Tau-functions \`a la Dub\'edat and probabilities of cylindrical events for double-dimers and CLE(4)

Abstract

Building upon recent results of Dub\'edat (see arXiv:1403.6076) on the convergence of topological correlators in the double-dimer model considered on Temperleyan approximations δ to a simply connected domain ⊂ C we prove the convergence of probabilities of cylindrical events for the double-dimer loop ensembles on δ as δ 0. More precisely, let λ1,…,λn∈ and L be a macroscopic lamination on \λ1,…,λn\, i.e., a collection of disjoint simple loops surrounding at least two punctures considered up to homotopies. We show that the probabilities PLδ that one obtains L after withdrawing all loops surrounding no more than one puncture from a double-dimer loop ensemble on δ converge to a conformally invariant limit PL as δ 0, for each L. Though our primary motivation comes from 2D statistical mechanics and probability, the proofs are of a purely analytic nature. The key techniques are the analysis of entire functions on the representation variety Hom(π1(\λ1,…,λn\)2( C)) and on its (non-smooth) subvariety of locally unipotent representations. In particular, we do not use any RSW-type arguments for double-dimers. The limits PL of the probabilities PLδ are defined as coefficients of the isomonodormic tau-function studied by Dub\'edat with respect to the Fock--Goncharov lamination basis on the representation variety. The fact that PL coincides with the probability to obtain L from a sample of the nested CLE(4) in requires a small additional input, namely a mild crossing estimate for this nested conformal loop ensemble.