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A Redistributed Bundle Algorithm for Generalized Variational Inequality Problems in Hilbert Spaces.

Authors :
Shen, Jie
Gao, Ya-Li
Guo, Fang-Fang
Zhao, Rui
Source :
Asia-Pacific Journal of Operational Research; Aug2018, Vol. 35 Issue 4, pN.PAG-N.PAG, 18p
Publication Year :
2018

Abstract

Based on the redistributed technique of bundle methods and the auxiliary problem principle, we present a redistributed bundle method for solving a generalized variational inequality problem which consists of finding a zero point of the sum of two multivalued operators. The considered problem involves a nonsmooth nonconvex function which is difficult to approximate by workable functions. By imitating the properties of lower- C 2 functions, we consider approximating the local convexification of the nonconvex function, and the local convexification parameter is modified dynamically in order to make the augmented function produce nonnegative linearization errors. The convergence of the proposed algorithm is discussed when the sequence of stepsizes converges to zero, any weak limit point of the sequence of serious steps x k is a solution of problem (P) under some conditions. The presented method is the generalization of the convex bundle method [Salmon, G, JJ Strodiot and VH Nguyen (2004). A bundle method for solving variational inequalities. SIAM Journal on Optimization, 14(3), 869–893]. [ABSTRACT FROM AUTHOR]

Details

Language :
English
ISSN :
02175959
Volume :
35
Issue :
4
Database :
Complementary Index
Journal :
Asia-Pacific Journal of Operational Research
Publication Type :
Academic Journal
Accession number :
131229662
Full Text :
https://doi.org/10.1142/S0217595918500197