MEAN FIELD LIMIT FOR DISORDERED DIFFUSIONS WITH SINGULAR INTERACTIONS
成果类型:
Article
署名作者:
Lucon, Eric; Stannat, Wilhelm
署名单位:
Technical University of Berlin
刊物名称:
ANNALS OF APPLIED PROBABILITY
ISSN/ISSBN:
1050-5164
DOI:
10.1214/13-AAP968
发表日期:
2014
页码:
1946-1993
关键词:
kuramoto model
large numbers
propagation
approximation
fluctuations
chaos
LAW
Synchronization
CONVERGENCE
equilibrium
摘要:
Motivated by considerations from neuroscience (macroscopic behavior of large ensembles of interacting neurons), we consider a population of mean field interacting diffusions in R-m in the presence of a random environment and with spatial extension: each diffusion is attached to one site of the lattice Z(d), and the interaction between two diffusions is attenuated by a spatial weight that depends on their positions. For a general class of singular weights (including the case already considered in the physical literature when interactions obey to a power-law of parameter 0 < alpha < d), we address the convergence as N -> infinity of the empirical measure of the diffusions to the solution of a deterministic McKean-Vlasov equation and prove well-posedness of this equation, even in the degenerate case without noise. We provide also precise estimates of the speed of this convergence, in terms of an appropriate weighted Wasserstein distance, exhibiting in particular nontrivial fluctuations in the power-law case when d/2 <= alpha < d. Our framework covers the case of polynomially bounded monotone dynamics that are especially encountered in the main models of neural oscillators.
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