arXiv:2505.04102 Abstract | arXiv Analytics

arXiv:2505.04102 [math.OC]Abstract References Reviews Resources

Tseng's Type Methods in Continuous and Discrete Time for Quasi-Variational Inequalities

Published 2025-05-07Version 1

This paper presents an approach for obtaining approximate solutions to quasi-variational inequalities in a real Hilbert space by modifying Tseng's scheme, which was originally designed for variational inequalities. The study explores the existence of equilibrium points and investigates convergence results related to dynamical systems. Linear convergence for discretized systems is examined through examples, illustrations, and special cases.

Categories: math.OC

Subjects: 49J40, 65K15, 49J40

Keywords: tsengs type methods, quasi-variational inequalities, discrete time, real hilbert space, special cases

Related articles: Most relevant | Search more

arXiv:1703.03669 [math.OC] (Published 2017-03-10)

Special cases of pairwise comparisons matrices represented by Toeplitz matrices

Viera Čerňanová, Waldemar W. Koczkodaj

arXiv:math/0404349 [math.OC] (Published 2004-04-19)

On the Higher-Order Derivatives of Spectral Functions: Two Special Cases

Hristo S. Sendov

arXiv:2106.13665 [math.OC] (Published 2021-06-25)

On Some Quasi-Variational Inequalities and Other Problems with Moving Sets

José-Luis Menaldi, Carlos N. Rautenberg

arXiv Analytics

arXiv:2505.04102 [math.OC]Abstract References Reviews Resources

Tseng's Type Methods in Continuous and Discrete Time for Quasi-Variational Inequalities

Links

Toolbox

arXiv:2505.04102 [math.OC]AbstractReferencesReviewsResources

Tseng's Type Methods in Continuous and Discrete Time for Quasi-Variational Inequalities

Links

Toolbox

arXiv:2505.04102 [math.OC]Abstract References Reviews Resources