The phase transitions of the random-cluster and Potts models on slabs with q ≥ 1 are sharp

Abstract

We prove sharpness of the phase transition for the random-cluster model with q ≥ 1 on graphs of the form S := G × S, where G is a planar lattice with mild symmetry assumptions, and S a finite graph. That is, for any such graph and any q ≥ 1, there exists some parameter pc = pc(S, q), below which the model exhibits exponential decay and above which there exists a.s. an infinite cluster. The result is also valid for the random-cluster model on planar graphs with long range, compactly supported interaction. It extends to the Potts model via the Edwards-Sokal coupling.