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Main Author: Höfer, Felix
Format: Preprint
Published: 2026
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Online Access:https://arxiv.org/abs/2604.17639
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author Höfer, Felix
author_facet Höfer, Felix
contents We consider discounted infinite-horizon potential mean-field games (MFGs) on the $d$-dimensional torus. Without imposing monotonicity assumptions, we prove that every weak limit point of a time-dependent equilibrium, as time tends to infinity, is a stationary equilibrium. As a consequence, equilibria converge whenever the stationary solution is unique. The short proof is based on a novel Lyapunov functional for the time-dependent MFG system. We also provide a new uniqueness criterion for stationary equilibria. Finally, we apply our results to the subcritical Kuramoto MFG studied by Carmona, Cormier, and Soner, showing that every equilibrium converges to the incoherent solution.
format Preprint
id arxiv_https___arxiv_org_abs_2604_17639
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Convergence of Potential Mean-Field Games via Lyapunov Methods
Höfer, Felix
Analysis of PDEs
Optimization and Control
We consider discounted infinite-horizon potential mean-field games (MFGs) on the $d$-dimensional torus. Without imposing monotonicity assumptions, we prove that every weak limit point of a time-dependent equilibrium, as time tends to infinity, is a stationary equilibrium. As a consequence, equilibria converge whenever the stationary solution is unique. The short proof is based on a novel Lyapunov functional for the time-dependent MFG system. We also provide a new uniqueness criterion for stationary equilibria. Finally, we apply our results to the subcritical Kuramoto MFG studied by Carmona, Cormier, and Soner, showing that every equilibrium converges to the incoherent solution.
title Convergence of Potential Mean-Field Games via Lyapunov Methods
topic Analysis of PDEs
Optimization and Control
url https://arxiv.org/abs/2604.17639