[Alfuraidan, M., & Ansari, Q. (2016). Fixed point theory and graph theory: Foundations and integrative approaches, London, England: Academic Press-Elsevier.10.1016/B978-0-12-804295-3.50013-9]Search in Google Scholar
[Guran, L., & Bota, M.-F. (2015). Ulam-Hyers stability problems for fixed point theorems concerning α-ψ-Type contractive operators on KST-Spaces, International Conference on Nonlinear Operators, Differential Equations and Applications, Cluj-Napoca, Romania.]Search in Google Scholar
[Hasanzade Asl, J., Rezapour, S., & Shahzad, N. (2012). On fixed points of α-ψ-contractive multifunctions, Fixed Point Theory and Applications, 212. doi: 10.1186/1687-1812-2012-212.10.1186/1687-1812-2012-212]Search in Google Scholar
[Isac, G., Yuan, X.-Z., Tan, K. K., & Yu, I. (1998). The study of minimax inequalities, abstract economics and applications to variational inequalities and nash equilibria, Acta Appl. Math., 54(2), 135-166.]Search in Google Scholar
[Kohlberg, E., & Mertens, J. F. (1986). On the strategic stability of equilibrium points, Econometrica, 54, 1003-1037.10.2307/1912320]Search in Google Scholar
[Li, J. L. (2014). Several extensions of the abian-brown fixed point theorem and their applications to extended and generalized nash equilibria on chain-complete posets, J. Math. Anal. Appl., 409, 1084-1002.10.1016/j.jmaa.2013.07.070]Search in Google Scholar
[Lin, Z. (2005). Essential components of the set of weakly pareto-nash equilibrium points for multiobjective generalized games in two different topological spaces, Journal of Optimization Theory and Applications, 124(2), 387-405.10.1007/s10957-004-0942-0]Search in Google Scholar
[Longa, H. V., Nieto, J. J., & Son, N. T. K. (2016). New approach to study nonlocal problems for differential systems and partial differential equations in generalized fuzzy metric spaces, Preprint submitted to fuzzy sets and systems.]Search in Google Scholar
[Nadler, S. B. Jr. (1969). Multi-valued contraction mappings, Pacific J. Math., 30, 475-487.]Search in Google Scholar
[Owen, G. (1974). Teoria jocurilor, Bucureşti, Romania: Editura Tehnică.]Search in Google Scholar
[Rao, K. P. R., Ravi Babu, G., & Raju, V. C. C. (2009). Common fixed points for M-maps in fuzzy metric spaces, Annals of the “Constantin Brancusi” University of Târgu Jiu, Engineering Series, No. 2, 197-206.]Search in Google Scholar
[Rus, I. A., & Iancu, C. (2000). Modelare matematică, Cluj-Napoca, Romania: Transilvania Press.]Search in Google Scholar
[Rus, I. A., Petruşel, A., & Petruşel, G. (2008). Fixed Point Theory, Cluj-Napoca, Romania: Cluj University Press.]Search in Google Scholar
[Scarf, H. (1973). The computation of economic equilibria, New Haven and London, Yale University Press.10.1057/978-1-349-95189-5_451]Search in Google Scholar
[Song, Q.-Q., Guo, M., & Chen, H.-Z. (2016). Essential sets of fixed points for correspondences with application to nash equilibria, Fixed Point Theory, 17(1), 141-150.]Search in Google Scholar
[Vuong, P. T., Strodiot, J. J., Nguyen, V. H. (2012). Extragradient methods and linesearch algorithms for solving Ky Fan inequalities and fixed point problems, Journal of Optimization Theory and Applications, 155(2), 605-627.10.1007/s10957-012-0085-7]Search in Google Scholar
[Yang, H., & Yu, J. (2002). Essential components of the set of weakly pareto-nash equilibrium points, Applied Mathematics Letters, 15, 553-560.10.1016/S0893-9659(02)80006-4]Search in Google Scholar
[Yu, J., & Yang, H. (2004). The essential components of the set of equilibrium points for set-valued maps. J. Math. Anal. Appl., 300, 334-342.10.1016/j.jmaa.2004.06.042]Search in Google Scholar