中文

Convergence to the maximal invariant measure for a zero-range process with random rates

概率论 2010-11-10 v2 数学物理 math.MP

摘要

We consider a one-dimensional totally asymmetric nearest-neighbor zero-range process with site-dependent jump-rates - an environment. For each environment p we prove that the set of all invariant measures is the convex hull of a set of product measures with geometric marginals. As a consequence we show that for environments p satisfying certain asymptotic property, there are no invariant measures concentrating on configurations with critical density bigger than ρ(p)\rho^*(p), a critical value. If ρ(p)\rho^*(p) is finite we say that there is phase-transition on the density. In this case we prove that if the initial configuration has asymptotic density strictly above ρ(p)\rho^*(p), then the process converges to the maximal invariant measure.

关键词

引用

@article{arxiv.math/9911205,
  title  = {Convergence to the maximal invariant measure for a zero-range process with random rates},
  author = {Enrique D. Andjel and Pablo A. Ferrari and Herve Guiol and Claudio Landim},
  journal= {arXiv preprint arXiv:math/9911205},
  year   = {2010}
}

备注

19 pages, Revised version