Mixing times for the interchange process
Abstract
Consider the interchange process on a connected graph on vertices. I.e.\ shuffle a deck of cards by first placing one card at each vertex of in a fixed order and then at each tick of the clock, picking an edge uniformly at random and switching the two cards at the end vertices of the edge with probability 1/2. Well known special cases are the random transpositions shuffle, where is the complete graph, and the transposing neighbors shuffle, where is the -path. Other cases that have been studied are the -dimensional grid, the hypercube, lollipop graphs and Erd\H os-R\'enyi random graphs above the threshold for connectedness. In this paper the problem is studied for general . Special attention is focused on trees, random trees and the giant component of critical and supercritical random graphs. Upper and lower bounds on the mixing time are given. In many of the cases, we establish the exact order of the mixing time. We also mention the cases when is the hypercube and when is a bounded-degree expander, giving upper and lower bounds on the mixing time.
Cite
@article{arxiv.1210.6916,
title = {Mixing times for the interchange process},
author = {Johan Jonasson},
journal= {arXiv preprint arXiv:1210.6916},
year = {2012}
}