Rabia Nessah¹ and Moussa Larbani²

Copyright © 2005 Rabia Nessah and Moussa Larbani. This is an open access article distributed under the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.

Abstract

Suppose that X is a nonempty subset of a metric space E and Y is a nonempty subset of a topological vector space F. Let g:X→Y and ψ:X×Y→ℝ be two functions and let S:X→2Y and T:Y→2F∗ be two maps. Then the generalized g-quasivariational inequality problem (GgQVI) is to find a point x¯∈X and a point f∈T(g(x¯)) such that g(x¯)∈S(x¯) and supy∈S(x¯){Re⁡〈f,y−g(x¯)〉+ψ(x¯,y)}=ψ(x¯,g(x¯)). In this paper, we prove the existence of a solution of (GgQVI).