Finite Convergence and Sharp Minima for Quasi-Equilibrium Problems

Finite Convergence and Sharp Minima for Quasi-Equilibrium Problems

The notion of sharp minima, given by Polyak, is an important tool in studying the convergence analysis of algorithms designed to solve optimization problems. It has been studied extensively for variational inequality problems and equilibrium problems. In this paper, the convergence analysis of the s...

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Veröffentlicht in:Journal of optimization theory and applications 2024-12, Vol.203 (3), p.2283-2306
Hauptverfasser: Mittal, Kanchan, Gautam, Pankaj, Vetrivel, Vellaichamy
Format: Artikel
Sprache:eng
Schlagworte:
Algorithms
Applications of Mathematics
Approximation
Calculus of Variations and Optimal Control
Optimization
Convergence
Engineering
Equilibrium
Game theory
Hilbert space
Mathematics
Mathematics and Statistics
Methods
Operations Research/Decision Theory
Optimization
Optimization techniques
Theory of Computation
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Zusammenfassung:The notion of sharp minima, given by Polyak, is an important tool in studying the convergence analysis of algorithms designed to solve optimization problems. It has been studied extensively for variational inequality problems and equilibrium problems. In this paper, the convergence analysis of the sequence generated by proximal point method for quasi-equilibrium problem (QEP) will be established under sharp minima conditions. Further, the characterizations of weak sharp solution for QEP are provided. We also introduce an inexact proximal point method and demonstrate the convergence of the sequence for solving the QEP. Finally, we deduce the proximal point approximation for generalized Nash equilibrium problem.
ISSN:0022-3239
1573-2878
DOI:10.1007/s10957-024-02454-x