The paper proves existence of relaxed equilibria for non-exchangeable mean field games with moderate interactions and common noise, and shows asymptotic equivalence between finite-player approximate Nash equilibria and the mean field limit.
Title resolution pending
2 Pith papers cite this work. Polarity classification is still indexing.
years
2026 2verdicts
UNVERDICTED 2representative citing papers
Quantitative propagation of chaos holds for particle systems with bounded drift kernels and multiplicative noise via an extension of the Jabin-Wang relative entropy framework using dynamic combinatorial analysis.
citing papers explorer
-
Non--exchangeable mean field games with moderate interactions and common noise
The paper proves existence of relaxed equilibria for non-exchangeable mean field games with moderate interactions and common noise, and shows asymptotic equivalence between finite-player approximate Nash equilibria and the mean field limit.
-
Quantitative propagation of chaos for particle systems with bounded kernels and multiplicative noise
Quantitative propagation of chaos holds for particle systems with bounded drift kernels and multiplicative noise via an extension of the Jabin-Wang relative entropy framework using dynamic combinatorial analysis.