Three-step relaxed hybrid steepest-descent methods for variational inequalities

DING Xie-ping;LIN Yen-cherng;YAO Jen-chih

doi:10.1007/s10483-007-0805-x

Applied Mathematics and Mechanics >

2007 , Vol. 28 >Issue 8: 1029 - 1036

DOI: https://doi.org/10.1007/s10483-007-0805-x

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Three-step relaxed hybrid steepest-descent methods for variational inequalities

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1. College of Mathematics and Software Science, Sichuan Normal University, Chengdu 610066, P. R. China;
2. General Education Center, China Medical University, Taichung 404, Taiwan, P. R. China;
3. Department of Applied Mathematics, National Sun Yat-sen University, Kaohsiung 804, Taiwan, P. R. China

Received date: 2006-11-19

Revised date: 2007-06-25

Online published: 2007-08-18

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Abstract

The classical variational inequality problem with a Lipschitzian and strongly monotone operator on a nonempty closed convex subset in a real Hilbert space is studied. A new three-step relaxed hybrid steepest-descent method for this class of variational inequalities is introduced. Strong convergence of this method is established under suitable assumptions imposed on the algorithm parameters.

Key words： Hilbert space; variational inequalities; relaxed hybrid steepest-descent method; strong convergence; nonexpansive mapping

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DING Xie-ping;LIN Yen-cherng;YAO Jen-chih . Three-step relaxed hybrid steepest-descent methods for variational inequalities[J]. Applied Mathematics and Mechanics, 2007 , 28(8) : 1029 -1036 . DOI: 10.1007/s10483-007-0805-x

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