Sampling 3-colourings of regular bipartite graphs

Abstract

We show that if =(V,E) is a regular bipartite graph for which the expansion of subsets of a single parity of V is reasonably good and which satisfies a certain local condition (that the union of the neighbourhoods of adjacent vertices does not contain too many pairwise non-adjacent vertices), and if is a Markov chain on the set of proper 3-colourings of which updates the colour of at most |V| vertices at each step and whose stationary distribution is uniform, then for ≈ .22 and d sufficiently large the convergence to stationarity of is (essentially) exponential in |V|. In particular, if is the d-dimensional hypercube Qd (the graph on vertex set \0,1\d in which two strings are adjacent if they differ on exactly one coordinate) then the convergence to stationarity of the well-known Glauber (single-site update) dynamics is exponentially slow in 2d/(d d). A combinatorial corollary of our main result is that in a uniform 3-colouring of Qd there is an exponentially small probability (in 2d) that there is a colour i such the proportion of vertices of the even subcube coloured i differs from the proportion of the odd subcube coloured i by at most .22. Our proof combines a conductance argument with combinatorial enumeration methods.