An inexact interior point proximal method for the variational inequality problem

Burachik, Regina S.; Lopes, J. O.; Silva, Geci J.P. Da

doi:10.1590/s0101-82052009000100002

Cited by 29 publications

(9 citation statements)

References 24 publications

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“…ykgox which imply that the sequences (x i k ) k∈N and (ỹ i k ) k∈N have the same cluster points. From the definition of α k in Algorithm F,ỹ k does not satisfy the inequality (10), that is, for all…”

Section: The Linesearch and The Algorithm Linesearchmentioning

confidence: 99%

A Projection Algorithm for Non-Monotone Variational Inequalities

Burachik

Millán

2019

Set-Valued Var. Anal

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We introduce a projection-type algorithm for solving the variational inequality problem for point-to-set operators, and study its convergence properties. No monotonicity assumption is used in our analysis. The operator defining the problem is only assumed to be continuous in the point-to-set sense, i.e., inner-and outer-semicontinuous. Additionally, we assume non-emptiness of the so-called dual solution set. We prove that the whole sequence of iterates converges to a solution of the variational inequality. Moreover, we provide numerical experiments illustrating the behaviour of our iterates.Through several examples, we provide a comparison with a recent similar algorithm.

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Section: The Linesearch and The Algorithm Linesearchmentioning

confidence: 99%

A Projection Algorithm for Non-Monotone Variational Inequalities

Burachik

Millán

2019

Set-Valued Var. Anal

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“…The mixed equilibrium problems include fixed point problems, variational inequality problems, optimization problems, Nash equilibrium problems, noncooperative games, economics and the equilibrium problem as special cases (see [9][10][11][12][13][14][15][16][17][18][19]). In the last two decades, many articles have appeared in the literature on the existence of solutions of equilibrium problems; see, for example [13] and references therein.…”

Section: Introductionmentioning

confidence: 99%

The hybrid algorithm for the system of mixed equilibrium problems, the general system of finite variational inequalities and common fixed points for nonexpansive semigroups and strictly pseudo-contractive mappings

Katchang

2012

Fixed Point Theory Appl

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In this article, we introduce a new iterative algorithm by the shrinking projection method for finding a common element of the set of solutions of generalized mixed equilibrium problems, the set of common solutions of general system of finite variational inequalities, the set of solutions of fixed points for nonexpansive semigroups and the set of common fixed points for an infinite family of strictly pseudo-contractive mappings in a real Hilbert space. We prove that the sequence converges strongly to a common element of the above four sets under some mind conditions. Our results improve and extend the corresponding recent results in literature work.

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“…The studies of gradient-type methods and variational inequalities are important topics in optimization theory; see, for example, [1][2][3][4][5][6][7][8][9][10][11][12] and the references mentioned therein. In the present paper, we study convergence of the subgradient method, introduced in [13] and known in the literature as the extragradient method (see also [14,Chapter 12]) to a solution of a variational inequality in a Hilbert space, under the presence of computational errors.…”

Section: Introductionmentioning

confidence: 99%

The Extragradient Method for Solving Variational Inequalities in the Presence of Computational Errors

Zaslavski

2011

J Optim Theory Appl

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In a Hilbert space, we study the convergence of the subgradient method to a solution of a variational inequality, under the presence of computational errors. Most results known in the literature establish convergence of optimization algorithms, when computational errors are summable. In the present paper, the convergence of the subgradient method for solving variational inequalities is established for nonsummable computational errors. We show that the subgradient method generates a good approximate solution, if the sequence of computational errors is bounded from above by a constant.

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An inexact interior point proximal method for the variational inequality problem

Cited by 29 publications

References 24 publications

A Projection Algorithm for Non-Monotone Variational Inequalities

A Projection Algorithm for Non-Monotone Variational Inequalities

The hybrid algorithm for the system of mixed equilibrium problems, the general system of finite variational inequalities and common fixed points for nonexpansive semigroups and strictly pseudo-contractive mappings

The Extragradient Method for Solving Variational Inequalities in the Presence of Computational Errors

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