1 |
E. G. Begle, A fixed point theorem, Ann. Math., 51 (1950), 544-550.
DOI
|
2 |
V. Colao, G. Lopez, G. Marino and V. Martin-Marquez, Equilibrium problems in Hadamard manifolds, J. Math. Anal. Appl., 388 (2012), 61-77.
DOI
|
3 |
X. P. Ding, W. K. Kim, and K. K. Tan, Equilibria of non-compact generalized games with L*-majorized preferences, J. Math. Anal. Appl., 164 (1992), 508-517.
DOI
|
4 |
W. K. Kim, A multi-valued generalization of Nemeth's fixed point theorem, Appl. Math. Sci., 9 (2015), 37-44.
|
5 |
W. K. Kim, Fan-Browder type fixed point theorems and applications in Hadamard manifolds, Nonlinear Funct. Anal. Appl., 23 (2018), 117-127.
DOI
|
6 |
W. K. Kim, Equilibrium existence theorems in Hadamard manifolds, Nonlinear Funct. Anal. Appl., 24 (2019), 325-335.
|
7 |
S.L. Li, C. Li, Y.C. Liou, and J.-C. Yao, Existence of solutions for variational inequalities on Riemannian manifolds, Nonlinear Anal., 71 (2009), 5695-5706.
DOI
|
8 |
A. Kristaly, Location of Nash equilibria: a Riemannian geometrical approach, Proc. Amer. Math. Soc., 138(2010), 1803-1810.
DOI
|
9 |
A. Kristaly, Nash-type equilibria on Riemannian manifolds: a variational approach, J. Math. Pures Appl., 101 (2014), 660-688.
DOI
|
10 |
A. Kristaly, C. Li, G. Lopez, and A. Nicolae, What do 'convexities' imply on Hadamard manifolds? 2014: http://arxiv.org/pdf/1408.0591v1.pdf.
|
11 |
S.Z. Nemeth, Variational inequalities on Hadamard manifolds, Nonlinear Anal., 52 (2003), 1491-1498.
DOI
|
12 |
K. K. Tan and X. Z. Yuan, Lower semicontinuity of multivalued mappings and equilibrium points, Proceedings of the First World Congress of Nonlinear Analysis, Tampa, FL. 1992, Walter de Gruyter, New York, 1996, pp. 1849-1860.
|
13 |
C. Udriste, Convex Functions and Optimization Methods on Riemannian Manifolds, Mathematics and Its Applications. 297 (1994), Kluwer Academic Publishers, Dordrecht.
|
14 |
W. K. Kim, An application of the Begle fixed point theorem, Far East J. Math. Sci., 104 (2018), 65-76.
DOI
|