Torpid Mixing of Local Markov Chains on 3-Colorings of the Discrete Torus

Abstract

We study local Markov chains for sampling 3-colorings of the discrete torus TL,d=0,..., L-1d. We show that there is a constant ≈ .22 such that for all even L ≥ 4 and d sufficiently large, certain local Markov chains require exponential time to converge to equilibrium. More precisely, if is a Markov chain on the set of proper 3-colorings of TL,d that updates the color of at most Ld vertices at each step and whose stationary distribution is uniform, then the convergence to stationarity of is exponential in Ld-1. Our proof is based on a conductance argument that builds on sensitive new combinatorial enumeration techniques.