Inverse maximum theorems and some consequences
Optimization and Control
2022-08-09 v2
Abstract
We deal with inverse maximum theorems, which are inspired by the ones given by Aoyama, Komiya, Li et al., Park and Komiya, and Yamauchi. As a consequence of our results, we state and prove an inverse maximum Nash theorem and show that any generalized Nash game can be reduced to a classical Nash game, under suitable assumptions. Additionally, we show that a result by Arrow and Debreu, on the existence of solutions for generalized Nash games, is actually equivalent to the one given by Debreu-Fan-Glicksberg for classical Nash games, which in turn is equivalent to Kakutani-Fan-Glisckberg's fixed point theorem.
Cite
@article{arxiv.2201.13136,
title = {Inverse maximum theorems and some consequences},
author = {John Cotrina and Raúl Fierro},
journal= {arXiv preprint arXiv:2201.13136},
year = {2022}
}
Comments
17 pages