70 (2009) 3837-3841.

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On Some Algorithms in Banach Spaces Finding Fixed Points of Nonlinear Mappings,
{\em Nonlinear Analysis} 71 (2009) 3964-3972.

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Fixed Point Theorems for Mappings of Asymptotically Nonexpansive Type,
{\em Nonlinear Analysis} 50 (2002) 1085-1091.

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A Fixed-Point Theorem for Families of Nonexpansive Mappings,
{\em Pacific Journal of Mathematics} 53 (1974) 487-493.

\item Lim, T.-C.:
Fixed Point Theorems for Uniformly Lipschitzian Mappings in $L^{p}$ Spaces,
{\em Nonlinear Analysis, Theory, Methods and Applications} 7 (1983) 555-563.

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A Fixed Point Theorem for Weakly Inward Multivalued Contractions,
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Fixed Point Theorems for Asymptotically Nonexpansive Mappings,
{\em Nonlinear Analysis, Theory, Methods and Applications} 22 (1994) 1345-1355.

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Applications of a Fixed Point Theorem in $G$-Convex Space,
{\em Nonlinear Analysis} 46 (2001) 601-608.

\item Lin, L.-J. and Ansari, H.:
Collective Fixed Points and Maximal Elements with Applications to Abstract
Economies,
{\em Journal of Mathematical Analysis and Applications} 296 (2004) 455-472.

\item Lin, L.-J. and Yu, Z.-T.:
Fixed Points Theorems of KKM-Type Maps,
{\em Nonlinear Analysis} 38 (1999) 265-275.

\item Lin, L.-J. and Yu, Z.-T.:
Fixed-Point Theorems and Equilibrium Problem,
{\em Nonlinear Analysis} 43 (2001) 987-999.

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On Approximation Theorems and Fixed Point Theorems for Non-Self-Mappings in Infinite Dimensional Banach Spaces,
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Approximating the Common Fixed Points of Two Sequences of Uniformly Quasi-Lipschitzian Mappings in Convex Metric Spaces,
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Reflexivity And Approximate Fixed Points,
{\em Studia Mathematica} 159 (2003) 403-415.

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A Generalization of Brouwer’s Fixed Point Theorem,
{\em Duke Math. J.} 8 (1941) 457-459.

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A Fixed Point Theorem for Set Valued Mappings,
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Fixed Points of Contractibel Valued Correspondences,
{\em International Journal of Game Theory} 18 (1989) 175-184.

\item McLennan, A.: (Fixed Point Theorems)(Applications of Fixed Point Theorems)
Fixed Points of Parameterized Perturbations,
{\em Journal of Mathematical Economics} 55 (2014) 186-189.

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Infinite-Dimensional Gale-Nikaido-Debreu Theorem and a Fixed-Point Theorem of Tarafdar,
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A Theorem on Contraction Mappings,
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On the Brouwer Fixed Point Theorem,
{\em Topology and Its Applications} 119 (2002) 53-64.

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Fixed Point Theorems for Multivalued Mappings on Complete Metric Spaces,
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The Common Fixed Point Of Single-Valued Generalized $\varphi_{f}$-Weakly Contractive Mappings,
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Fixed Point Theorems on Chain Complete Partially Ordered Sets,
{\em Southeast Asian Bulletin of Mathematics} 25 (2002) 705-710.

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Sequences of Contractions and Fixed Points,
{\em Pacific Journal of Mathematics} 27 (1968) 579-585.

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Multi-Valued Contraction Mappings,
{\em Pacific Journal of Mathematics} 30 (1969) 475-488.

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Fixed Point Theorems for a Broad Class of Multimaps,
{\em Nonlinear Analysis} 52 (2003) 961-969.

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Some Fixed Point Theorem in Metric Spaces by Altering Distances,
{\em Czechoslovak Mathematical Journal} 53 (2003) 205-212.

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Fixed Point Theorems for a Pair of Set-Valued Maps on a Metric Space,
{\em Nonlinear Analysis, Theory, Methods and Applications} 10 (1986) 1421-1426.

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Extensions of Some Fixed Point Theorems of Rhoades,
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Some Fixed Point Theorems for Noncompact and Weakly Asymptotically Regular Set-Valued Mappings,
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Contractive Mapping Theorems in Partially Ordered Sets and Applications to Ordinary Differential Equations,
{\em Order} 22 (2005) 223-239.

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Existence and Uniqueness of Fixed Point in Partially Ordered Sets and Applications to Ordinary Differential Equations,
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Fixed Point Approach for Complementarity Problems,
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The Kakutani Fixed Point Theorem for Roberts Spaces,
{\em Topology and Its Applications} 123 (2002) 461-470.

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Iterative Approaches to Finding Nearest Common Fixed Points of Nonexpansive Mappings in Hilbert Spaces,
{\em Nonlinear Analysis} 54 (2003) 1417-1426.

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Some Fixed Point Theorems for Concentrative Mappings between Locally Convex Linear Topological Spaces,
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Continuation Fixed Point Theorems for Locally Convex Linear Topological Spaces,
{\em Mathematical and Computer Modelling} 24, \# 4 (1996) 57-70.

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Fixed-Point and Random Fixed-Point Theorems in Cones of Banach Spaces,
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Compression-Expansion Fixed Point Theorem in two Norms and Applications,
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Common Fixed Point Theorems for Contractive Maps,
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A Fixed Point Theorem in Probabilistic Metric Spaces and an Applications,
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Fixed Point Theorems for Multifunctions in Metric and Vector Spaces,
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Fixed Point Theorems for New Classes of Multimaps,
{\em Acta Math. Hungar.} 81 (1998) 155-161.

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Fixed Point Theorems in Hyperconvex Metric Spaces,
{\em Nonlinear Analysis} 37 (1999) 467-472.

\item Park, S.:
Fixed Point Theorems in Locally G-Convex Spaces,
{\em Nonlinear Analysis} 48 (2002) 869-879.

\item Park, S.:
New Versions of the Fan-Browder Fixed Point Theorem amd Existence of
Economic Equilibria,
{\em Fixed Point Theory and Applications} 2004: 3 (2004) 149-158.

\item Park, S:
The KKM Principle Implies Many Fixed Point Theorems,
{\em Topology and Its Applications} 135 (2004) 197-206.

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Fixed Point Theory of Multimapsin Abstract Convex Uniform Spaces,
{\em Nonlinear Analysis} 71 (2009) 2468-2480.

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Generalized Variational Inequalities and Fixed Point Theorems,
{\em Nonlinear Analysis, Theory, Methods and Applications} 31 (1998) 207-216.

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An Application fo a Browder-Type Fixed Point Theorem to Generalized Variational Inequalities,
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Some Fixed Point Theorem of the Mappings of Partially Ordered Sets,
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Coincidence and Fixed Point Theorems for Nonlinear Hybrid Generalized Contractions,
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A Fixed-Point Theorem for Asymptotically Contractive Mappings,
{\em Proceedings of the American Methematical Society} 131 (2003) 2371-2377.

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A Metric Approach to Asymptotic Analysis,
{\em Bull. Sci. Math.} 127 (2003) 815-833.

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Fixed-Point Theorems for Multivalued Noncompact Inward Maps,
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Approximate Fixed-Point Theorems for Discontinuous Mappings,
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Approximation of Common Fixed Points for a Countable Family of Relatively Nonexpansive Mappings in a Banach Space and Applications,
{\em Nonlinear Analysis}

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Lefschetz Fixed Point Theorems for a New Class of Multi-Valued Maps,
{\em Pacific Journal of Mathematics} 42 (1972) 211-220.

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Fixed Point Theorems in Metric Spaces,
{\em Nonlinear Analysis} 64 (2006) 546-557.

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Common Fixed Points of A Pair Of Non-Expansive Mappings With Applications to Convex Feasibility Problems,
{\em Glasgow Mathematical Journal} 52 (2010) 241-252.

\item Qin, X., Shang, M. and Su, Y.:
A General Iterative Method for Equilibrium Problems and Fixed Points Problems in Hilbert Spaces,
{\em Nonlinear Analysis} 69 (2008) 3897-3909.

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Some Random Fixed Point Theorems for Nonlinear Mappings,
{\em Nonlinear Analysis} 50 (2002) 265-274.

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Random Fixed Points of Uniformly Lipschitzian Mappings,
{\em Nonlinear Analysis} 57 (2004) 23-34.

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A Fixed Point Theorem in Partially Ordered Sets and Some Applications to Matrix Equations,
{\em Proc. Amer. Math. Soc.} 132 (2003) 1435-1443.

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The Results in Metric Fixed Point Theory,
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Fixed Point Theorems for Set-Valued Mappings,
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A Convergence Theorem for Asymptotic Contractions,
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A Comparison of Various Definitions of Contractive Mappings,
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On Paths Generated by Fixed Point Algorithms,
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Efficient Acceleration Techniques for Fixed Point Algorithms,
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The Approximation of Fixed Points of a Continuous Mappings,
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On the Optimization of the Error Estimate of a Fixed Point Theorem,
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Fixed Point Sets of Homotopies,
{\em Pacific Journal of Mathematics} 108 (1983) 191-202.

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Coupled Fixed Point Theorems for Contractions in Fuzzy Metric Spaces,
{\em Nonlinear Analysis} (in press)

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Fixed Points of Contraction Mappimgs on Probabilistic Metric Spaces,
{\em Mathematical System Theory} 6 (1972) 97-102.

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On a Fixed Point Theorem of Kransnoselskii for Locally Convex Spaces,
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The Approximate Fixed Point Property In Banach And Hyperbolic Spaces,
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Random Fixed Points of Set-Valued Maps,
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Random Fixed Points of K-Set- and Pseudo-Contractive Random Maps,
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On Kakutani’s Fixed Point Theorem, the KKMS Theorem and the Core of a Balanced Game,
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Hyperconvexity And Approximate Fixed Points,
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Fixed-Point Theorems for Contractive-Type Mappings,
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A Generalized Fixed Point Theorem and Equilibrium Point of an Abstract Economy,
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Fixed Points in Partially Ordered Sets,
{\em Pacific Journal of Mathematics} 45 (1973) 363-367.

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Existence of Fixed Points of Nonexpansive Mappings in Certain Banach Lattices,
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A Fixed Point Theorem for Mixed Monotone Operators with Applications,
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Several Fixed Point Theorems Concerning $\tau$-Distance,
{\em Fixed Point Theory and Applications} 3 (2004) 195-209.

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Generalized Caristi’s Fixed Point Theorems by Bae and Others,
{\em Journal of Mathematical Analysis and Applications} 302 (2005) 502-508.

\item Suzuki, T.:
Fixed-Point Theorem for Asymptotic Contractions of Meir-Keeler Type in Complete Metric Spaces,
{\em Nonlinear Analysis} 64 (2006) 971-978.

\item Suzuki, T.: (E-Article)
Mizoguchi-Takahashi’s Fixed Point Theorem is a Real Generalization of Nadler’S,
{\em Journal of Mathematical Analysis and Applications} 340 (2008) 752-755.

\item Suzuki, T.:
Fixed Point Theorems and Convergence Theorems for Some Generalized Nonexpansive Mappings,
{\em Journal of Mathematical Analysis and Applications} 340 (2008) 1088-1095.

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A New Type of Fixed Point Theorem in Metric Spaces,
{\em Nonlinear Analysis} 71 (2009) 5313-5317.

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A Generalized Banach Contraction Principle that Characterizes Metric Completeness,
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Some Fixed Point Theorems of $T$-Monotone Operators,
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Nonlinear Variational Inequalities and Fixed Point Theorems,
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Strong Convergence of Approximants to Fixed Point Points of Nonexpansive Nonself-Mappings in Banach Spaces,
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Fixed Point Theorems for Nonexpansive Mappings,
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Comparison Theorems on Minimax Inequalities, Variational Inequalities, and Fixed Point Theorems,
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On Fixed Point Theorems of Nonexpansive Mappings in Product Spaces,
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Fixed Point Theorems for Lipschitzian Semigroups in Banach Spaces,
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On the Equivalence of the Arrow Impossibility Theorem and the Brouwer Fixed Point Theorem when Individual Preferences are Weak Orders,
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An Approach to Fixed Point Theorems on Uniform Spaces,
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A Fixed Point Theorem Equivalent to the Fan-Knaster-Kuratowski-Mazurkiewicz Theorem,
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A Fixed Point Theorem and Equilibrium Point of an Abstact Economy,
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Fixed Point Theorems in Locally H-Convex Uniform Spaces,
{\em Nonlinear Analysis} 29 (1997) 971-978.

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A Coincidence Point Theorem and Related Results
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Fixed-Point Theorems for Nonexpansive Mappings in Linear Topological Spaces,
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Pure Strategy Nash Equilibrium Points and the Lefschetz Fixed Point Theorem: (Fixed Point Theorems)
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Fixed Points Theorems for Mappings with Non-Compact and Non-Convex Domains,
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On Triangulations for Computing Fixed Points,
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On the Jacobian of a Function at a Zero Computed by a Fixed Point Algorithm,
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Fixed Point Theorems Related to Ciric’s Contraction Principle,
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Variational Principles, Minimization Theorems, and Fixed-Point Theorems
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A Restart Algorithm for Computing Fixed Points without an Extra Dimension,
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A New Subdivision for Computing Fixed Points with a Homotopy Algorithm,
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An Improvement of Fixed Point Algorithms by Using a Good Triangulation,
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Coincidence Points of Function Pairs Based on Compactness Properties,
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On Some Fixed Point Theorems on Uniformly Convex Banach Spaces,
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On an Approximate Determination of the Fixed Points of Continuous Mappings,
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On an Approximate Determination of the Fixed Points of Continuous Mappings,
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A Fixed Point Theorem for Multi-Valued Functions,
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On a Problem of Common Approximate Fixed Points,
{\em Nonlinear Analysis} 52 (2003) 1637-1643.

\item Wong, C.S.:
Fixed Point Theorem for Nonexpansive Mappings,
{\em Journal of Mathematical Analysis and Applications} 37 (1972) 142-150.

\item Wong, P.:
Nielsen Fixed Point Theory for Partially Ordered Sets,
{\em Topology and Its Applications} 110 (2001) 185-209.

\item Wu, D., Chang, S.-S. and Yuan, G.X.:
Approximation of Common Fixed Points for a Family of Finite Nonexpansive Mappings in Banach Space,
{\em Nonlinear Analysis} 63 (2005) 987-999.

\item Wu, X., Thompson, B. and Yuan, G.X.:
Fixed Point Theorems of Upper Semicontinuous Multivalued Mappings with Applications in Hyperconvex Metric Spaces,
{\em Journal of Mathematical Analysis and Applications} 276 (2002) 80-89.

\item Wu, Y.:
New Fixed Point Theorems and Applications of Mixed Monotone Operator,
{\em Journal of Mathematical Analysis and Applications} 341 (2008) 883-893.

\item Xu, H.-K.:
Fixed Point Theorems for Uniformly Lipschitzian Semigroups in Uniformly Convex Spaces,
{\em Journal of Mathematical Analysis and Applications} 152 (1990) 391-398.

\item Xu, S.:
New Fixed Point Theorems for 1-Set-Contractive Operators in Banach Spaces,
{\em Nonlinear Analysis} 67 (2007) 938-944.

\item Xu, S. and Jia, B.:
Fixed-Point Theorems of $\phi$-Concave-($\psi$)-Convex Mixed Monotone Operators and Applications,
{\em Journal of Mathematical Analysis and Applications} 295 (2004) 645-657.

\item Yildirim, I. and \”{O}zdemir, M.:
A New Iterative Process for Common Fixed Points of Finte Families of Non-Self-Asymptotically Non-expansive Mappings,
{\em Nonlinear Analysis} 71 (2009) 991-999.

\item Yu, Z.-T. and Lin, L.-J.:
Continuous Selection and Fixed Point Theorems,
{\em Nonlinear Analysis} 52 (2003) 445-455.

\item Zangwill, W.I. :
An Eccentric Barycentric Fixed Point Algorithm,
{\em Mathematics of Operations Search} 2 (1977) 343-359.

\item Zhitao, Z.:
New Fixed Point Theorems of Mixed Monotone Operators and Applications,
{\em Journal of Mathematical Analysis and Applications} 204 (1996) 307-319.

\item Zima, M.:
Fixed Point Theorem of Leggett-Williams Type and Its Application,
{\em Journal of Mathematical Analysis and Applications} 299 (2004) 254-260.

\item Zimper, A.:
A Fixed Point Characterization of the Dominance-Solvability of Lattice Games with Strategic Substitutes,
{\em International Journal of Game Theory} 36 (2007) 107-117.

\begin{equation}{\label{k}}\tag{K}\mbox{}\end{equation}

Random Fixed Point Theorems.

\item Agarwal, R.P., O’Regan, D. and Sambandham, M.: ()
Random Fixed Point Theorems for Multivalued Countably Condensing Random Operators,
{\em Stochastic Analysis and Applications} 20 (2002) 1157-1168.

\item Beg, I.:
Approximation of Random Fixed Points in Normed Spaces,
{\em Nonlinear Analysis} 51 (2002) 1363-1372.

\item Beg, I. and Abbas, M.:
Random Fixed Point Theorems for Caristi Type Random Operators,
{\em Journal of Applied Mathematics and Computing} 25 (2007) 425-434.

\item Beg, I. and Abbas, M.:
Random Fixed Point Theorems for a Random Operators on an Unbounded Subset of a Banach Space,
{\em Applied Mathematics Letters} 21 (2008) 1001-1004.

\item Beg, I. and Shahzad, N.:
Random Fixed Points of Random Multivalued Operators on Polish Spaces,
{\em Nonlinear Analysis} 20 (1993) 835-847.

\item Beg, I. and Shahzad, N.:
Random Fixed Points for Random Multivalued Operators Defined on Unbounded Sets in Banach Spaces,
{\em Stochastic Analysis and Applications} 13 (1995) 269-277.

\item Beg, I. and Shahzad, N.:
On Random Approximations and a Random Fixed Point Theorem for Multivalued Mappings Defined on Unbounded Sets in Hilbert Spaces,
{\em Stochastic Analysis and Applications} 14 (1996) 507-511.

\item Beg, I. and Shahzad, N.:
Common Random Fixed Point for Noncommuting Random Operators,
{\em Random Operators and Stochastic Equations} 7 (1999) 367-372.

\item Beg, I. and Shahzad, N.:
An Application of a Random Fixed Point Theorem to Random Best Approximation,
{\em Archiv der Mathematik} 74 (2000) 298-301.

\item Benavides, T.D,, Acedo, G.L. and Xu, H.-K.:
Random Fixed Points of Set-Valued Operators,
{\em Proc. Amer. Math. Soc.} 124 (1996) 831-838.

\item Chang, S.-S.:
Random Fixed Point Theorem in Probabilistic Analysis,
{\em Nonlinear Analysis} 5 (1981) 113-122.

\item Chang, S.-S.:
Some Random Fixed Point Theorems for Continuous Random Operators,
{\em Pacific Journal of Mathematics} 105 (1983) 21-31.

\item Choudhury, B.S.:
A Random Fixed Point Iteration for Three Random Operators on Uniformly Convex Banach Spaces,
{\em Analysis in Theory and Application} 19 (2003) 99-107.

\item Choudhury, B.S.:
An Iteration for Finding a Common Random Fixed Point,
{\em Journal of Applied Mathematics and Stochastic Analysis} 4 (2004) 385-394.

\item Chuong, N.M. and Thuan, N.X.:
Random Fixed Point Theoremsfor Multivalued Nonlinear Mappings,
{\em Random Operators and Stochastic Equations} 9 (2001) 235-244.

item Constantin, A.:
A Random Fixed Point Theorem for Multifunctions,
{\em Stochastic Analysis and Applications} 12 (1994) 65-73.

\item Engl, H.W.:
Random Fixed Point Theorems for Multivalued Mappings,
{\em Pacific Journal of Mathematics} 76 (1978) 351-360.

\item Engl, H.W.:
Some Random Fixed Point Theorems for Strict Contractions and Nonexpansive Mappings,
{\em Nonlinear Analysis} 2 (1978) 619-626.

\item Hussain, N. and Khan, A.R.:
Random Fixed Points of Multivalued — Nonexpansive Maps,
{\em Random Operators and Stochastic Equations} 11 (2003) 243-254.

\item Itoh, S.:
A Random Fixed Point Theorem for a Multivalued Contraction Mapping,
{\em Pacific Journal of Mathematics} 68 (1977) 85-90.

\item Itoh, S.:
Random Fixed Point Theorems with an Application to Random Differential Equations in Banach Spaces,
{\em Journal of Mathematical Analysis and Applications} 67 (1979) 261-273.

\item Jung, J.S., CHo, Y.J. and Lee, B.S.:
Random Fixed Point Theorems for a Certain Class of Mappings in Banach Spaces,
{\em Czechoslovak Mathematical Journal} 50 (2000) 379-396.

\item Khan, L.A.:
Random Fixed Point Theorems for Composites of Acyclic Multifunctions,
{\em Stochastic Analysis and Applications} 19 (2001) 925-931.

\item Kim, T., Prikry, K. and Yannelis, N.C.:
Caratheodory-Type Selections and Random Fixed Point Theorems,
{\em Journal of Mathematical Analysis and Applications} 122 (1987) 393-407.

\item Kumam, P. and Plubtieng, S.:
Random Fixed Point Theorems for Multivalued Nonexpansive Operators in Uniformly Nonsquare Banach Spaces,
{\em Random Operators and Stochastic Equations} 14 (2006) 35-44.

\item Kumam, P. and Plubtieng, S.:
The Characteristic of Noncompact Convexity and Random Fixed Point Theorems for Set-Valued Operators,
{\em Czechoslovak Mathematical Journal} 57 (2007) 269-279.

\item Kumam, W. amd Kumam, P.:
Random Fixed Point Theorems of Multivalued Random Operator with Property (D),
{\em Random Operators and Stochastic Equations} 15 (2007) 127-136.

\item Kunze, H.E., Torre, D.L. and Vrscay, E.R.:
Random Fixed Point Equations and Inverse Problems Using “Collage Method” for Contraction Mappings,
{\em Journal of Mathematical Analysis and Applications} 334 (2007) 1116-1129.

\item Li, G. and Duan, H.:
On Random Fixed Point Theorems of Random Monotone Operators,
{\em Applied Mathematics Letters} 18 (2005) 1019-1026.

\item Lin, T.-C.:
Random Approximations and Random Fixed Point Theorems for Non-Self Maps,
{\em Proc. Amer. Math. Soc.} 103 (1988) 1129-1135.

\item Lin, T.-C.:
Random Approximations and Random Fixed Point Theorems for Continuous 1-Set-Contractive Random Maps,
{\em Proc. Amer. Math. Soc.} 123 (1995) 1167-1176.

\item Liu, L.:
Random Approximations and Random Fixed Point Theorems for Random $1$-Set-Contractive Non-self Maps in Abstract Cones,
{\em Stochastic Analysis and Applications} 18 (2000) 125-144.

\item Liu, L.-S.:
Some Random Approximations and Random Fixed Point Theorems for $1$-Set-Contractive Random Operators,
{\em Proc. Amer. Math. Soc.} 125 (1997) 515-521.

\item Mao, X.:
A Note on Random Fixed Point Theorems in Probabilistic Space,
{\em Stochastic Analysis and Applications} 6 (1988) 305-326.

\item Mao, X.:
Common Random Fixed Point Theorems in Probabilistic Space,
{\em Stochastic Analysis and Applications} 7 (1989) 435-449..

\item Mustafa, G.:
Random Fixed Point Theorems for Contractive Type Multifunctions,
{\em J. Aust. Math. Soc.} 78 (2005) 211-220.

\item O’Regan, D.:
Random Fixed Point Theory with Applications,
{\em Nonlinear Analysis} 30 (1997) 3295-3299.

\item O’Regan, D.:
Fixed Points and Random Fixed Points for Weakly Inward Approximable Maps,
{\em Proc. Amer. Math. Soc,} 126 (1998) 3045-3053.

\item O’Regan, D.:
Fixed Points and Random Fixed Points for $\alpha$-Lipschitzian Maps,
{\em Nonlinear Analysis} 37 (1999) 537-544.

\item O’Regan, D.:
Random Fixed Point Theory for Multivalued Maps,
{\em Stochastic Analysis and Applications} 17 (1999) 597-607.

\item O’Regan, D.:
Fixed Point and Random Fixed Point Theorems in Cones of Banach Spaces,
{\em Mathematical and Computer Modelling} 32 (2000) 1473-1483.

\item Papageorgiou, N.S. :
Random Fixed Point Theorems for Measurable Multifunctions in Banach Spaces,
{\em Proc. Amer. Math. Soc.} 97 (1986) 507-514.

\item Plubtieng, S. and Wangkeeree, R.:
Strong Convergence of Modified Mann Iterations for a Countable Family of Nonexpansive Mappings,
{\em Nonlinear Analysis} 70 (2009) 3110-3118.

\item Ram\'{i}rez, P.L.:
Some Random Fixed Point Theorems for Nonlinear Mappings,
{\em Nonlinear Analysis} 50 (2002) 265-274.

\item Ram\'{i}rez, P.L.:
Random Fixed Points of Uniformly Lipschitzian Mappings,
{\em Nonlinear Analysis} 57 (2004) 23-34.

\item Rybi\'{n}ski, L.:
Random Fixed Point and Viable Random Solutions of Functional-Differential Inclusions,
{\em Journal of Mathematical Analysis and Applications} 145 (1989) 53-61.

\item Schenk-Hopp\'{e}, K.R. and Schmalfub, B.:
Random Fixed Points in a Stochastic Solow Growth Model,
{\em Journal of Mathematical Economics} 36 (2001) 19-30.

\item Schmalfuss, B.:
A Random Fixed Point Theorem and the Random Graph Transformation,
{\em Journal of Mathematical Analysis and Applications} 225 (1998) 91-113.

\item Sehgal, V.M. and Singh, S.P.:
On Random Approximation and a Random Fixed Point Theorem for Set-Valued Mappings,
{\em Proc. Amer. Math. Soc.} 95 (1985) 91-94.

\item Shahzad, N.:
Random Fixed Point Theorems for Various Classes of $1$-Set Contractive Maps in Banach Spaces,
{\em Journal of Mathematical Analysis and Applications} 203 (1996) 712-718.

\item Shahzad, N.:
Random Fixed Points of Set-Valued Maps,
{\em Nonlinear Analysis} 45 (2001) 689-692.

\item Shahzad, N.:
Random Fixed Point Theorems for $1$-Set Contractive Multivalued Maps,
{\em Stochastic Analysis and Applications} 19 (2001) 857-862..

\item Shahzad, N.:
Random Fixed Points of K-Set- and Pseudo-Contractive Random Maps,
{\em Nonlinear Analysis} 57 (2004) 173-181.

\item Shahzad, N.:
Random Fixed Points of Pseudo-Contractive Random Operators,
{\em Journal of Mathematical Analysis and Applications} 296 (2004) 302-308.

\item Shahzad, N.:
Random Fixed Points of Discountinuous Random Maps,
{\em Mathematical and Computer Modelling} 41 (2005) 1431-1436.

\item Shahzad, N. and Khan, L.A.:
Random Fixed Points of $1$-Set Contractive Random Maps in Frechet Spaces,
{\em Journal of Mathematical Analysis and Applications} 231 (1999) 68-75.

\item Shahzad, N. and Khan, L.A.:
Random Fixed Point Theorems for Multivalued Acyclic Random Maps,
{\em Stochastic Analysis and Applications} 17 (1999) 835-840.

\item Shahzad, N. and Latif, S.:
Random Fixed Points for Several Classes of $1$-Ball-Contractive and $1$-Set-Contractive Random Maps,
{\em Journal of Mathematical Analysis and Applications} 237 (1999) 83-92.

\item Shahzad, N. and Latif, S.:
On Random Approximations and Random Fixed Points for $1$-Set-Contractive Random Maps,
{\em Stochastic Analysis and Applications} 21 (2003) 895-908.

\item Tan, K.-K. and Yuan, X.-Z.:
On Deterministic and Random Fixed Points,
{\em Proc. Amer. Math. Soc.} 119 (1993) 849-856.

\item Tan, K.-K. and Yuan, X.-Z.:
Random Fixed Point Theorems and Approximation in Cones,
{\em Journal of Mathematical Analysis and Applications} 185 (1994) 378-390.

\item Tan, K.-K. and Yuan, X.-Z.:
Random Fixed Point Theorems and Approximation,
{\em Stochastic Analysis and Applications} 15 (1997) 103-123.

\item Tarafdar, E., Watson, P. and Yuan, X.-Z.:
Jointly Measurable Selections of Condensing Caratheodory Set-Valued Mappings and Its Applications to Random Fixed Point Theorems,
{\em Nonlinear Analysis} 28 (1997) 39-48.

\item Tarafdar, E., Watson, P. and Yuan, X.-Z.:
The Measurability of Caratheodory Set-Valued Mappings and Random Fixed Point Theorems,
{\em Acta Math. Hungar.} 74 (1997) 309-319.

\item Xu, H.-K.:
Some Random Fixed Point Theorems for Condensing and Nonexpansive Operators,
{\em Proc. Amer. Math. Soc.} 110 (1990) 395-400.

\item Xu, H.-K.:
A Random Fixed Point Theorem for Multivalued Nonexpansive Operators in Uniformly Convex Banach Spaces,
{\em Proc. Amer. Math. Soc.} 117 (1993) 1089-1092.

\item Xu, H.-K.:
Random Fixed Point Theorems for Nonlinear Uniformly Lipschitzian Mappings,
{\em Nonlinear Analysis} 26 (1996) 1301-1311.

\item Yuan, X.-Z. and Yu, J.:
Random Fixed Point Theorems for Nonself Mappings,
{\em Nonlinear Analysis} 26 (1996) 1097-1102.

\item Zhao, Y.-C. and Yi, H.-W.:
Random Fixed Point Theorems for Mappings Satisfying Weakly Inwardness Conditions,
{\em Stochastic Analysis and Applications} 13 (1995) 249-256.

\item Zhu, C. and Chen, C.:
Calculations of Random Fixed Point Index,
{\em Journal of Mathematical Analysis and Applications} 339 (2008) 839-844.

\begin{equation}{\label{l}}\tag{L}\mbox{}\end{equation}

Iterative Algorithms for Fixed Points.

\item Flam, S.D. and Antipin, A.S.:
Equilibrium Programming Using Proximal-Like Algorithm,
{\em Mathematical Programming} 78 (1997) 29-41.

\item Moudafi, A.:
Viscosity Approximation Methods for Fixed-Points Theorem,
{\em Journal of Mathematical Analysis and Applications} 241 (2000) 46-55.

\item Opial, Z.:
Weak Convergence of the Successive Approximations for Nonexpansive Mappings,
{\em Bull. Amer. Math. Soc.} 73 (1967) 591-597.

\item Shioji, N. and Takahashi, W.:
Strong Convergence of Approximated Sequences for Nonexpansive Mappings in Banach Spaces,
{\em Proc. Amer. Math. Soc.} 125 (1997) 3641-3645.

\item Takahashi, S. and Takahashi, W.:
Viscosity Approximation Methods for Equilibrium Problems and Fixed Point Problems in Hilbert Spaces,
{\em Journal of Mathematical Analysis and Applications} 331 (2007) 506-515.

\item Wang, Z.-M., Su, Y., Cho, S.Y. and Lou, W.:
A New Iterative Algorithm for Equilibrium and Fixed Point Problems of Nonexpansive Mapping,
{\em Journal of Global Optimization} 50 (2011) 457-472.

\item Wittmann, R.:
Approximation of Fixed Points of Nonexpansive Mappings,
{\em Arch. Math.} 58 (1992) 486-491.

\item Xu, H.-K.:
An Iterative Approach to Quadratic Optimization,
{\em Journal of Optimization Theory and Applications} 116 (2003) 659-678.

\begin{equation}{\label{m}}\tag{M}\mbox{}\end{equation}

Fuzzy Nonlinear Analysis.

\item Abbasbandy, S., Nieto, J.J. and Alavi, M.:
Tuning of Reachable Set in One-Dimensional Fuzzy Differential Inclusions,
{\em Chaos, Solitions and Fractals} 26 (2005) 1337-1341.

\item Abdukhalikov, K.S. and Kim, C.:
Fuzzy Linear Maps,
{\em Journal of Mathematical Analysis and Applications} 220 (1998) 1-12.

\item Abu-Donia, H.M.:
Common Fixed Point Theorems for Fuzzy Mappings in Metric Space under $\phi$-Contraction Condition,
{\em Chaos, Solitions and Fractals} 34 (2007) 538-543.

\item Agarwal, R.P. and O’Regan, D.:
The Homotopic Invariance for Fixed Points and Fuzzy Fixed Points of Multivalued Generalized Contractive Maps,
{\em Nonlinear Studies} 10 (2003) 187-193.

\item Ahmad, R. and Farajzadeh, A.P.:
On Random Variational Inclusions with Random Fuzzy Mappings and Random Relaxed Cocoercive Mappings,
{\em Fuzzy Sets and Systems} 160 (2009) 3166-3174.

\item Alaca, C., Turkoglu, D. and Yildiz, C.:
Fixed Points in Intuitionistic Fuzzy Metric Spaces,
{\em Chaos, Solitions and Fractals} 29 (2006) 1073-1078.

\item Al-Said, E.A.:
Generalized Quasi-Variational Inequalities for Fuzzy Mappings,
{\em Fuzzy Sets and Systems} 115 (2000) 403-411.

\item Altun, I. and Muhet, D.:
Ordered Non-Archimedean Fuzzy Metric Spaces and Some Fixed Point Results,
{\em Fixed Point Theory and Applications} (2010).

\item Amemiya, M. and Takahashi, W.:
Generalization of Shadows and Fixed Point Theorems for Fuzzy Sets,
{\em Fuzzy Sets and Systems} 114 (2000) 469-476.

\item Arora, S.C. and Sharma, V.:
Fixed Point Theorems for Fuzzy Mappings,
{\em Fuzzy Sets and Systems} 110 (2000) 127-130.

\item Badard, R.:
Fixed Point Theorems for Fuzzy Numbers,
{\em Fuzzy Sets and Systems} 13 (1984) 291-302.

\item Badard, R.:
Comparison of Topological and Uniform Structures for Fuzzy Numbers and the Fixed Point Problem,
{\em Fuzzy Sets and Systems} 21 (1987) 211-220.

\item Bag, T. and Samanta, S.K.:
A Comparative Study of Fuzzy Norms on a Linear Space,
{\em Fuzzy Sets and Systems} 159 (2008) 670-684.

\item Bag, T. and Samanta, S.K.:
Fuzzy Bounded Linear Operators in Felbin’s Type Fuzzy Normed Linear Spaces,
{\em Fuzzy Sets and Systems} 159 (2008) 685-707.

\item Beg, I. and Azam, A. :
Fixed Points of Asymptotically Regular Multivalued Mappings,
{\em J. Austral. Math. Soc.} 53 (1992) 313-326.

\item Bose, R.K. and Sahani, D.:
Fuzzy Mappings and Fixed Point Theorems,
{\em Fuzzy Sets and Systems} 21 (1987) 53-58.

\item Butnariu, D.:
Fixed Points for Fuzzy Mappings,
{\em Fuzzy Sets and Systems} 7 (1982) 191-207.

\item Chakraborty, K., Biswas, R. and Nanda, S.:
On Fuzzy Metric Spaces,
{\em Fuzzy Sets and Systems} 99 (1998) 111-114.

\item Chang, M.-S. and Chen, H.-K.:
A Fuzzy User-Optimal Route Choice Problem Using a Link-Based Fuzzy
Variational Inequality Formulation,
{\em Fuzzy Sets and Systems} 114 (2000) 339-345.

\item Chang, S.-S.:
Fixed Degree for Fuzzy Mappings and a Generalization of Ky Fan’s Theorem,
{\em Fuzzy Sets and Systems} 24 (1987) 103-112.

\item Chang, S.-S. :
Coincidence Degree and Coincidence Theorems for Fuzzy Mappings,
{\em Fuzzy Sets and Systems} 27 (1988) 327-334.

\item Chang, S.-S. :
Coincidence Theorems and Variational Inequalities for Fuzzy Mappings,
{\em Fuzzy Sets and Systems} 61 (1994) 359-368.

\item Chang, S.-S.:
Fuzzy Quasivariational Inclusions in Banach Spaces,
{\em Applied Mathematics and Computation} 145 (2003) 805-819.

\item Chang, S.-S., Cho, Y.J., Lee, B.S. and Lee, G.M. :
Fixed Degree and Fixed Point Theorems for Fuzzy Mappings in Probabilistic
Metric Spaces,
{\em Fuzzy Sets and Systems} 87 (1997) 325-334.

\item Chang, S.-S., Cho, Y.J., Lee, B.S., Jung, J.S. and Kang, S.M. :
Coincidence Point Theorems and Minimization Theorems in Fuzzy Metric Spaces,
{\em Fuzzy Sets and Systems} 88 (1997) 119-127.

\item Chang, S.-S. and Huang, N.-J. :
Generalized Complementarity Problems for Fuzzy Mappings,
{\em Fuzzy Sets and Systems} 55 (1993) 227-234.

\item Chang, S.-S., Lee, G.M. and Lee, B.S. :
Vector Quasivariational Inequalities for Fuzzy Mappings I,
{\em Fuzzy Sets and Systems} 87 (1997) 307-315.

\item Chang, S.-S., Lee, G.M. and Lee, B.-S.:
Vector Quasivariational Inequalities for Fuzzy Mappings II,
{\em Fuzzy Sets and Systems} 102 (1999) 333-344.

\item Chang, S.-S. and Zhu, Y.-G. :
On Variational Inequalities for Fuzzy Mappings,
{\em Fuzzy Sets and Systems} 32 (1989) 359-367.

\item Chitra, A. and Subrahmanyam, P.V.:
Fuzzy Sets and Fixed Points,
{\em J. Math. Anal. Appl.} 124 (1987) 584-590.

\item Cho, Y.J., Sedghi, S. and Shobe, N.:
Generalized Fixed Point Theorems for Compatible Mappings with Some Types in Fuzzy Metric Spaces,
{\em Chaos, Solitions and Fractals} (2009) 2233-2244

\item \'{C}iri\'{c}, L.B.: (E-Articles)
Some New Results for Banach Contractions and Edelstein Contractive Mappings on Fuzzy Metric Spaces,
{\em Chaos, Solitions and Fractals} 42 (2009) 146-154.

\item \'{C}iri\'{c}, L.B., Je\v{s}i\'{c}, S.N. and Ume, J.S.:
The Existence Theorems for Fixed and Periodic Points of
Nonexpansive Mappings in Intuitionistic Fuzzy Metric Spaces
{\em Chaos, Solitions and Fractals} 37 (2008) 781-791.

\item Coppola, C., Gerla, G. and Pacelli, T.:
Convergence and Fixed Points by Fuzzy Orders,
{\em Fuzzy Sets and Systems} 159 (2008) 1178-1190.

\item Deschrijver, G., O’Regan, D., Saadati, R. and Vaezpour, S.M.:
${\cal L}$-Fuzzy Euclidean Normed Spaces and Compactness,
{\em Chaos, Solitions and Fractals} 42 (2009) 40-45.

\item Deshpande, B.:
Fixed Point and DS-Weak Commutativity Condition in Intuitionistic Fuzzy Metric Spaces,
{\em Chaos, Solitions and Fractals} 42 (2009) 2722-2728.

\item Diamond, P., Kloeden, P. \& Pokrovskii, A. :
Absolute Retracts and General Fixed Point Theorem for Fuzzy Sets,
{\em Fuzzy Sets and Systems} 86 (1997) 377-380.

\item Fang, J.-X. :
A Note on Fixed Point Theorems of Had\v{z}i\'{c},
{\em Fuzzy Sets and Systems} 48 (1992) 391-395.

\item Fang, J.-X. :
On Fixed Point Theorems in Fuzzy Metric Spaces,
{\em Fuzzy Sets and Systems} 46 (1992) 107-113.

\item Fang, S.-C. and Hu, C.-F.:
Solving Fuzzy Variational Inequalities,
{\em Fuzzy Optimization and Decision Making} 1 (2002) 113-133.

\item Farnoosh, R., Aghajani, A. and Azhdari, P.:
Contraction Theorems in Fuzzy Metric Space,
{\em Chaos, Solitions and Fractals} 41 (2009) 854-858.

\item George, A. and Veeramani, P. :
On Some Results in Fuzzy Metric Spaces,
{\em Fuzzy Sets and Systems} 64 (1994) 395-399.

\item George, A. and Veeramani, P. :
On Some Results of Analysis for Fuzzy Metric Spaces,
{\em Fuzzy Sets and Systems} 90 (1997) 365-368.

\item Goudarzi, M., Vaezpour, S.M. and Saadati, R.:
On the Intuitionistic Fuzzy Inner Product Spaces,
{\em Chaos, Solitions and Fractals} (2008).

\item Grabiec, M. :
Fixed Points in Fuzzy Metric Spaces,
{\em Fuzzy Sets and Systems} 27 (1988) 385-389.

\item Gregori, V., Lopez-Crevillen, A. Morillas, A. and Sapena, A.: (E-Articles)
On Convergence in Fuzzy Metric Spaces,
{\em Topology and its Applications} 156 (2009) 3002-3006.

\item Gregori, V., Mascarell, J.A. and Sapena, A.: (E-Articles)
On Completion of Fuzzy Quasi-Metric Spaces,
{\em Topology and its Applications} 153 (2005) 886-899.
(Proposition 2.3 is inappropriate, since the limit in fuzzy quasi-metric space is not
unique.)

\item Gregori, V. and Romaguera, S.:
Fixed Point Theorem for Fuzzy Mappings in Quasi-Metric Spaces,
{\em Fuzzy Sets and Systems} 115 (2000) 477-483.

\item Gregori, V. and Romaguera, S.:
Some Properties of Fuzzy Metric Spaces,
{\em Fuzzy Sets and Systems} 115 (2002) 399-404.

\item Gregori, V. and Romaguera, S.:
On Completion of Fuzzy Metric Spaces,
{\em Fuzzy Sets and Systems} 130 (2000) 485-489.

\item Gregori, V., Romaguera, S. and Sapena, A.:
A Characterization of Bicompletable Fuzzy Quasi-Metric Spaces,
{\em Fuzzy Sets and Systems} 152 (2005) 395-402.

\item Gregori, V., Romaguera, S. and Sapena, A.:
A Note on Intuitionistic Fuzzy Metric Spaces
{\em Chaos, Solitions and Fractals} 28 (2006) 902-905.

\item Gupta, P., Vlach, M. and Bhatia, D.:
Fuzzy Approximation on an Infeasible Generalized Linear Complementarity Problem,
{\em Fuzzy Sets and Systems} 146 (2004) 221-233.

\item Gutierrez Garcia., J. and de Prada Vicente, M.A.: (E-Articles)
Hutton $[0,1]$-Quasi-Uniformities Induced by Fuzzy (Quasi-)Metric Spaces,
{\em Fuzzy Sets and Systems} 157 (2006) 755-766.

\item Ha, M., Cheng, L. and Wang, X. :
Notes on Riesz’s Theorem on Fuzzy Metric Space
{\em Fuzzy Sets and Systems} 90 (1997) 361-363.

\item Ha, M. and Wang, X. :
Some Notes on the Regularity of Fuzzy Measures on Metric Spaces,
{\em Fuzzy Sets and Systems} 87 (1997) 385-387.

\item Had\v{z}i\'{c}, O. :
Fixed Point Theorems for Multivalued Mappings in Some Classes of Fuzzy Metric Spaces,
{\em Fuzzy Sets and Systems} 29 (1989) 115-125.

\item Had\v{z}i\'{c}, O. :
Fixed Point Theorems for Multivalued Mappings in Probabilistic Metric Spaces,
{\em Fuzzy Sets and Systems} 88 (1997) 219-226.

\item Had\v{z}i\'{c}, O. and Pap, E.:
A Fixed Point Theorem for Multivalued Mappings in Probabilistic Metric Spaces and an Application in Fuzzy Metric Spaces,
{\em Fuzzy Sets and Systems} 127 (2002) 333-344.

\item He, P.-J. :
The Variational Principle in Fuzzy Metric Spaces and Its Applications,
{\em Fuzzy Sets and Systems} 45 (1992) 389-394.

\item Heilpern, S. :
Fuzzy Mappings and Fixed Point Theorem,
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A New Method for a Class of Nonlinear Variational Inequalities with Fuzzy Mappings,
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Gereralized Vector Variational Inequality and Fuzzy Extension,
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Fuzzy Compact Linear Operators,
{\em Chaos, Solitions and Fractals} 34 (2007) 1584-1589.

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Generalized Mixed Quasivariational Inclusions and Generalized Mixed Resolvent Equations for Fuzzy Mappings,
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\item Mart\'{i}nez-Moreno, J., Rold\'{a}n, A. and Rold\'{a}n, C.: (Fuzzy Nonlinear Analysis)
A Note on the ${\cal L}$-Fuzzy Banach’s Contraction Principle,
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A Banach Contraction Theorem in Fuzzy Metric Spaces,
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On Fuzzy Contractive Mappings in Fuzzy Metric Spaces,
{\em Fuzzy Sets and Systems} 158 (2007) 915-921.

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On Set-Valued Nonlinear Equations in Menger Probabilistic Normed Spaces,
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Fuzzy $\psi$-Contractive Mappings in Non-Archimedean Fuzzy Metric Space,
{\em Fuzzy Sets and Systems} 159 (2008) 739-744.

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Fixed Point Theorems in Fuzzy Metric Spaces Using Property E.A.,
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A Fixed Point Approach to Almost Quadratic Mappings in Quasi Fuzzy Normed Spaces,
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Fuzzy Versions of Hyers-Ulam-Raissias, Theorem,
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Fixed-Point Theorems in Intuitionistic Fuzzy Metric Spaces,
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Stability of Jensen Functional Equation in Intuitionistic Fuzzy Normed Space,
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Intuitionistic Fuzzy $2$-Normed Space and Some Related Concepts,
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Baire’s and Cantor’s Theorems in Intuitionistic Fuzzy $2$-Metric Spaces,
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Fixed Point Theorems for Fuzzy Mappings,
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COmpletely Generalized Strongly Quasi-Variational Inequalities for Fuzzy Mapping,
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A Note on “Some Results on the IF-normed Space”,
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Fuzzy Normed Linear Space and Its Topological Structure,
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Some Fixed Point Theorems in Fuzzy Reflexive Banach Spaces,
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Statistical Convergence in Fuzzy Normed Linear Spaces,
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Common Fixed Point Theorem in Partially Ordered ${\cal L}$-Fuzzy Metric Spaces,
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Fuzzy Upper Bounds and Their Applications
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Resonance Theorems for Family of Quasi-Homogeneous Operators
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Fixed Point Theorems for Fuzzy Mappings,
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Nonconvex Fuzzy Mappings and the Fuzzy Pre-Variational Inequality,
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Generalized Convex Fuzzy Mappings and the Fuzzy Variational-like Inequality,
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\item Xiao, J.-Z. and Zhu, X.-H.: (Fuzzy Nonlinear Analysis)
Topological Degree Theory and Fixed Point Theorems in Fuzzy Normed Space,
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\item Xiao, J.-Z. and Zhu, X.-H.:
Fuzzy Normed Space of Operators and Its Completeness,
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Fr\'{e}chet Differentiation of Nonlinear Operators between Fuzzy Normed Space,
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On Fuzzy $\alpha$-I-Continuous and Fuzzy $\alpha$-I-Open Functions,
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\begin{equation}{\label{n}}\tag{N}\mbox{}\end{equation}

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A Hahn-Banach Theorem for Integral Polynomials,
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The Hahn-Banach Theorem and the Separation Theorem in a Partially Ordered Vector Space,
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Unique Hahn-Banach Extensions and Korovkin’s Theorem,
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Extreme Points on the Hahn-Banach-Kantorovi\v{c} Setting,
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Geometric Form of the Hahn-Banach Theorem for Generalized Convexity,
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Banach Spaces with a Restricted Hahn-Banach Extension Property,
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The Hahn-Banach Theorem for Partially Ordered Totally Convex, Positively
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A Generalization of the Hahn-Banach Theorem,

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Hahn-Banach Operators,
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Strong Uniqueness of the Extension of Linear Continuous Functionals
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Uniqueness of Hahn-Banach Extensions and Unique Best Approximation,
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On the Fuzzy Hahn-Banach Theorem — An Analytic Form,
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Necessary Convexity Conditions for the Hahn-Banach Theorem in
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Almost Chebyshev Subspaces, Lower Semicontinuity and
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On Some Theorems of Hahn, Banach and Steinhaus,

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The Hahn-Banach Theorem Implies Sine’s Mean Ergodic Theorem,
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Measures on Semigroups and the Hahn-Banach Extension Property,
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A New Version of the Hahn-Banach Theorem,
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The Hahn-Banach-Lagrange Theorem,
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On the Hahn-Banach Type Theorem and the Jordan Decomposition of Module
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Some Results on Hahn-Banach-type Theorems for Continuous D-Cones,
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The Equivalence of the Least Upper Bound Property and the Hahn-Banach
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The Hahn-Banach Theorem for Modules,
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\begin{equation}{\label{o}}\tag{O}\mbox{}\end{equation}

Set-Valued Analysis.

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Discrete Second Order Inclusions,
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Multivalued Monotone Nonlinear Mappings and Duality Mappings in Banach Spaces,
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Remarks on the Set-valued Integrals of Debreu and Aumann.
{\em J. Math. Anal. and Appl.} 62 (1978) 243-246.

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Measurability Properties of Set-Valued Mappings in a Banach Space,
{\em SIAM Journal on Control} 8 (1970) 226-238.

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On the Differentiability of Multifunctions,
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Upper and Lower Probabilities Induced by a Multivalued Mapping.
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Differentiable Selections and Castaing Representations of Multifunctions,
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Continuous Selections and Approximate Selection for Set-Valued Mappings and Applications to Metric Projections,
{\em SIAM J. MAth. Anal.} 14 (1983) 185-194.

\item Diestel, J. and Faires, B.:
On Vector Measures,
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Fixed Point Theorems for Multi-Valued Transformation,
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On the Pettis Integral of Closed Valued Multifunctions,
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Randon-Nikodym Theorem for Set-valued Measures.
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Closed Images of Convex Multivalued Mappings in Linear Topological Spaces with Applications,
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Calaulus of Set Valued Functions and Control.
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Measurability and Integrability of the Weak Upper Limit of a Sequence of Multifunctions,
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Convergence of Conditional Expectations and Strong Laws of Large Numbers for Multivalued Random Variables,
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Radon-Nikodym Theorems for Set-Valued Measures,
{\em J. Multivariate Anal.} 8 (1978) 96-118.

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Integrals, Conditional Expectations and Martingales of Multivalued Functions.
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Fixed Point Theorems for Condensing Multifunctions,
{\em Proc. Amer. Math. Soc.} 23 (1969) 635-641.

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Some Selection Theorems for Measurable Functions,
{\em Canadian J. Math.} 21 (1969) 394-399.

\item Himmelberg, C.J. and Van Vleck, F.S.:
Multifunctions on Abstract Measurable Spaces and Application to Stochastic Decision Theory,
{\em Annali di Mathematica Pura ed Applicata} 101 (1974) 229-236.

\item Ioffe, A.D.:
Single-Valued Representation of Set-Valued Mappings,
{\em Trans. Amer. Math. Soc.} 252 (1979) 133-145.

\item Jacobs, M.Q.:
On the Approximation of Integrals of Multivalued Functions,
{\em SIAM J. Control} 7 (1969) 158-177.

\item Jain, N.C. \& Marcus, M.B. :
Central Limit Theorems for C(S)-Valued Random Variables,
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Some Properties of Choquet Integrals of Set-Valued Functions,
{\em Fuzzy Sets and Systems} 91 (1997) 95-98.

\item Jung, E.J. and Kim, J.H.:
On Set-Valued Stochastic Integrals,
{\em Stochastic Analysis and Applications} 21 (2003) 401-418.

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Generalized Delta Theorems for Multivalued Mappings and Measurable Selections,
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Convergence of Unbounded Multivalued Supermartingales in the Mosco and
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A Note on Intersection of Lower Semicontinuous Multifunctions,
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Multifunctions of Souslin Type,
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A Set-Valued Type Inequality System,
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On Quasilinear Spaces of Convex Bodies and Intervals,
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On the Algebraic Properties of Convex Bodies and Some Applications,
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Unbiased Set-Valued Estimators with Minimal Risk,
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Stochastic Aumann Integral,
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Stochastic Inclusions with Multivalued Integrators,
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Stability of Set-Valued Mapping in Infinite Dimensions : Point Criteria and Applications,
{\em SIAM J. Control Optim} 35 (1997) 285-314.

\item Mordukhovich, B.S. and Shao, Y. :
Fuzzy Calculus for Coderivatives of Multigunctions,
{\em Nonlinear Analysis, Theory, Methods and Applications} 29 (1997) 605-626,

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On Almost Continuous and Weakly Continuous Fuzzy Multifunctions,
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Multi-Valued Contraction Mappings,
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Some Fixed Point Theorems for Noncompact and Weakly Asymptotically Regular Set-Valued Mappings,
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C-Minimal Pairs of Compact Convex Sets,
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Decompositions of Compact Convex Sets,
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On the Theory of Banach Space Valued Multifunctions,
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\item Papageorgiou, N.S.:
Representation of Set Valued Operators,
{\em Trans. Amer. Math. Soc.} 292 (1985) 557-572.

\item Papageorgiou, N.S.:
A Convergence Theorem for Set Valued Supermartingales with Values in a Separable Banach Space,
{\em Stochastic Analysis and Applications} 5 (1987) 405-422.

\item Papageorgiou, N.S.:
Convergence Theorems for Banach Space Valued Integrable Multifunctions,
{\em International Journal of Mathematics and Mathematical Sciences} 10 (1987) 433-442.

\item Papageorgiou, N.S.:
A Relaxation Theorem for Differential Inclusions in Banach Spaces,
{\em Tohoku Mathematical Journal} 39 (1987) 505-517.

\item Papageorgiou, N.S. :
Convergence and Representation Theorems for Set Valued Random Processes,
{\em J. Math. Anal. Appl.} 150 (1990) 431-435.

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Equilibrium Existence Theorems in KKM Spaces,
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Generalized Convexity of Functions and Generalized Monotonicity of Set-Valued Maps,
{\em J. Optimization Theory and Applications} 92 (1997) 343-356.

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Representation of Semigroups as Systems of Compact Convex Sets,
{\em Proceedings of the American Mathematical Society} 65 (1977) 24-28.

\item Robinson, S.M. :
Regularity and Stability for Convex Multivalued Functions,
{\em Mathematical Programming Study} 1 (1976) 130-143.

\item Robinson, S.M. :
Some Continuity Properties of Polyhedral Multifunctions,
{\em Mathematical Programming Study} 14 (1981) 206-214.

\item Rockafellar, R.T. :
Lipschitzian Properties of Multifunctions,
{\em Nonlinae Analysis} 9 (1985) 867-885.

\item Ross, D.:
Random Sets without Separability,
{\em The Annals of Probability} 14 (1986) 1064-1069.

\item Salinetti, G. \& Wets, R. J.-B. :
On the Convergence of Closed-Valued Measurable Multifunctions,
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Cyclical Coincidences of Multivalued Maps,
{\em J. Math. Soc. Japan} 38 (1986) 515-525.

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Fuzzification of Set Inclusion : Theore and Applications,
{\em Fuzzy Sets and Systems} 55 (1993) 15-42.

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Weak Subdifferential of Set-Valued Mappings,
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Convergence of Iterative Algorithms for Multivalued Mappings in Banach Spaces,
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Generalized Hukuhara Differebtiability of Interval-Valued Functions and Interval Differential Equations,
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A Fuzzy Inclusion Based Approach to Upper Inverse Images under Fuzzy Multivalued Mappings,
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Martingales of Vector Valued Set Functions,
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The Range of a Vector-Valued Measure,
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Approximation of Convex Set-Valued Functions,
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$L_{p}$ Metrices for Compact, Convex Sets,
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Survey of Measurable Selection Theorems,
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Convergence of Sequences of Convex Sets, Cones and Functions,
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Convergence of Sequences of Convex Sets, Cones and Functions. II,
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Set-Valued Approximations and Newton’s Methods,
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Point-Based Set-Valued Approximations, C-Differential Operators and
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Set-Valued Measure and Fuzzy Set-Valued Measure,
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\begin{equation}{\label{p}}\tag{P}\mbox{}\end{equation}

Random Elements.

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Convergence in Distribution of Nonmeasurable Random Elements,
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\item Cantrell, A. and Rosalsky, A.:
On the Strong Law of Large Numbers for Sums of Independent Banach Space
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\item Hu, T.-C. and Chang, H.-C.:
Complete Convergence and the Law of Large Numbers for Arrays of Random
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\item Kuczmaszewska, A. and Szynal, D.:
On the Strong Law of Large Numbers for Weighted Sums of Random Elements in
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Strong Laws of Large Numbers for Negatively Dependent Random Elements,
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\begin{equation}{\label{q}}\tag{Q}\mbox{}\end{equation}

Random Sets.

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Convexification in Limit Law of Random Sets in Banach Spaces,
{\em The Annals of Probability} 13 (1985) 307-309.

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Law of Large Numbers for Random Sets and Allocation Peocesses,
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A Strong Law of Large Numbers for Random Compact Sets,
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The Variance of the Measure of a Two-Dimensional Random Set,
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A Strong Limit Theorem for Random Sets,
{\em Suppl. Adv. Appl. Prob.} 10 91978) 36-46.

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A Central Limit Theorem for Random Sets,
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Random Set Limit Theorem,
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A General Dominated Convergence Theorem for Unbounded Random Sets,
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Characterization and Domains of Attraction of p-stable Random Compact Sets,
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Some New Results Concerning Random Sets and Fuzzy Sets,
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The Distribution of Unbounded Random Sest and the Multivalued Strong Law of Large Numbers in Nonreflexive Banach Spaces,
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Exchangeability and Convergence for Random Sets,
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On the Variance of Random Sets,
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Limit Theorems for Sums of Independent, Compact, Random Subsets of
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Statistics of Random Compacts in Euclidean Space,
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L-Random Elements and $L^{*}$-Random Elements in Banach Speces,
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Random Elements in Linear Spaces,
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On Modeling of Linguistic Information Using Random Sets,
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Limit Theorems for Random Compact Sets in Banach Space,
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On the Convergence in Probability of Random Sets (Measurable Multifunctions),
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Weak Law of Large Numbers in Normed Linear Spaces,
{\em The Annals of Mathematical Statistics} 43 (1972) 1267-1274.

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Set-Valued Sationary Processes,
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An Application of the Central Limit Theorem for Banach-Space-Valued Random
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\begin{equation}{\label{r}}\tag{R}\mbox{}\end{equation}

Variational Inequalities.

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Variational Principles for Variational Inequalities,
{\em Numer. Funct. Anal. and Optimiz.} 10 (1989) 863-874.

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Coincidence Theorems, Minimax Theorems, and Variational Inequalities,
{\em Contemparary Mathematics} 26 (1984) 67-80.

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The Generalized Quasi-Variational Inequality Problem,
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Vector Variational Inequality and Vector Optimization Problem,——–
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Approximate Dual and Approximate Vector Variational Inequality for
Multiobjective Optimization,
{\em J. Austral. Math. Soc. (Series A)} 47 (1989) 418-423.

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A Vector Variational Inequality and Optimization over an Efficient Set,
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Existence of Solutions for a Vector Variational Inequality : An Extention
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\item Cubiotti, P. :
Generalized Quasi-Variational Enequalities in Infinite-Dimensional Normed
Spaces,
{\em J. Optimization Theory and Applications} 92 (1997) 457-475.

\item Cubiotti, P. :
Generalized Quasi-Variational Enequalities Without Continuities,
{\em J. Optimization Theory and Applications} 92 (1997) 477-495.

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Finite-Dimensional Quasi-Variational Inequalities Associated with
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{\em J. Optimization Theory and Applications} 72 (1992) 577-582.

\item Cubiotti, P. and Yao, J.-C.:
Discontinuous Implicit Quasi-Variational Inequalities with Applications to
Fuzzy Mappings,
{\em Mathematical Methods of Operations Research} 46 (1997) 213-228.

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An Iterative Scheme for Variational Inequalities,
{\em Mathematical Programming} 26 (1983) 40-47.

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Sensitivity Analysis in Variational Inequalities,
{\em Methematics of Operations Research} 13 (1988) 421-434.

\item Dafermos, S.C. \& McKelvey, S.C. :
Partionable Variational Inequalities with Applications to Network and Economic
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\item Dash, A.T. \& Nanda, S. :
A Complementarity Problem in Mathematical Programming in Banach Space,
{\em J. Math. Anal. Appl.} 98 (1984) 328-331.

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Generalized Variational Inequalities and Generalized Quasi-Variational
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Generalized Strongly Nonlinear Quasivariational Inequalities,
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\item Ding, X.P. :
Perturbed Proximal Point Algorithms for Generalized Quasivariational Inclusions,
{\em J. Math. Anal. Appl.} 210 (1997) 88-101.

\item Ding, X.P. \& Tarafdar, E. :
Monotone Generalized Variational Inequalities and Generalized Complementarity
Problems,
{\em J. Optimization Theory and Applications} 88 (1996) 107-122.

\item Ding, X.P. \& Tarafdar, E. :
Generalized Nonlinear Variational Inequalities with Nonmonotone Set-Valued Mappings,
{\em Appl. Math. Lett.} 7 \#4 (1994) 5-11.

\item Ding, X.P. \& Tarafdar, E. :
Existence and Uniqueness of Solutions for a General Nonlinear Variational
Inequality,
{\em Appl. Math. Lett.} 8 \#1 (1995) 31-36.

\item Ekeland, I. :
On the Variational Principle,
{\em J. Math. Anal. Appl.} 47 (1974) 324-353.

\item Fang, S.C.\& Peterson, E.L. :
Generalized Variational Inequalities,
{\em J. Optimization Theory and Applications} 38 (1982) 363-382.

\item Friesz, T.L., Tobin, R.L., Cho, H.-J. \& Mehta, N.J. :
Sensitivity Analysis Based Heuristic Algorithms for Mathematical Programs
with Variational Inequality Constraints,
{\em Mathematical Programming} 48 (1990) 265-284.

\item Fu, J. :
Simultaneous Vector Variational Inequalities and Vector Implicit Complementarity
Problem,
{\em J. Optimization Theory and Applications} 93 (1997) 141-151.

\item Fukushima, M. :
Equivalent Differentiable Optimization Problems and Decent Methods for
Asymmetric Variational Inequality Problems,
{\em Mathematical Programming} 53 (1992) 99-110.

\item Ganguly, A. and Wadhwa, K.:
On Random Variational Inequalities,
{\em Journal of Mathematical Analysis and Applications} 206 (1997) 315-321.

\item Gowda, M.S. \& Pang, J.-S. :
On the Boundedness and Stability of Solutions to the Affine Variational
Inequality Problem,
{\em SIAM J. Control and Optmization} 32 (1994) 421-441.

\item Guo, J.-S. \& Yao, J.-C. :
Extension of Strongly Nonlinear Quasivariational Inequalities,
{\em Appl. Math. Lett.} 5 (1992) 35-38.

\item G\”{u}rkan, G., \”{O}zge, A.Y. \& Robinson, S.M. :
Sample-Path Solution of Stochastic Variational Inequalities, with Applications
to Option Pricing.

\item G\”{u}rkan, G., \”{O}zge, A.Y. and Robinson, S.M.:
Sample-Path Solution of Stochastic Variational Inequalities,
{\em Mathematical Programming} 84 (1999) 313-333.

\item Gwinner, J. :
On Fixed Points and Variational Inequalities – A Circular Tour,
{\em Nonlinear Analysis} 5 (1981) 565-583.

\item Gwinner, J.:
A Class of Random Variational Inequalities and Simple Random Unilateral Boundary Value Problems — Existence, Discretization, Finite Element Approximation,
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\item Gwinner, J. and Raciti:
On a Class of Random Variational Inequalities,
{\em Numer. Funct. Anal. and Optimz.} 27 (2006) 619-636.

\item Hadjisavvas, N. \& Schaible, S. :
Quasimonotone Variational Inequalities in Banach Spaces,
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\item Harker, P.T. \& Pang, J.-S. :
Finite-Dimensional Variational Inequality and Nonlinear Complementarity
Problems : A Survey of Theory Algorithms and Applications,
{\em Mathematical Programming} 48 (1990) 161-220.

\item Jou, C.-R. \& Yao, J.-C. :
Extension of Generalized Multi-Valued Variational Inequalities,
{\em Appl. Math. Lett.} 6 (1993) 21-25.

\item Jovanov, D.S. :
Variational Inequalities with Cone Constraints,
{\em J. Optimization Theory and Applications} 75 (1992) 87-99.

\item Kien, B.T., Wong, M-.M., Wong, N.-C and Yao, J.-C.:
Degree Theory for Generalized Variational Inequalities and Applications,
{\em European Journal of Operational Research} 192 (2009) 730-736.

\item Kim, W.K. :
Remark on a Generalized Quasi-Variational Inequality,
{\em Proc. Amer. Math. Soc.} 103 (1988) 667-668.

\item Kim, W.K. \& Tan, K.K. :
A Variational Inequality in Non-compact Sets and Its Applications,
{\em Bull. Austral. Math. Soc.} 46 (1992) 139-148.

\item Klatte, D. and Kummer, B.:
Strong Lipschitz Stability of Stationary Solutions for Nonlinear Programs and Variational Inequalities,
{\em SIAM Journal on Optimization} 16 (2005) 96-119.

\item Krist\'{a}ly, A. and Varga, C.:
Ste-Valued Versions of Ky Fan’s Inequality with Application to Variational Inclusion Theory,
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\item Kyparisis, J. :
Solution Differentiability for Variational Inequalities,
{\em Mathematical Programming} 48 (1990) 285-301.

\item Kyparisis, J. :
Parametric Variational Inequalities with Multivalued Solution Sets,
{\em Mathematics of Operations Research} 17 (1992) 341-364.

\item Larsson, T. \& Patriksson, M. :
A Class of Gap Functions for Variational Inequalities,
{\em Mathematical Programming} 64 (1994) 53-79.

\item Lin, K.L., Yang, D.P. \& Tao, J.C. :
Generalized Vector Variational Inequalities,
{\em J. Optimization Theory and Applications} 92 (1997) 117-125.

\item Lions, J.L. \& Stampacchia, G. :
Variational Inequalities,
{\em Communications on Pure and Applied Mathematics} 20 (1967) 493-519.

\item Luo, Z.-Q. \& Tseng, P. :
Error Bound and Convergence Analysis of Matrix Splitting Algorithms for the Affine Variational Inequalty Problems,
{\em SIAM J. Optimization} 2 (1992) 43-54.

\item Magnanti, T.L. \& Perakis, G. :
The Orthogonality Theorem and the Strong-F-Monotonicity Condition for Variational Inequality Algorithms,
{\em SIAM J. Optim.} 7 (1997) 248-273.

\item Makler-Scheimberg, S., Nguyen, V.H. \& Strodiot, J.J. :
Family of Perturbation Methods for Variational Inequalities,
{\em J. Optimization Theory and Applications} 89 (1996) 423-452.

\item Mancino, O.G. \& Stampacchia, G. :
Convex Programming and Variational Inequalities,
{\em J. Optimization Theory and Applications} 9 (1972) 3-23.

\item Mangasarian, O.L. :
Global Error Bounds for Monotone Affine Variational Inequality Problems,
{\em Linear Algebra and Its Applications} 174 (1992) 153-163.

\item Marcotte, P. \& Dussault, J.-P. :
A Note on a Globally Convergent Newton Method for Solving Monotone Variational Inequalities,
{\em Operations Research Letters} 6 (1987) 35-42.

\item McLinden, L. :
Stable Monotone Variationa Inequalities,
{\em Mathematical Programming} 48 (1990) 303-338.

\item Mosco, U. :
Dual Variational Inequalities,
{\em J. Math. Anal. Appl.} 40 (1972) 202-206.

\item Mosco, U.:
Convergence of Convex Sets and of Solutions of Variational Inequalities,
{\em SIAM J. Control}, 510-585.

\item Naniewicz, Z. :
On Some Nonconvex Variational Problems Related to Hemivariational Inequalities,
{\em Nonlinear Analysis} 13 (1989) 87-100.

\item Noor, M.A. :
An Interative Algorithm for Variational Inequalities,
{\em J. Math. Anal. Appl.} 158 (1991) 448-455.

\item Noor, M.A. :
An Iterative Scheme for a Class of Quasi-Variational Inequalities,
{\em J. Math. Anal. Appl.} 110 (1985) 463-468.

\item Noor, M.A.:
Some Developments in General Variational Inequalities,
{\em Applied Mathematics and Computation} 152 (2004) 199-277.

\item Pang, J.-S. \& Chan, D. :
Iterative Methods for Variational and Complementarity Problems,
{\em Mathematical Programming} 24 (1982) 284-313.

\item Pang, J.-S. :
Asymmetric Variational Inequality Problems over Product Sets : Applications
and Iterative Methods,
{\em Mathematical Programming} 31 (1985) 206-219.

\item Pang, J.-S. :
Solution Differentiability and Continuation of Newton’s Method for
Variational Inequality Problems over Polyhedral Sets,
{\em J. Optimization Theory and Applications} 66 (1990) 121-135.

\item Pang, J.-S. :
A Posteriori Error Bounds for the Linearly-Constrained Variational Inequality
Problem,
{\em Mathematics of Operations Research} 12 (1987) 474-484.

\item Parida, J. and Sen, A. :
A Variational-like Inequality for Multifunctions with Applications,
{\em J. Math. Anal. Appl.} 124 (1987) 73-81.

\item Pang, J.-S. and Stewart, D.E.:
Differential Variational Inequalities,
{\em Mathematical Programming}, Ser. A, 113 (2008) 345-424.

\item Qiu, Y. and Magnanti, T.L. :
Sensitivity Analysis for Variational Inequalities Defined on Polyhedral Sets,
{\em Mathematics of Operations Research} 14 (1989) 410-432.

\item Qiu, Y. and Magnanti, T.L. :
Sensitivity Analysis for Variational Inequalities,
{\em Mathematics of Operations Research} 17 (1992) 61-76.

\item Shih, M.-H. \& Tan, K.-K. :
Generalized Quasi-Variational Inequalities in Locally Concex Topological
Vector Spaces,
{\em J. Math. Anal. Appl.} 108 (1985) 333-343.

\item Shih, M.-H. \& Tan, K.-K. :
Browder-Hartman-Stampacchia Variational Inequalities for Multivalued
Monotone Operators,
{\em J. Math. Anal. Appl.} 134 (1988) 431-440.

\item Shih, M.-H. \& Tan, K.K. :
Generalized Bi-quasi-variational Inequalities,
{\em J. Math. Anal. Appl.} 143 (1989) 66-85.

\item Siddigi, A.H. \& Ansari, Q.H. :
Strongly Nonlinear Quasivariational Inequalities,
{\em J. Math. Anal. Appl.} 149 (1990) 444-450.

\item Siddiqi, A.H. \& Ansari, Q.H. :
General Strongly Nonlinear Variational Inequalities,
{\em J. Math. Anal. Appl.} 166 (1992) 386-392.

\item Smith, M.J. :
A Descent Algorithm for Solving Monotone Variational Inequalities and Monotone
Complementarity Problems,
{\em J. Optimization Theory and Applications} 44 (1984) 485-498.

\item Solodov, M.V. \& Tseng, P. :
Modified Projection-Type Methods for Monotone Variational Inequalities,
{\em SIAM J. Control Optim} 34 (1996) 1814-1830.

\item Taji, K., Fukushima, M. \& Ibaraki, T. :
A Globally Convergent Newton Mathod for Solving Stringly Monotone
Variational Inequalities,
{\em Mathematical Programming} 58 (1993) 369-383.

\item Takahashi, W. :
Nonlinear Variational Inequalities and Fixed Point Theorems,
{\em J. Math. Soc. Japan} 28 (1976) 168-181.

\item Thore, S., Nagurney, A. \& Pan, J. :
Generalized Goal Programming and Variational Inequalities.
{\em Operations Research Letters} 12 (1992) 217-226.

\item Tian, G. \& Zhou, J. :
Quasi-Variational Inequalities with Non-compact Sets,
{\em J. Math. Anal. Appl.} 160 (1991) 583-595.

\item Tobin, R.L. :
Sensitivity Analysis for Variational Inequalities,
{\em J. Optimization Theory and Applications} 48 (1986) 191-204.

\item Wu, X. and Yuan, X.-Z.:
On Equilibrium Problem of Abstract Economy, Generalized Quasi-Variational
Inequality, and an Optimization Problem in Locally $H$-Convex Spaces,
{\em Journal of Mathematical Analysis and Applications} 282 (2003) 495-504.

\item Xia, F.-Q., Huang, N.-J. and Liu, Z.-B.:
A Projected Subgradient Method for Solving Generalized Mixed Variational Inequalities,
{\em Operations Research Letters} 36 (2008) 637-642.

\item Yamashita, N. \& Fukushima, M. :
Equivalent Unconstrained Minimization and Global Error Bounds for
Variational Inequality Problems,
{\em SIAM J. Control Optim} 35 (1997) 273-284.

\item Yamashita, N., Taji, K. \& Fukushima, M. :
Unconstrained Optimization Reformulation of Variational Inequality Problems,
{\em J. Optimization Theory and Applications} 92 (1997) 439-456.

\item Yang, X.Q. :
Generalized Convex Functions and Vector Variational Inequalities,
{\em J. Optimization Theory and Applications} 79 (1993) 563-580.

\item Yang, X.Q. :
Vector Variational Inequality and Its Duality,
{\em Nonlinear Analysis} 21 (1993) 869-877.

\item Yao, J.-C. :
A Basic Theorem of Complementarity for the Generalized Variational-like
Inequality Problem,
{\em J. Math. Anal. Appl.} 158 (1991) 124-138.

\item Yao, J.-C. :
The Generalized Quasi-Variational Inequality Problem with Applications,
{\em J. Math. Anal. Appl.} 158 (1991) 139-160.

\item Yao, J.-C. :
Applications of Variational Inequalities to Nonlinear Analysis,
{\em Appl. Math. Lett.} 4 (1991) 89-92.

\item Yao, J.-C. :
Variational Inequality,
{\em Appl. Math. Lett.} 5 (1992) 39-42.

\item Yao, J.-C. :
General Variational Inequalities in Banach Spaces,
{\em Appl. Math. Lett.} 5 (1992) 51-54.

\item Yao, J.-C. :
The Unification of the Calculus of Variations and the Theory of Nonlinear
Operators in Banach Spaces,
{\em Appl. Math. Lett.} 5 (1992) 81-84.

\item Yao, J.C. :
Multi-Valued Variational Inequalities with K-Pseudomonotone Operators,
{\em J. Optimization Theory and Applications} 83 (1994) 391-403.

\item Yao, J.C. \& Guo, J.-S. :
Variational and Generalized Variational Inequalities with Discontinuous
Mappings,
{\em J. Math. Anal. Appl.} 182 (1994) 371-392.

\item Yao, J.-C. :
Generalized-Quasi-Variational Inequality Problem with Discontinuous Mappings,
{\em Mathematics of Operations Research} 20 (1995) 465-478.

\item Yen, C.-Y. :
A Minimax Inequality and Its Applications to Variational Inequalities,
{\em Pacific J. Math.} 97 (1981) 477-481.

\item Yu, S.J. \& Yao, J.C. :
On Vector Variational Inequalities,
{\em J. Optimization Theory and Applications} 89 (1996) 749-769.

\item Wu, J.H., Florian, M. \& Marcotte, P. :
A General Descent Framework for the Monotone Variational Inequality Problem,
{\em Mathematical Programming} 61 (1993) 281-300.

\item Wu, Z. and Wu, S.-Y.:
Gateaux Differentiability of the Dual Gap Function of a Variational Inequality,
{\em European Journal of Operational Research} 190 (2008) 328-344.

\item Zeng, L. :
Iterative Algorithms for Finding Approximate Solutions for General Strongly
Nonlinaer Variational Inequalities,
{\em J. Math. Anal. Appl.} 187 (1994) 352-360.

\begin{equation}{\label{s}}\tag{S}\mbox{}\end{equation}

Variational Principles.

\item Altman, M.:
A Generalization of the Br\'{e}zis-Browder Principle on Ordered Sets,
{\em Nonlinear Analysis} 6 (1982) 157-165.

\item Az\'{e}, D. and Corvellec, J.-N.:
On Some Variational Properties of Metric Spaces,
{\em Journal of Fixed Point Theory and Applications} 4 (2008) 177-182.

\item Bao, T.Q. and Mordukhovich, B.S.:
Variational Principles for Set-Valued Mappings with Applications to Multiobjective Optimization,
{\em Control and Cybernetics} 36 (2007) 531-562.

\item Bolintin\'{e}anu, S.:
Vector Variational Principles: $\varepsilon$-Efficiency and Scalar Stationarity,
{\em Journal of Convex Analysis} 8 (2001) 71-85.

\item Br\'{e}zis, H. and Browder, F.E.:
A General Principle on Ordered Sets in Nonlinear Functional Analysis,
{\em Advances in Mathematics} 21 (1976) 355-364.

\item Br\o ndsted, A.:
On a Lemma of Bishop and Phelps,
{\em Pacific Journal of Mathematics} 55 (1974) 335-341.

\item Cammaroto, F., Chinni, A. and Sturiale, G.:
A Remark on Ekeland’s Principle in Locally Convex Topological Vector Spaces,
{\em Mathematical and Computer Modelling} 30 (1999) 75-79.

\item Georgiev, P.G.:
Parametric Ekeland’s Variational Principle,
{\em Applied Mathematics Letters} 14 (2001) 691-696.

\item Goga, G.:
Some Equivalent Geometrical Results with Ekeland’s Variational Principle,
??? 13 (2005) 79-88.

\item G\”{o}pfert, A., Tammer, C. and Z\v{a}linescu, C.:
A New Minimal Element Theorem in Product Spaces,
{\em Journal for Analysis and Its Applications} 18 (1999) 767-770.

\item G\”{o}pfert, A., Tammer, C. and Z\v{a}linescu, C.: (E-Articles)
On the Vectorial Ekeland’s Variational Principle and Minimal Points in Product Spaces,
{\em Nonlinear Analysis} 39 (2000) 909-922.

\item Ha, T.X.D.:
The Ekeland’s Variational Principle for Set-Valued Maps Involving Coderivatives,
{\em Journal of Mathematical Analysis and Applications} 286 (2003) 509-523.

\item Ha, T.X.D.:
Variants of the Ekeland Variational Principle for a Set-Valued Map Involving the Clarke Normal Cone,
{\em Journal of Mathematical Analysia and Applications} 316 (2006) 346-356.

\item Hamel, A.H.:
Equivalents to Ekeland’s Variational Principle in Uniform Spaces,
{\em Nonlinear Analysis} 62 (2005) 913-924.

\item Hamel. A.H. and L\”{o}hne,A.:
A Minimal Element Theorem in Uniform Spaces,

\item Qiu, J.-H.:
The Density of Extremal Points in Ekeland’s Variational Principle,
{\em Journal of Mathematical Analysis and Applications} ???

\item Qiu, J.-H.:
A Generalized Ekeland Vector Variational Principle and Its Applications in Optimization,
{\em Nonlinear Analysis} 71 (2009) 4705-4717.

\item Suzuki, T.:
The Strong Ekelan Variational Principle,
{\em Journal of Mathematical Analysis and Applications} 320 (2006) 787-794.

\begin{equation}{\label{t}}\tag{T}\mbox{}\end{equation}

Vector Measures.

\item Garc\'{i}a-V\'{a}zquez, J.C.:
Products of Vector Measures,
{\em Journal of Mathematical Analysis and Applications} 206 (1997) 25-41.

\item Janicka, L.:
Radon-Nikodym Problem for the Variation of a Vector Measure,
{\em Pacific Journal of Mathematics} 144 (1990) 293-297.

\item Kawabe. J.: (E-Articles)
The Alexandroff Theorem for Riesz Space-Valued Non-Additive Measures,
{\em Fuzzy Sets and Systems} 158 (2007) 2413-2421.

\item Masani, P.: (Vector Measures)
The Distribution FUnctions of Finitely Additive Vector Measures over
$I\!\! R^{q}$, I,
{\em Journal of Mathematical Analysia and Applications} 98 (1984) 166-178.

\item Molina, J.A.L. and P\'{e}rez, E.A.S.:
Ultrapowers of Spaces of Integrable Functions with Respect to a Sequential
Vector Measure and Locally Bounded Sets of Functions,
{\em Journal of Mathematical Analysis and Applications} 290 (2004) 542-552.

\item Romero-Moreno, M.C.:
The Range of a Vector Measure and a Randon-Nikodym Problem for the Variation,
{\em Arch. Math.} 70 (1998) 74-82.

\begin{equation}{\label{u}}\tag{U}\mbox{}\end{equation}

Vector Integrals.

\item Chivukula, R.R. and Sastry, A.S.:
Product Vector Measures via Bartle Integrals,
{\em Journal of Mathematical Analysis and Applications} 96 (1983) 180-195.

\item Cross, G. and Shisha, O.:
A New Approach to Integration,
{\em Journal of Mathematical Analysis and Applications} 114 (1986) 289-294.

\item Edalat, A.:
Domain Theory and Integration,
{\em Theoretical Computer Science} 151 (1995) 163-193.

\item Edalat, A. and Negri, S.:
The generalized Riemann Integral on Locally Compact Spaces,
{\em Topology and Its Applications} 89 (1998) 121-150.

\item El Amri, K. and Hess, C.:
On the Pettis Integral of Closed Valued Multifunctions,
{\em Set-Valued Analysis} 8 (2000) 329-360.

\item Freniche, F.J. and Garc\'{i}a-V\'{a}zquez, J.C.:
The Bartle Bilinear Integration and Carleman Operators,
{\em Journal of Mathematical Analysis and Applications} 240 (1999) 324-339.

\item Hu, S. and Lakshmikantham, V.:
Some Remarks on Generalized Riemann Integrals,
{\em Journal of Mathematical Analysis and Applications} 137 (1989) 515-527.

\item Janiec, E. :
A Riemann Integral with Values in a Metric Space : I.
{\em J. the London Mathematical Society} (2) 44 (1991) 445-462.

\item Lewis, J.T. and Shisha, O.:
The Generalized Riemann, Simple, Dominated and Improper Integrals,
{\em Journal of Approximation Theory} 38 (1983) 192-199.

\item Martellotti, A. and Sambucini, A.R.:
On the Comparison of Aumann and Bochner Integrals,
{\me Journal of Mathematical Analysis and Applications} 260 (2001) 6-17.

\item McShane, E.J.:
A Unified Theory of Integration,
{\em The American Mathematical Monthly} 80 (1973) 349-359.

\item Mortensen, J.W. and Pfeffer, W.F.:
Multipliers for the Generalized Riemann Integral,
{\em Journal of Mathematical Analysis and Applications} 187 (1994) 538-547.

\item Pfeffer, W.F.:
A Note on the Generalized Riemann Integral,
{\em Proceedings of the American Mathematical Society} 103 (1988) 1161-1166.

\item Precupanu, A.-M. and Satco, B.:
The Aumann-Gould Integral,
{\em Mediterranean Journal of Mathematics} 5 (2008) 429-441.

\item Rickart, C.E.:
Integration in a Convex Linear Topological Space,
{\em Trans. Amer. Math. Soc.} 52 (1942) 498-521.

\item Rieffel, M.A.:
The Radon-Nikodym Theorem for the Bochner Integral,
{\em Trans. of the American Mathematical Society} 131 (1968) 466-487.

\item Shisha, O.:
The Genesis of the Generalized Riemann Integral,
{\em Computers and Mathematics with Applications} 30 (1995) 207-211.

\item Wu, W.-Z., Zhang, W.-X. and Wang, R.-M.:
Set-Valued Bartle Integrals,
{\em Journal of Mathematical Analysis and Applications} 255 (2001) 1-20.

\item Zimmer, G.B.:
An Extension of the Bochner Integral Generalizing the Loeb-Osswald Integral,
{\em Math. Proc. Camb. Phil. Soc.} 123 (1998) 119-131.

\begin{equation}{\label{v}}\tag{V}\mbox{}\end{equation}

Vector Lattices.

\item Adamski, W.:
On Measures Integrating All Functions of a Given Vector Lattice,
{\em Monatshefte f\”{u}r Mathematik} 103 (1987) 169-176.

\item Amor, F.B. and Boulabiar, K.:
On the Modulus of Disjointness Preserving Operators on Complex Vector Lattices,
{\em Algebra Universalis} 54 (2005) 185-193.

\item Annulis, J.T.:
A Characterization of Extended Vector Lattices,
{\em Journal of London Math. Soc.} 14 (1976) 86-90.

\item Bernau, S.J.:
Orthomorphisms of Archimedean Vector Lattices,
{\em Math. Proc. Camb. Phil. Soc.} 89 (1981) 119-128.

\item Bernau, S.J.:
Extension of Vector Lattice Homomorphism,
{\em J. London Math. Soc.} 33 (1986) 516-524.

\item Beynon, W.M.:
Duality Theorems for Finitely Generated Vector Lattices,
{\em Proc. London Math. Soc.} 31 (1975) 114-128.

\item Bleier, R.D.:
Vector Lattices Generated by Two Elements,
{\em Proc. Amer. Math. Soc.} 39 (1973) 1-9.

\item Bochner, S. and Phillips, R.S.:
Additive Set Functions and Vector Lattices,
{\em Annals of Mathematics} 42 (1941) 316-324.

\item Burkinshaw, O.:
Weak Compactness in the Order Dual of a Vector Lattice,
{\em Trans. Amer. Math. Soc.} 187 (1974) 183-201.

\item Chen, Z.L. and Weber, M.R.:
On Finite Elements in Vector Lattices and Banach Lattices
{\em Math. Nachr.} 279 (2006) 495-501.

\item Chen, Z.L. and Wickstead, A.W.:
Vector Lattices of Weakly Compact Operators on Banach Lattices,
{\em Trans. Amer. Math. Soc.} 352 (1999) 397-412.

\item Conrad, P.F.:
Countable Vector Lattices,
{\em Bull. Austral. Math. Soc.} 10 (1974) 371-376.

\item Feldman, W.A. and Porter, J.F.:
A Vector Lattice Topology and Function Space Representation,
{\em Trans. Amer. Math. Soc.} 235 (1978) 193-204.

\item Fleischer, I.:
Functional Representation of Vector Lattices,
{\em Proc. Amer. Math. Soc.} 108 (1990) 471-478.

\item Florenzano, M. and Marakulin, V.M.:
Production Equilibria in Vector Lattices,
{\em Economic Theory} 17 (2001) 577-598.

\item Fowler, P.A.:
Infimum and Dominance Principles in Vector Lattices,
{\em Pacific Journal of Mathematics} 59 (1975) 437-443.

\item Fremlin, D.H.:
On the Completion of Locally Solid Vector Lattices,
{\em Pacific Journal of Mathematics} 43 (1972) 341-347.

\item Goffman, C.:
Completeness in Topological Vector Lattices,
{\em The American Mathematical Monthly} 66 (1959) 87-92.

\item Hahn, N., Hahn, S. and Weber, M.R.:
On Some Vector Lattices of Operators and Their Finite Elements,
{\em Positivity} 13 (2009) 145-163.

\item Hsu, I.-C.:
A Fundamental Functional Equation for Vector Lattices,
{\em Aeuqationes Math.} 13 (1975) 275-278.

\item Jakub\'{i}k, J.:
Complete Distributivity of Lattice Ordered Groups and of Vector Lattices,
{\em Czechoslovak Mathematical Journal} 51 (2001) 889-896.

\item Jakub\'{i}k, J.:
On Vector Lattices of Elementary Carath\'{e}odory Functions,
{\em Czechoslovak Mathematical Journal} 55 (2005) 223-236.

\item Kawasaki, T.:
Denjoy Integral and Henstock-Kurzweil Integral in Vector Lattices,
{\em Czechoslovak Mathematical Journal} 59 (2009) 381-399.

\item Kendall, D.G.:
Simplexes and Vector Lattices,
{\em Journal of London Math. Soc.} 37 (1962) 365-371.

\item Khan, M.A., Tourky, R. and Vohra, R.:
The Supremum Argument in the New Approach to the Existence of Equilibrium in Vector Lattices,
{\em Economics Letters} 63 (1999) 61-65.

\item Labuschagne, C.C.A. and Pinchuck, A.L.:
The Set of Fuzzy Points of a Fuzzy Vector Lattice is not a Vector Lattice,
{\em Fuzzy Sets and Systems} 157 (2006) 2783-2785.

\item Lipecki, Z.:
Extension of Vector-Lattice Homomorphism,
{\em Proc. Amer. Math. Soc.} 79 (1980) 247-248.

\item Lipecki, Z.:
On Binary-type Approximations in Vector Lattices,
{\em Archiv der Mathematik} 62 (1994) 545-553.

\item Llerena, F. and Rafels, C.:
The Vector Lattice Structure of the $n$-Person TU Games,
{\em Games and Economic Behavior} 54 (2006) 373-379.

\item Lowdenslager, D.B.:
Duality in Vector Lattices,
{\em Proc. Amer. Math. Soc.} 8 (1957) 476-483.

\item Macula, A.J.:
Free $\alpha$-Extension of an Archimedean Vector Lattice and Their Topological Duals,
{\em Trans. Amer. Math. Soc.} 332 (1992) 437-448.

\item Marakulin, V.M.:
Equilibria with Nonstandard Prices in Vector Lattices Overlapping Generations Economies,
{\em Journal of Mathematical Analysis and Applications} 282 (2003) 648-667.

\item Mas-Colell, A.:
The Price Equilibrium Existence Problem in Topological Vetor Lattices,
{\em Econometrica} 54 (1986) 1039-1053.

\item Masterson, J.J.:
Dual Spaces of a Vector Lattice and Its Cut-Completion,
{\em Trans. Amer. Math. Soc.} 128 (1967) 515-522.

\item McGill, P.:
Integration in Vector Lattices,
{\em Journal of London Math. Soc.} 11 (1975) 347-360.

\item McPolin, P.T.N. and Wickstead, A.W.:
The Order Boundedness of Band Preserving Operators on Uniformly Complete Vector Lattices,
{\em Math. Proc. Camb. Phil. Soc.} 97 (1985) 481-487.

\item Nakai, M.and Sario, L.:
Continuity of Mappings of Vector Lattices with Norms and Seminorms,
{\em Kodai Math. Sem. Rep.} 22 (1970) 473-479.

\item N\'{e}meth, A.B.:
Characterization of a Hilbert Vector Lattice by the Metric Projection onto Its Positive Cone,
{\em Journal of Approximation Theory} 123 (2003) 295-299.

\item Orihara, M.:
On the Regular Vector Lattice,
{\em } 525-529.

\item Papert, D.:
A Note on Vector Lattices and Integration Theory,
{\em Journal of London Math. Soc.} 38 (1963) 477-485.

\item Reichard, R.:
Extending a Norm from a Vector Lattice to Its Dedekind Completion,
{\em Math. Z.} 124 (1972) 83-88.

\item Schaefer, H.H.:
On the Completeness of Topological Vector Lattices,
()303-309.

\item Thanh, D.T.:
On Vector Lattices of Continuous Functions in Locally Compact Spaces,
{\em Acta Math. Hung.} 52 (1988) 227-232.

\item Topping, D.M.:
Vector Lattices of Self-Adjoint Operators,
{\em Trans. Amer. Math. Soc.} 115 (1965) 14-30.

\item Tourky, R.:
A New Approach to the Limit Theorem on the Core of an Economy in Vector Lattices,
{\em Journal of Economic Theory} 78 (1998) 321-328.

\item Tourky, R.:
The Limit Theorem on the Core of a Production Economy in Vector Lattices with Unordered Preferences,
{\em Economic Theory} 14 (1999) 219-226.

\item Tucker, L.D.:
Embedding Partially Ordered Spaces in Topological Semilattices,
{\em Proc. Amer. Math. Soc.} 33 (1972) 203-206.

\item Veksler, A.I.:
Finitely Extendable Functionals on Vector Lattices,
{\em Positivity} 1 (1997) 219-237.

\item Wright, J.D.M.:
Vector Lattice Measures on Locally Compact Spaces,
{\em Math. Z.} 120 (1971) 193-203.

\item Wright, J.D.M.:
Embeddings in Vector Lattices,
{\em Journal of London Math. Soc.} 8 (1974) 699-704.

\item Wright, J.D.M.:
An Algebraic Characterization of Vector Lattices with the Borel Regularity Property,
{\em Journal of London Math. Soc.} 7 (1973) 277-285.

\item Wright, J.D.M.:
Embeddings in Vector Lattices,
{\em Journal of London Math. Soc.} 8 (1974) 699-704.

\item Yosida, K.:
Vector Lattices and Additive Set Functions,
{\em } 17 () 228-232.

\item Yosida, K.:
On the Representation of the Vector Lattice,
{\em } 339-342.

\item Yosida, K.:
On Vector Lattice with a Unit, I and II
{\em } 121-124 and 479-482.

\begin{equation}{\label{w}}\tag{W}\mbox{}\end{equation}

Nonstandard Analysis.

\item Albeverio, S. and Herzberg, F.S.:
A Combinatorial Infinitesimal Representation of L\'{e}vy Processes and an Application to Incomplete Markets,
{\em Stochastics} 78 (2006) 301-325.

\item Loeb, P.A. and Osswald, H.:
Nonstandard Integration Theory in Topological Vector Lattices,
{\em Monatshefte f\”{u}r Mathematik} 124 (1997) 53-82.

\item Penot, J.-P.:
Infinitesimal Calculus in Metric Spaces,
{\em Journal of Geometry and Physics} 57 (2007) 2455-2465.

\item Wesley, E.:
An Application of Nonstandard Analysis to Game Theory,
{\em The Journal of Symbolic Logic} 36 (1971) 385-394.

\begin{equation}{\label{x}}\tag{X}\mbox{}\end{equation}

Uncategorized

\item Casazza, P.G. and Nielsen, N.J.:
Embeddings of Banach Spaces into Banach Lattices and the Gordon-Lewis Property,
{\em Positivity} 5 (2001) 297-321.

\item Conradie, J.: (E-Articles)
Asymmetric norms, cones and partial orders,
{\em Topology and its Applications} 193 (2015) 100-115.

\item Garc\'{i}a-Raffi, L.M., Romaguera, S. and S\'{a}nchez-P\'{e}rez, E.A.: (E-Articles)
On Hausdorff asymmetric normed linear spaces,
{\em Houston Journal of Mathematics} 29 (2003) 717-728.

\item Henson, C.W. and Raynaud, Y.:
On the Theory of $L_{p}$ ($L_{q}$)-Banach Lattices,
{\em Positivity} 11 (2007) 201-230.

\item Jonge, E.D.:
Radon-Nikodym Derivatives for Banach Lattice-Valued Measures,
{\em Proceedings of the American Mathematical Society} 83 (1981) 489-495.

\item Kalton, N.J.:
Embedding $L_{1}$ in a Banach Lattice,
{\em Israel Journal of Mathematics} 32 (1979) 209-220.

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Hsien-Chung Wu
Hsien-Chung Wu
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