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Main Authors: Cesaroni, Annalisa, Dirr, Nicolas, Marchi, Claudio
Format: Preprint
Published: 2016
Subjects:
Online Access:https://arxiv.org/abs/1602.08520
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author Cesaroni, Annalisa
Dirr, Nicolas
Marchi, Claudio
author_facet Cesaroni, Annalisa
Dirr, Nicolas
Marchi, Claudio
contents This paper concerns the simultaneous effect of homogenization and of the small noise limit for a $2^{\textrm {nd}}$ order mean field games (MFG) system with local coupling and quadratic Hamiltonian. We show under some additional assumptions that the solutions of our system converge to a solution of an effective $1^{\textrm {st}}$ order system whose effective operators are defined through a cell problem which is a $2^{\textrm {nd}}$ order system of ergodic MFG type. We provide several properties of the effective operators and we show that in general the effective system looses the MFG structure.
format Preprint
id arxiv_https___arxiv_org_abs_1602_08520
institution arXiv
publishDate 2016
record_format arxiv
spellingShingle Homogenization of a mean field game system in the small noise limit
Cesaroni, Annalisa
Dirr, Nicolas
Marchi, Claudio
Analysis of PDEs
This paper concerns the simultaneous effect of homogenization and of the small noise limit for a $2^{\textrm {nd}}$ order mean field games (MFG) system with local coupling and quadratic Hamiltonian. We show under some additional assumptions that the solutions of our system converge to a solution of an effective $1^{\textrm {st}}$ order system whose effective operators are defined through a cell problem which is a $2^{\textrm {nd}}$ order system of ergodic MFG type. We provide several properties of the effective operators and we show that in general the effective system looses the MFG structure.
title Homogenization of a mean field game system in the small noise limit
topic Analysis of PDEs
url https://arxiv.org/abs/1602.08520