Metastability in the reversible inclusion process
Abstract
We study the condensation regime of the finite reversible inclusion process, i.e., the inclusion process on a finite graph with an underlying random walk that admits a reversible measure. We assume that the random walk kernel is irreducible and its reversible measure takes maximum value on a subset of vertices . We consider initial conditions corresponding to a single condensate that is localized on one of those vertices and study the metastable (or tunneling) dynamics. We find that, if the random walk restricted to is irreducible, then there exists a single time-scale for the condensate motion. In this case we compute this typical time-scale and characterize the law of the (properly rescaled) limiting process. If the restriction of the random walk to has several connected components, a metastability scenario with multiple time-scales emerges. We prove such a scenario, involving two additional time-scales, in a one-dimensional setting with two metastable states and nearest-neighbor jumps.
Cite
@article{arxiv.1605.05140,
title = {Metastability in the reversible inclusion process},
author = {Alessandra Bianchi and Sander Dommers and Cristian Giardinà},
journal= {arXiv preprint arXiv:1605.05140},
year = {2017}
}
Comments
34 pages