CURRENT FLUCTUATIONS FOR THE ASYMMETRIC SIMPLE EXCLUSION PROCESS
成果类型:
Article
署名作者:
FERRARI, PA; FONTES, LRG
刊物名称:
ANNALS OF PROBABILITY
ISSN/ISSBN:
0091-1798
DOI:
10.1214/aop/1176988731
发表日期:
1994
页码:
820-832
关键词:
attractive particle-systems
limit
摘要:
We compute the diffusion coefficient of the current of particles through a fixed point in the one-dimensional nearest neighbor asymmetric simple exclusion process in equilibrium. We find D = \p - q\rho(1 - rho)\1 - 2rho\, where p is the rate at which the particles jump to the right, q is the jump rate to the left and rho is the density of particles. Notice that D vanishes if p = q or rho = 1/2. Laws of large numbers and central limit theorems are also proven. Analogous results are obtained for the current of particles through a position travelling at a deterministic velocity r. As a corollary we get that the equilibrium density fluctuations at time t are a translation of the fluctuations at time 0. We also show that the current fluctuations at time t are given, in the scale t1/2, by the initial density of particles in an interval of length \(p - q)(1 - 2rho)\t. The process is isomorphic to a growth interface process. Our result means that the equilibrium growth fluctuations depend on the general inclination of the surface. In particular, they vanish for interfaces roughly perpendicular to the observed growth direction.