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Generalized Quasi-Variational Inequalities in Infinite-Dimensional Normed Spaces

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  • P. Cubiotti

Abstract

In this paper, we deal with the following problem: given a real normed space E with topological dual E*, a closed convex set X⊑E, two multifunctions Γ:X→2X and $$\Phi :X \to 2^{E^* } $$ , find $$(\hat x,\hat \phi ) \in X \times E^* $$ such that $$\hat x \in \Gamma (\hat x),\hat \phi \in \Phi (\hat x),{\text{ and }}\mathop {{\text{sup}}}\limits_{y \in \Gamma (\hat x)} \left\langle {\hat \phi ,\hat x - y} \right\rangle \leqslant 0.$$ We extend to the above problem a result established by Ricceri for the case Γ(x)≡X, where in particular the multifunction Φ is required only to satisfy the following very general assumption: each set Φ(x) is nonempty, convex, and weakly-star compact, and for each y∈X−:X the set $$\{ x \in X:\inf _{\phi \in \Phi (x)} \left\langle {\phi ,y} \right\rangle \leqslant 0\} $$ is compactly closed. Our result also gives a partial affirmative answer to a conjecture raised by Ricceri himself.

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  • P. Cubiotti, 1997. "Generalized Quasi-Variational Inequalities in Infinite-Dimensional Normed Spaces," Journal of Optimization Theory and Applications, Springer, vol. 92(3), pages 457-475, March.
  • Handle: RePEc:spr:joptap:v:92:y:1997:i:3:d:10.1023_a:1022647221266
    DOI: 10.1023/A:1022647221266
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    References listed on IDEAS

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    1. D. Chan & J. S. Pang, 1982. "The Generalized Quasi-Variational Inequality Problem," Mathematics of Operations Research, INFORMS, vol. 7(2), pages 211-222, May.
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    Cited by:

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    2. P. H. Sach & L. A. Tuan, 2007. "Existence Results for Set-Valued Vector Quasiequilibrium Problems," Journal of Optimization Theory and Applications, Springer, vol. 133(2), pages 229-240, May.

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