Quasi-polynomial mixing of critical 2D random cluster models

Abstract

We study the Glauber dynamics for the random cluster (FK) model on the torus (Z/nZ)2 with parameters (p,q), for q ∈ (1,4] and p the critical point pc. The dynamics is believed to undergo a critical slowdown, with its continuous-time mixing time transitioning from O( n) for p≠ pc to a power-law in n at p=pc. This was verified at p≠ pc by Blanca and Sinclair, whereas at the critical p=pc, with the exception of the special integer points q=2,3,4 (where the model corresponds to the Ising/Potts models) the best-known upper bound on mixing was exponential in n. Here we prove an upper bound of nO( n) at p=pc for all q∈ (1,4], where a key ingredient is bounding the number of nested long-range crossings at criticality.