Strong convergence of inertial algorithms for solving equilibrium problems

In this paper, we introduce several inertial-like algorithms for solving equilibrium problems (EP) in real Hilbert spaces. The algorithms are constructed using the resolvent of the EP associated bifunction and combines the inertial and the Mann-type technique. Under mild and standard conditions impo...

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Bibliographic Details
Published in	Optimization letters Vol. 14; no. 7; pp. 1817 - 1843
Main Authors	Van Hieu, Dang, Gibali, Aviv
Format	Journal Article
Language	English
Published	Berlin/Heidelberg Springer Berlin Heidelberg 01.10.2020
Subjects	Computational Intelligence Mathematics Mathematics and Statistics Numerical and Computational Physics Operations Research/Decision Theory Optimization Original Paper Simulation Proximal point algorithm Monotone bifunction Inertial-like algorithm
Online Access	Get full text
ISSN	1862-4472 1862-4480
DOI	10.1007/s11590-019-01479-w

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Summary:	In this paper, we introduce several inertial-like algorithms for solving equilibrium problems (EP) in real Hilbert spaces. The algorithms are constructed using the resolvent of the EP associated bifunction and combines the inertial and the Mann-type technique. Under mild and standard conditions imposed on the cost bifunction and control parameters strong convergence of the algorithms is established. We present several numerical examples to illustrate the behavior of our schemes and emphasize their convergence advantages compared with some related methods.
ISSN:	1862-4472 1862-4480
DOI:	10.1007/s11590-019-01479-w