Conformal invariance of loops in the double-dimer model

Abstract

The dimer model is the study of random dimer covers (perfect matchings) of a graph. A double-dimer configuration on a graph G is a union of two dimer covers of G. We introduce quaternion weights in the dimer model and show how they can be used to study the homotopy classes (relative to a fixed set of faces) of loops in the double dimer model on a planar graph. As an application we prove that, in the scaling limit of the "uniform" double-dimer model on Z2 (or on any other bipartite planar graph conformally approximating C), the loops are conformally invariant. As other applications we compute the exact distribution of the number of topologically nontrivial loops in the double-dimer model on a cylinder and the expected number of loops surrounding two faces of a planar graph.