On the convergence of solutions of inclusions containing maximal monotone and generalized pseudomonotone mappings

Abstract

We are concerned in this paper with the existence, boundedness, and the convergence of solutions to a sequence of inclusions Ak(u)+Bk(u)∋Lk, where Ak is a maximal monotone mapping, Bk is a generalized pseudomonotone mapping defined on a reflexive Banach space X, and Lk∈X∗. We study appropriate kinds of convergence for Ak and Bk such that a limit of a sequence of solutions of these inclusions is also a solution of the limit inclusion.