On convergence of descent methods for variational inequalities in a Hilbert space

Konnov, I. V.; Kum, Sangho; Lee, Gue Myung

doi:10.1007/s001860200192

On convergence of descent methods for variational inequalities in a Hilbert space

Published: 19 March 2014

Volume 55, pages 371–382, (2002)
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Mathematical Methods of Operations Research Aims and scope Submit manuscript

I. V. Konnov¹,
Sangho Kum² &
Gue Myung Lee³

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Abstract

In this paper, properties of differentiable gap functions for variational inequalities and convergence of the corresponding descent methods under a Hilbert space setting are considered. We give various convergence results under different assumptions on the cost mapping, including the monotone case.

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Authors and Affiliations

Department of Applied Mathematics, Kazan University, Kazan 420008, Russia, RU
I. V. Konnov
Department of Mathematics Education, Chungbuk National University, Cheongju 361-763, Korea (e-mail: shkum@cbucc.chungbuk.ac.kr), KR
Sangho Kum
Department of Applied Mathematics, Pukyong National University, Pusan 608-737, Korea, KR
Gue Myung Lee

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I. V. Konnov
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Sangho Kum
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Gue Myung Lee
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Manuscript received: June 2000/Final version received: December 2001

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Konnov, I., Kum, S. & Lee, G. On convergence of descent methods for variational inequalities in a Hilbert space. Mathematical Methods of OR 55, 371–382 (2002). https://doi.org/10.1007/s001860200192

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Published: 19 March 2014
Issue Date: June 2002
DOI: https://doi.org/10.1007/s001860200192

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On convergence of descent methods for variational inequalities in a Hilbert space

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