We consider a point particle moving in a random distribution of obstacles described by a potential barrier. We show that, in a weak-coupling regime, under a diffusion limit suggested by the potential itself, the probability distribution of the particle converges to the solution of the heat equation. The diffusion coefficient is given by the Green-Kubo formula associated to the generator of the diffusion process dictated by the linear Landau equation.
A Diffusion Limit for a Test Particle in a Random Distribution of Scatterers / Basile, Giada; Nota, Alessia; Pulvirenti, Mario. - In: JOURNAL OF STATISTICAL PHYSICS. - ISSN 0022-4715. - STAMPA. - 155:6(2014), pp. 1087-1111. [10.1007/s10955-014-0940-z]
A Diffusion Limit for a Test Particle in a Random Distribution of Scatterers
BASILE, GIADA;NOTA, ALESSIA;PULVIRENTI, Mario
2014
Abstract
We consider a point particle moving in a random distribution of obstacles described by a potential barrier. We show that, in a weak-coupling regime, under a diffusion limit suggested by the potential itself, the probability distribution of the particle converges to the solution of the heat equation. The diffusion coefficient is given by the Green-Kubo formula associated to the generator of the diffusion process dictated by the linear Landau equation.| File | Dimensione | Formato | |
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