-quasimonotone equilibrium problems in convex metric spaces
References
- Wu WT. A remark on the fundamental theorem in the theory of games. Sci Rec New Ser. 1959;3:229–233.
- Horvath CD. Extension and selection theorems in topological spaces with generalized convexity structure. Ann Fac Sci Toulouse. 1993;2:353–369.
- Tuy H. On a general minimax theorem. Soviet Math Dokl. 1974;15:1689–1693.
- Stachó LL. Minimax theorems beyond topological vector spaces. Acta Sci Math. 1980;42:157–164.
- Kindler J. Topological intersection theorems. Proc Amer Math Soc. 1993;117:1003–1011.
- K\"{o}nig H. A general minimax theorem based on connectedness. Arch Math. 1992;59:55–64.
- Khanh PQ, Quan NH. Intersection theorems, coincidence theorems and maximal-element theorems in GFC-spaces. Optimization. 2010;59:115–124.
- Khanh PQ, Quan NH. A topological characterization of the existence of fixed points and applications. Math Nachr. 2014;287:281–289.
- Park S. Continuous selection theorems in generalized convex spaces. Numer Funct Anal Optim. 1999;25:567–583.
- Park S. Elements of the KKM theory for generalized convex spaces. Korean J Comput Appl Math. 2000;7:1–28.
- Ding XP. Maximal element theorems in product FC-spaces and generalized games. J Math Anal Appl. 2005;305:29–42.
- Khanh PQ, Quan NH. Topologically-based characterizations of the existence of solutions to optimization-related problems. Math Nachr. 2015;288:2057–2078.
- Takahashi W. A convexity in metric space and nonexpansive mappings. I Kodai Mathematical Seminar Reports. Department of Mathematics, Tokyo Institute of Technology. 1970;22:142–149.
- Fukhar-ud-din H, Khamsi MA, Khan AR. Viscosity iterative method for a finite family of generalized asymptotically quasi-nonexpansive mappings in convex metric spaces. J Nonlinear Convex Anal. 2015;16:47–58.
- Gabeleh M, Shahzad N. Some new results on cyclic relatively nonexpansive mappings in convex metric spaces. J Inequal Appl. 2014;350:1–14.
- Fukhar-ud-din H, Nieto JJ, Khan AR. Common fixed point iterations of non-lipschitzian mappings in a convex metric space. Mediterranean J Math. 2016;13:2061–2071. doi:10.1007/s00009-015-0619-y.
- Shimizu T, Takahashi W. Fixed points of multivalued mappings in certain convex metric spaces. Topol Methods Nonlinear Anal. 1996;8:197–203.
- Blum E, Oettli W. From optimization and variational inequalities to equilibrium problems. Math Stud. 1994;63:123–145.
- Muu LD, Oettli W. Convergence of an adaptive penalty scheme for finding constrained equilibria. Nonlinear Anal. 1992;18:1159–1166.
- Fan K. A minimax inequality and applications. In: Shisha O, editor. Inequalities III. New York (NY): Academic Press; 1972. p. 103–113.
- Knaster B, Kuratowski C, Mazurkiewicz S. Ein Beweies des Fixpunktsatzes fr N Dimensionale Simplexe. Fund Math. 1929;14:132–137.
- Fan K. A generalization of Tychonoffs fixed point theorem. Math Ann. 1961;142:305–310.
- Bigi G, Castellani M, Pappalardo M, Passacantando M. Existence and solution methods for equilibria. Eur J Oper Res. 2013;227:1–11.
- Bianchi M, Pini R. Coercivity conditions for equilibrium problems. J Optim Theory Appl. 2005;124:79–92.
- Bianchi M, Pini R. A note on equilibrium problemswith properly quasimonotone bifunctions. J Glob Optim. 2001;20:67–76.
- Castellani M, Giuli M. Refinements of existence results for relaxed quasimonotone equilibrium problem J Glob Optim. 2013;57:1213–1227.
- Iusem AN, Kassay G, Sosa W. On certain conditions for the existence of solutions of equilibrium problems. Math Prog. 2009;2009(116):259–273.
- Iusem AN, Sosa W. New existence results for equilibrium problems. Nonlinear Anal. 2003;52:621–635.
- Jafari S, Farajzadeh AP. Existence results for equilibrium problems under strong sign property. Int J Nonlinear Anal Appl. 2017.
- Fan K. Some properties of convex sets related to fixed point theorems. Math Ann. 1984;266:519–537.
- Karamardian S, Schaible S. Seven kinds of monotone maps. J Optim Theory Appl. 1990;66:37–46.
- Hadjisavvas N. Continuity and maximality properties of pseudomonotone operators. J Convex Anal. 2003;10:459–469.
- Aussel D, Garcia Y. On Extensions of Kenderov’s single-valuedness result for monotone maps and quasimonotone maps. SIAM J Optim. 2014;24:702–713.
- Aussel D, Luc DT. Existence conditions in general quasimonotone variational inequalities. Bull Austral Math Soc. 2005;71:285–303.
- Vial JP. Strong and weak convexity of sets and functions. Math Oper Res. 1983;8:231–259.
- Farajzadeh AP, Zafarani J. Equilibrium problems and variational inequalities in topological vector spaces. Optimization. 2010;59:485–499.
- Aussel D, Hadjisavvas N. On quasimonotone variational inequalities. J Optim Theory Appl. 2004;121:445–450.
- Jafari S, Farajzadeh AP, Moradi S. Locally densely defined equilibrium problems. J Optim Theory Appl. 2016;170:804–817.