Quantitative analysis of a subgradient-type method for equilibrium problems
Optimization and Control
2021-09-02 v2
Abstract
We use techniques originating from the subdiscipline of mathematical logic called `proof mining' to provide rates of metastability and - under a metric regularity assumption - rates of convergence for a subgradient-type algorithm solving the equilibrium problem in convex optimization over fixed-point sets of firmly nonexpansive mappings. The algorithm is due to H. Iiduka and I. Yamada who in 2009 gave a noneffective proof of its convergence. This case study illustrates the applicability of the logic-based abstract quantitative analysis of general forms of Fej\'er monotonicity as given by the second author in previous papers.
Cite
@article{arxiv.2008.06900,
title = {Quantitative analysis of a subgradient-type method for equilibrium problems},
author = {Nicholas Pischke and Ulrich Kohlenbach},
journal= {arXiv preprint arXiv:2008.06900},
year = {2021}
}
Comments
14 pages