Exact solution of the classical dimer model on a triangular lattice: Monomer-monomer correlations

Abstract

We obtain an asymptotic formula, as n∞, for the monomer-monomer correlation function K2(x,y) in the classical dimer model on a triangular lattice, with the horizontal and vertical weights wh=wv=1 and the diagonal weight wd=t>0, where x and y are sites n spaces apart in adjacent rows. We find that tc=12 is a critical value of t. We prove that in the subcritical case, 0<t<12, as n∞, K2(x,y)=K2(∞)[1-e-n/n\,(C1+C2(-1)n+ O(n-1))], with explicit formulae for K2(∞), , C1, and C2. In the supercritical case, 12 < t < 1, we prove that as n∞, K2(x,y)=K2(∞)[1- e-n/n\, (C1(ω n+1)+C2(-1)n(ω n+2)+ C3+C4(-1)n + O(n-1))], with explicit formulae for K2(∞), , ω, and C1, C2, C3, C4, 1, 2. The proof is based on an extension of the Borodin-Okounkov-Case-Geronimo formula to block Toeplitz determinants and on an asymptotic analysis of the Fredholm determinants in hand.