Hydrodynamic Limit of Brownian Particles Interacting with Short and Long Range Forces

Abstract

We investigate the time evolution of a model system of interacting particles, moving in a d-dimensional torus. The microscopic dynamics are first order in time with velocities set equal to the negative gradient of a potential energy term plus independent Brownian motions: is the sum of pair potentials, V(r)+γd J(γ r), the second term has the form of a Kac potential with inverse range γ. Using diffusive hydrodynamical scaling (spatial scale γ-1, temporal scale γ-2) we obtain, in the limit γ 0, a diffusive type integro-differential equation describing the time evolution of the macroscopic density profile.

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