International Journal of Mathematics and Mathematical Sciences
Volume 2005 (2005), Issue 21, Pages 3373-3385
doi:10.1155/IJMMS.2005.3373

Generalized g-quasivariational inequality

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).