Affiliation:
1. Department of Mathematics, The Technion—Israel Institute of Technology, 3200003 Haifa, Israel
Abstract
We study three classes of variational inclusion problems in the framework of a real Hilbert space and propose a simple modification of Tseng’s forward-backward-forward splitting method for solving such problems. Our algorithm is obtained via a certain regularization procedure and uses self-adaptive step sizes. We show that the approximating sequences generated by our algorithm converge strongly to a solution of the problems under suitable assumptions on the regularization parameters. Furthermore, we apply our results to an elastic net penalty problem in statistical learning theory and to split feasibility problems. Moreover, we illustrate the usefulness and effectiveness of our algorithm by using numerical examples in comparison with some existing relevant algorithms that can be found in the literature.
Funder
Department of Mathematics at the Technion—Israel Institute of Technology
Israel Science Foundation
Promotion of Research at the Technion
Technion General Research Fund
Subject
Geometry and Topology,Logic,Mathematical Physics,Algebra and Number Theory,Analysis
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