Optimality conditions for Semi-infinite Interval Equilibrium Problems with constraints

G. Ruiz-Garzón, R. Osuna-Gómez, A. Rufián-Lizana, A. Beato-Moreno

This work focuses on the study of equilibrium problems, with a particular interest in advancing the theoretical understanding of semi-infinite interval equilibrium problems involving interval-valued objective functions and infinite constraints. Our goal is to derive new Karush-Kuhn-Tucker (KKT) optimality conditions tailored to this complex class of problems. This work contributes to the broader field of optimization and equilibrium theory, with significant implications for practical applications in uncertain and infinite constrained environments.

Keywords: Equilibrium problems, optimality conditions, Semi-infinite Interval-valued Optimization Problem

Scheduled

Continuous Optimization I
June 10, 2025  11:30 AM
MR 3

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