The Ising Model Coupled to 2D Gravity: Critical Partition Function

Abstract

We prove that the differential of the log of the partition function for the 2-matrix model with quartic interactions converges in a certain double-scaling regime to the differential of the τ-function for the (3,4) string equation. This confirms the convergence of the critical Ising model on random surfaces to the (3,4) topological minimal model, which was stated in the works of Douglas and Shenker, Brézin and Kazakov, and Gross and Migdal. Our analysis is based on a steepest-descent analysis of a Riemann-Hilbert problem associated to a family of biorthogonal polynomials. New features in the matching problem in the construction of local parametrices appear.