GLOBAL-IN-TIME MEAN-FIELD CONVERGENCE FOR SINGULAR RIESZ-TYPE DIFFUSIVE FLOWS
成果类型:
Article
署名作者:
Rosenzweig, Matthew; Serfaty, Sylvia
署名单位:
Massachusetts Institute of Technology (MIT); New York University
刊物名称:
ANNALS OF APPLIED PROBABILITY
ISSN/ISSBN:
1050-5164
DOI:
10.1214/22-AAP1833
发表日期:
2023
页码:
754-798
关键词:
granular media equations
particle approximation
propagation
chaos
limit
systems
equilibrium
MODEL
摘要:
We consider the mean-field limit of systems of particles with singular interactions of the type -log |x| or |x|-s, with 0 < s < d - 2, and with an additive noise in dimensions d >= 3. We use a modulated-energy approach to prove a quantitative convergence rate to the solution of the corresponding limiting PDE. When s > 0, the convergence is global in time, and it is the first such result valid for both conservative and gradient flows in a singular setting on Rd. The proof relies on an adaptation of an argument of Carlen- Loss (Duke Math. J. 81 (1995) 135-157) to show a decay rate of the solution to the limiting equation, and on an improvement of the modulated-energy method developed in (SIAM J. Math. Anal. 48 (2016) 2269-2300; Duke Math. J. 169 (2020) 2887-2935; Nguyen, Rosenzweig and Serfaty (2021)), making it so that all prefactors in the time derivative of the modulated energy are controlled by a decaying bound on the limiting solution.
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