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Mixing of the exclusion process with small bias

arXiv:1608.03633 · doi:10.1007/s10955-016-1664-z

Abstract

We analyze the mixing behavior of the biased exclusion process on a path of length $n$ as the bias $β_n$ tends to $0$ as $n \to \infty$. We show that the sequence of chains has a pre-cutoff, and interpolates between the unbiased exclusion and the process with constant bias. As the bias increases, the mixing time undergoes two phase transitions: one when $β_n$ is of order $1/n$, and the other when $β_n$ is order $\log n/n$.

15 pages, 4 figures