Planar random-cluster model: scaling relations

Abstract

This paper studies the critical and near-critical regimes of the planar random-cluster model on Z2 with cluster-weight q∈[1,4] using novel coupling techniques. More precisely, we derive the scaling relations between the critical exponents β, γ, δ, η, , ζ as well as α (when α0). As a key input, we show the stability of crossing probabilities in the near-critical regime using new interpretations of the notion of influence of an edge in terms of the rate of mixing. As a byproduct, we derive a generalization of Kesten's classical scaling relation for Bernoulli percolation involving the ``mixing rate'' critical exponent replacing the four-arm event exponent 4.