Uniform estimates for the planning problem with potential
Abstract
In this paper, we study a priori estimates for a first-order mean-field planning problem with a potential. In the theory of mean-field games (MFGs), a priori estimates play a crucial role to prove the existence of classical solutions. In particular, uniform bounds for the density of players' distribution and its inverse are of utmost importance. Here, we investigate a priori bounds for those quantities for a planning problem with a non-vanishing potential. The presence of a potential raises non-trivial difficulties, which we overcome by exploring a displacement-convexity property for the mean-field planning problem with a potential together with Moser's iteration method. We show that if the potential satisfies a certain smallness condition, then a displacement-convexity property holds. This property enables bounds for the density. In the one-dimensional case, the displacement-convexity property also gives bounds for the inverse of the density. Finally, using these estimates and Moser's iteration method, we obtain estimates for the density of the distribution of the players and its inverse.
Keywords
Cite
@article{arxiv.2003.02591,
title = {Uniform estimates for the planning problem with potential},
author = {Tigran Bakaryan and Rita Ferreira and Diogo Gomes},
journal= {arXiv preprint arXiv:2003.02591},
year = {2020}
}
Comments
12 pages