Hydrodynamic limits and propagation of chaos for interacting random walks in domains

Zhen Qing Chen; Wai Tong Fan

doi:10.1214/16-AAP1208

Hydrodynamic limits and propagation of chaos for interacting random walks in domains

Zhen Qing Chen
, Wai Tong Fan

University of Washington

Research output: Contribution to journal › Article › peer-review

7 Citations (Scopus)

Abstract

A new non-conservative stochastic reaction-diffusion system in which two families of random walks in two adjacent domains interact near the interface is introduced and studied in this paper. Such a system can be used to model the transport of positive and negative charges in a solar cell or the population dynamics of two segregated species under competition. We show that in the macroscopic limit, the particle densities converge to the solution of a coupled nonlinear heat equations. For this, we first prove that propagation of chaos holds by establishing the uniqueness of a new BBGKY hierarchy. A local central limit theorem for reflected diffusions in bounded Lipschitz domains is also established as a crucial tool.

Original language	English
Pages (from-to)	1299-1371
Number of pages	73
Journal	Annals of Applied Probability
Volume	27
Issue number	3
DOIs	https://doi.org/10.1214/16-AAP1208
Publication status	Published - Jun 2017
Externally published	Yes

Keywords

Annihilation
BBGKY hierarchy
Boundary local time
Coupled nonlinear partial differential equation
Duhamel tree expansion
Heat kernel
Hydrodynamic limit
Interacting particle system
Isoperimetric inequality
Propagation of chaos
Random walk
Reflecting diffusion

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title = "Hydrodynamic limits and propagation of chaos for interacting random walks in domains",

abstract = "A new non-conservative stochastic reaction-diffusion system in which two families of random walks in two adjacent domains interact near the interface is introduced and studied in this paper. Such a system can be used to model the transport of positive and negative charges in a solar cell or the population dynamics of two segregated species under competition. We show that in the macroscopic limit, the particle densities converge to the solution of a coupled nonlinear heat equations. For this, we first prove that propagation of chaos holds by establishing the uniqueness of a new BBGKY hierarchy. A local central limit theorem for reflected diffusions in bounded Lipschitz domains is also established as a crucial tool.",

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author = "Chen, \{Zhen Qing\} and Fan, \{Wai Tong\}",

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T1 - Hydrodynamic limits and propagation of chaos for interacting random walks in domains

AU - Chen, Zhen Qing

AU - Fan, Wai Tong

PY - 2017/6

Y1 - 2017/6

N2 - A new non-conservative stochastic reaction-diffusion system in which two families of random walks in two adjacent domains interact near the interface is introduced and studied in this paper. Such a system can be used to model the transport of positive and negative charges in a solar cell or the population dynamics of two segregated species under competition. We show that in the macroscopic limit, the particle densities converge to the solution of a coupled nonlinear heat equations. For this, we first prove that propagation of chaos holds by establishing the uniqueness of a new BBGKY hierarchy. A local central limit theorem for reflected diffusions in bounded Lipschitz domains is also established as a crucial tool.

AB - A new non-conservative stochastic reaction-diffusion system in which two families of random walks in two adjacent domains interact near the interface is introduced and studied in this paper. Such a system can be used to model the transport of positive and negative charges in a solar cell or the population dynamics of two segregated species under competition. We show that in the macroscopic limit, the particle densities converge to the solution of a coupled nonlinear heat equations. For this, we first prove that propagation of chaos holds by establishing the uniqueness of a new BBGKY hierarchy. A local central limit theorem for reflected diffusions in bounded Lipschitz domains is also established as a crucial tool.

KW - Annihilation

KW - BBGKY hierarchy

KW - Boundary local time

KW - Coupled nonlinear partial differential equation

KW - Duhamel tree expansion

KW - Heat kernel

KW - Hydrodynamic limit

KW - Interacting particle system

KW - Isoperimetric inequality

KW - Propagation of chaos

KW - Random walk

KW - Reflecting diffusion

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DO - 10.1214/16-AAP1208

M3 - Article

AN - SCOPUS:85025115139

SN - 1050-5164

VL - 27

SP - 1299

EP - 1371

JO - Annals of Applied Probability

JF - Annals of Applied Probability

IS - 3

ER -

Hydrodynamic limits and propagation of chaos for interacting random walks in domains

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Keywords

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