Approximate Nash equilibria in large nonconvex aggregative games
Abstract
This paper shows the existence of -Nash equilibria in -player noncooperative sum-aggregative games in which the players' cost functions, depending only on their own action and the average of all players' actions, are lower semicontinuous in the former while -H\"{o}lder continuous in the latter. Neither the action sets nor the cost functions need to be convex. For an important class of sum-aggregative games, which includes congestion games with equal to 1, a gradient-proximal algorithm is used to construct -Nash equilibria with at most iterations. These results are applied to a numerical example concerning the demand-side management of an electricity system. The asymptotic performance of the algorithm when tends to infinity is illustrated.
Keywords
Cite
@article{arxiv.2011.12604,
title = {Approximate Nash equilibria in large nonconvex aggregative games},
author = {Kang Liu and Nadia Oudjane and Cheng Wan},
journal= {arXiv preprint arXiv:2011.12604},
year = {2022}
}
Comments
28 pages,2 figures