Block coupling and rapidly mixing k-heights

Abstract

A k-height on a graph G=(V, E) is an assignment V\0, …, k\ such that the value on ajacent vertices differs by at most 1. We study the Markov chain on k-heights that in each step selects a vertex at random, and, if admissible, increases or decreases the value at this vertex by one. In the cases of 2-heights and 3-heights we show that this Markov chain is rapidly mixing on certain families of grid-like graphs and on planar cubic 3-connected graphs. The result is based on a novel technique called block coupling, which is derived from the well-established monotone coupling approach. This technique may also be effective when analyzing other Markov chains that operate on configurations of spin systems that form a distributive lattice. It is therefore of independent interest.

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