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System of coincidence theorems in product topological spaces and applications. II. (English) Zbl 1170.91435

For part I, cf. ibid. 26, No. 12, 1547–1555 (2005; Zbl 1170.54308).

MSC:

91B50 General equilibrium theory
49J35 Existence of solutions for minimax problems

Citations:

Zbl 1170.54308
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References:

[1] Ding Xieping. New H-KKM theorems and their applications to geometric property, coincidence theorems, minimax inequality and maximal elements [J]. Indian J Pure Appl Math, 1995,26(1):1–19. · Zbl 0830.49003
[2] Ding Xieping. Coincidence theorems in topological spaces and their applications [J]. Appl Math Lett,1999,12(7):99–105. · Zbl 0942.54030
[3] Ding Xieping. System of coincidence theorems in product topological spaces and applications (I) [J]. Applied Mathematics and Mechanics (English Edition), 2005,26(12):1547–1555. · Zbl 1170.54308
[4] Park S. Continuous selection theorems in generalized convex spaces [J]. Numer Funct Anal Optim,1999,20(5/6):567–583. · Zbl 0931.54017
[5] Ding Xieping, Park J Y. Generalized vector equilibrium problems in generalized convex spacesai][ J]. J Optim Theory Appl, 2004,120(2):327–353. · Zbl 1100.90054
[6] Lin L J. System of coincidence theorems with applications [J]. J Math Anal Appl, 2003,285(2) 408–418. · Zbl 1051.49004
[7] Sion M. On nonlinear variational inequalities [J]. Pacific J Math, 1958,8(1):171–176. · Zbl 0081.11502
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