On the weak convergence for solving semistrictly quasi-monotone variational inequality problems

S. S. Chang; Salahuddin; L. Wang; M. Liu; Salahuddin Salahuddin

doi:10.1186/s13660-019-2032-8

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On the weak convergence for solving semistrictly quasi-monotone variational inequality problems

Journal article

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On the weak convergence for solving semistrictly quasi-monotone variational inequality problems

S. S. Chang, Salahuddin, L. Wang, M. Liu and Salahuddin Salahuddin

Journal of inequalities and applications, Vol.2019(1), pp.1-11

22/03/2019

DOI: https://doi.org/10.1186/s13660-019-2032-8

Abstract

Analysis

Applications of Mathematics

general

Mathematics

Mathematics and Statistics

In this paper, we study the approximation problem of solutions for the semistrictly quasi-monotone variational inequalities in infinite-dimensional Hilbert spaces. We prove that the iterative sequence generated by the algorithm for solving the semistrictly quasi-monotone variational inequalities converges weakly to a solution.

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Title: On the weak convergence for solving semistrictly quasi-monotone variational inequality problems
Creators - without role: S. S. Chang - Center for General Education, China Medical University
Salahuddin - Jazan University
L. Wang - Yunnan University of Finance And Economics
M. Liu - Yibin University
Salahuddin Salahuddin - Jazan University
Publication Details: Journal of inequalities and applications, Vol.2019(1), pp.1-11
Publisher: Springer International Publishing
Identifiers: 9916947908331
Academic Unit: Jazan University
Language: English
Resource Type: Journal article