NATURE OF THE RANDOM FORCE IN BROWNIAN-MOTION

被引：4

作者：

MAZUR, P

BEDEAUX, D

机构：

[1] LEIDEN UNIV,GORLAEUS LABS,DEPT PHYS & MACROMOLEC CHEM,POB 9502,2300 RA LEIDEN,NETHERLANDS

[2] LEIDEN UNIV,INST LORENTZ,2300 RA LEIDEN,NETHERLANDS

来源：

LANGMUIR | 1992年 / 8卷 / 12期

关键词：

D O I：

10.1021/la00048a016

中图分类号：

O6 [化学];

学科分类号：

0703 ;

摘要：

We study the stochastic properties of the random force in a nonlinear Langevin equation for the time dependence of a variable alpha whose equilibrium distribution function P(eq)(alpha) is known. We assume that this random force is of a multiplicative character and consists of a factor C(alpha(t - epsilon)) multiplied by a random function f0(t) independent of alpha(t). We prove that in this case f0(t) is a Gaussian white process. We show that the function C(alpha) is the solution of a differential equation which involves P(eq)(alpha) and can easily be solved when this last function is Gaussian.

引用

页码：2947 / 2951

页数：5

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