A continuity result for the adjusted normal cone operator

TL;DR

This paper extends the continuity properties of the adjusted normal cone operator from finite-dimensional spaces to Banach spaces using a partition of unity technique, with applications to quasiconvex quasioptimization problems.

Contribution

It introduces a novel partition of unity method to establish continuity results for the adjusted normal cone operator in infinite-dimensional Banach spaces.

Findings

Established a continuity result for the adjusted normal cone operator in Banach spaces.

Applied the new result to quasiconvex quasioptimization problems.

Provided an existence theorem for generalized quasivariational inequalities.

Abstract

The concept of adjusted sublevel set for a quasiconvex function was introduced in \cite{AuHa05} and the local existence of a norm-to-weak$^*$ upper semicontinuous base-valued submap of the normal operator associated to the adjusted sublevel set was proved. When the space is finite dimensional, a globally defined upper semicontinuous base-valued submap is obtained taking the intersection of the unit sphere, which is compact, with the normal operator, which is closed. Unfortunately, this technique does not work in the infinite dimensional case. We propose a partition of unity technique to overcome this problem in Banach spaces. Application is given to a quasiconvex quasioptimization problem through the use of a new existence result for generalized quasivariational inequalities which is based on the Schauder fixed point theorem.