Existence of maximal elements and equilibria in linear topological spaces

The aim of this paper is to establish general existence results of maximal elements for L L-majorized mappings, which are, in turn, used to establish the Ž general existence theorems of equilibria for generalized games resp., abstract . economics without lower semicontinuity for both constraint and

First, we give new existence theorems for maximal elements in noncompact H-spaces, and then, as applications, the equilibrium problems in a qualitative game and an abstract economy are studied. (~) 2000 Elsevier Science Ltd. All rights reserved.

This paper is a continuation of the preceding paper of the author. Four classes of systems of generalized vector quasi-equilibrium problems are introduced and studied in FC-spaces. The notions of C i (x)-FC-quasiconvexity, C i (x)-quasiconvexity and C i (x)quasiconvexity-like for set-valued mappings

Let I be any index set. Some new families of G KKM -mappings and G KKM -majorized mappings from a topological space X into finite continuous topological spaces (Y i , ϕ N i ) (in short, FC-spaces) involving a set-valued mapping T ∈ KKM(Y, X ) with KKM property are introduced where Y = i∈I Y i . Some