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Bibliographic Details
Main Authors: Millán, R. Díaz, Ferreira, O. P., Ugon, J.
Format: Preprint
Published: 2023
Subjects:
Online Access:https://arxiv.org/abs/2309.00648
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author Millán, R. Díaz
Ferreira, O. P.
Ugon, J.
author_facet Millán, R. Díaz
Ferreira, O. P.
Ugon, J.
contents The variational inequality problem in finite-dimensional Euclidean space is addressed in this paper, and two inexact variants of the extragradient method are proposed to solve it. Instead of computing exact projections on the constraint set, as in previous versions extragradient method, the proposed methods compute feasible inexact projections on the constraint set using a relative error criterion. The first version of the proposed method provided is a counterpart to the classic form of the extragradient method with constant steps. In order to establish its convergence we need to assume that the operator is pseudo-monotone and Lipschitz continuous, as in the standard approach. For the second version, instead of a fixed step size, the method presented finds a suitable step size in each iteration by performing a line search. Like the classical extragradient method, the proposed method does just two projections into the feasible set in each iteration. A full convergence analysis is provided, with no Lipschitz continuity assumption of the operator defining the variational inequality problem.
format Preprint
id arxiv_https___arxiv_org_abs_2309_00648
institution arXiv
publishDate 2023
record_format arxiv
spellingShingle Extragradient method with feasible inexact projection to variational inequality problem
Millán, R. Díaz
Ferreira, O. P.
Ugon, J.
Optimization and Control
65K05, 90C30, 90C25
The variational inequality problem in finite-dimensional Euclidean space is addressed in this paper, and two inexact variants of the extragradient method are proposed to solve it. Instead of computing exact projections on the constraint set, as in previous versions extragradient method, the proposed methods compute feasible inexact projections on the constraint set using a relative error criterion. The first version of the proposed method provided is a counterpart to the classic form of the extragradient method with constant steps. In order to establish its convergence we need to assume that the operator is pseudo-monotone and Lipschitz continuous, as in the standard approach. For the second version, instead of a fixed step size, the method presented finds a suitable step size in each iteration by performing a line search. Like the classical extragradient method, the proposed method does just two projections into the feasible set in each iteration. A full convergence analysis is provided, with no Lipschitz continuity assumption of the operator defining the variational inequality problem.
title Extragradient method with feasible inexact projection to variational inequality problem
topic Optimization and Control
65K05, 90C30, 90C25
url https://arxiv.org/abs/2309.00648