Universality and critical behavior in the chiral two-matrix model

Abstract

We study the chiral two-matrix model with polynomial potential functions V and W, which was introduced by Akemann, Damgaard, Osborn and Splittorff. We show that the squared singular values of each of the individual matrices in this model form a determinantal point process with correlation kernel determined by a matrix-valued Riemann-Hilbert problem. The size of the Riemann-Hilbert matrix depends on the degree of the potential function W (or V respectively). In this way we obtain the chiral analogue of a result of Kuijlaars-McLaughlin for the non-chiral two-matrix model. The Gaussian case corresponds to V,W being linear. For the case where W(y)=y2/2+α y is quadratic, we derive the large n-asymptotics of the Riemann-Hilbert problem by means of the Deift-Zhou steepest descent method. This proves universality in this case. An important ingredient in the analysis is a third-order differential equation. Finally we show that if also V(x)=x is linear, then a multi-critical limit of the kernel exists which is described by a 4× 4 matrix-valued Riemann-Hilbert problem associated to the Painlev\'e II equation q"(x) = xq(x)+2q3(x)--1/2. In this way we obtain the chiral analogue of a recent result by Duits and the second author.