Infinite reflections of shock fronts in driven diffusive systems with two species
arXiv:cond-mat/0401080 · doi:10.1088/0305-4470/37/5/006
Abstract
Interaction of a domain wall with boundaries of a system is studied for a class of stochastic driven particle models. Reflection maps are introduced for the description of this process. We show that, generically, a domain wall reflects infinitely many times from the boundaries before a stationary state can be reached. This is in an evident contrast with one-species models where the stationary density is attained after just one reflection.
11 pages, 8 eps figs, to appearin JPhysA 01.2004