Spectral gap and cutoff phenomenon for the Gibbs sampler of ∇ interfaces with convex potential

Abstract

We consider the Gibbs sampler, or heat bath dynamics associated to log-concave measures on RN describing ∇ interfaces with convex potentials. Under minimal assumptions on the potential, we find that the spectral gap of the process is always given by gapN=1-(π/N), and that for all ε∈(0,1), its ε-mixing time satisfies TN(ε) N2gapN as N∞, thus establishing the cutoff phenomenon. The results reveal a universal behavior in that they do not depend on the choice of the potential.