Closedness of the Solution Map in Quasivariational Inequalities of Ky Fan Type
详细信息 查看全文
- 作者:Massimiliano Giuli (1)
- 关键词:Ky Fan inequality ; Quasivariational inequalities ; Closed map ; Quasimonotonicity ; Upper sign property
- 刊名:Journal of Optimization Theory and Applications
- 出版年:2013
- 出版时间:July 2013
- 年:2013
- 卷:158
- 期:1
- 页码:130-144
- 全文大小:505KB
- 参考文献:1. Fan, K.: A minimax inequality and applications. In: Shisha, O. (ed.) Inequalities III, pp. 103鈥?13. Academic Press, New York (1972)
2. Blum, E., Oettli, W.: From optimization and variational inequalities to equilibrium problems. Math. Stud. 63, 123鈥?45 (1994)
3. Bigi, G., Castellani, M., Pappalardo, M., Passacantando, M.: Existence and solution methods for equilibria. Eur. J. Oper. Res. (to appear)
4. Anh, L.Q., Khanh, P.Q.: Uniqueness and H枚lder continuity of the solution to multivalued equilibrium problems in metric spaces. J.聽Glob. Optim. 37, 449鈥?65 (2007) CrossRef
5. Anh, L.Q., Khanh, P.Q.: H枚lder continuity of the unique solution to quasiequilibrium problems in metric spaces. J.聽Optim. Theory Appl. 141, 37鈥?4 (2009) CrossRef
6. Lignola, M.B., Morgan, J.: Convergence of solutions of quasivariational inequalities and applications. Topol. Methods Nonlinear Anal. 10, 375鈥?85 (1997)
7. Anh, L.Q., Khanh, P.Q.: Continuity of solution maps of parametric quasiequilibrium problems. J.聽Glob. Optim. 46, 247鈥?59 (2010) CrossRef
8. Chen, G.Y., Li, S.J., Teo, K.L.: On the stability of generalized vector quasivariational inequality problems. J.聽Optim. Theory Appl. 113, 283鈥?95 (2002) CrossRef
9. Lignola, M.B., Morgan, J.: Stability in regularized quasi-variational settings. J. Convex Anal. 19, No.聽4 (2012, to appear)
10. Aussel, D., Cotrina, J.: Semicontinuity of the solution map of quasivariational inequalities. J.聽Glob. Optim. 50, 93鈥?05 (2011) CrossRef
11. Castellani, M., Giuli, M.: Refinements of existence results for quasimonotone equilibrium problems. J. Glob. Optim. (to appear)
12. Hadjisavvas, N.: Continuity and maximality properties of pseudomonotone operators. J.聽Convex Anal. 10, 459鈥?69 (2003)
13. Aubin, J.P., Frankowska, H.: Set-Valued Analysis. Birkh盲user, Boston (1990)
14. Lignola, M.B., Morgan, J.: Semicontinuity and episemicontinuity: equivalence and applications. Boll. UMI 8, 1鈥?6 (1994)
15. Ait Mansour, M., Aussel, D.: Quasimonotone variational inequalities and quasiconvex programming. Qualitative stability. J.聽Convex Anal. 15, 459鈥?72 (2008)
16. Aussel, D., Hadjisavvas, N.: On quasimonotone variational inequalities. J.聽Optim. Theory Appl. 121, 445鈥?50 (2004) CrossRef
17. Bianchi, M., Pini, R.: Coercivity conditions for equilibrium problems. J.聽Optim. Theory Appl. 124, 79鈥?2 (2005) CrossRef
18. Farajzadeh, A.P., Zafarani, J.: Equilibrium problems and variational inequalities in topological vector spaces. Optimization 59, 485鈥?99 (2010) CrossRef
19. Bianchi, M., Pini, R.: A note on stability for parametric equilibrium problems. Oper. Res. Lett. 31, 445鈥?50 (2003) CrossRef
20. Langenberg, N.: An interior proximal method for a class of quasimonotone variational inequalities. J.聽Optim. Theory Appl. (2012). doi:10.1007/s10957-012-0111-9 - 作者单位:Massimiliano Giuli (1)
1. Department of Information Engineering, Computer Science and Mathematics, University of L鈥橝quila, L鈥橝quila, Italy - ISSN:1573-2878
文摘
This paper is mainly concerned with the stability analysis of the set-valued solution mapping for a parametric quasivariational inequality of Ky Fan type. Perturbations are here considered both on the bifunction and on the constraint map which define the problem. The bifunction is assumed to be either pseudomonotone or quasimonotone. This fact leads to the definition of four different types of solution: two when the bifunction is pseudomonotone, and two for the quasimonotone case. These solution sets are connected each other through two Minty-type Lemmas, where a very weak form of continuity for the bifunction is employed. Using these results, we are able to establish some sufficient conditions, which ensure the closedness and the upper semicontinuity of the maps corresponding to the four solution sets.