Weak sharp solutions for generalized variational inequalities

被引:0
|
作者
Suliman Al-Homidan
Qamrul Hasan Ansari
Regina S. Burachik
机构
[1] King Fahd University of Petroleum and Minerals,Department of Mathematics and Statistics
[2] Aligarh Muslim University,Department of Mathematics
[3] University of South Australia,School of Information Technology and Mathematical Sciences
来源
Positivity | 2017年 / 21卷
关键词
Generalized variational inequalities; Weak sharp solutions; Paramonotone operators; Gap function; Inner-semicontinuous maps; Lipschitz continuous set-valued maps; Finite convergence; 49J40; 90C33; 49J53; 47J20; 90C25; 47H04;
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中图分类号
学科分类号
摘要
We consider weak sharp solutions for the generalized variational inequality problem, in which the underlying mapping is set-valued, and not necessarily monotone. We extend the concept of weak sharpness to this more general framework, and establish some of its characterizations. We establish connections between weak sharpness and (1) gap functions for variational inequalities, and (2) global error bound. When the solution set is weak sharp, we prove finite convergence of the sequence generated by an arbitrary algorithm, for the monotone set-valued case, as well as for the case in which the underlying set-valued map is either Lipschitz continuous in the set-valued sense, for infinite dimensional spaces, or inner-semicontinuous when the space is finite dimensional.
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页码:1067 / 1088
页数:21
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