Average characteristic polynomials in the two-matrix model

Abstract

The two-matrix model is defined on pairs of Hermitian matrices (M1,M2) of size n× n by the probability measure 1Zn (Tr (-V(M1)-W(M2)+τ M1M2))\ dM1\ dM2, where V and W are given potential functions and τ∈. We study averages of products and ratios of characteristic polynomials in the two-matrix model, where both matrices M1 and M2 may appear in a combined way in both numerator and denominator. We obtain determinantal expressions for such averages. The determinants are constructed from several building blocks: the biorthogonal polynomials pn(x) and qn(y) associated to the two-matrix model; certain transformed functions n(w) and n(v); and finally Cauchy-type transforms of the four Eynard-Mehta kernels K1,1, K1,2, K2,1 and K2,2. In this way we generalize known results for the 1-matrix model. Our results also imply a new proof of the Eynard-Mehta theorem for correlation functions in the two-matrix model, and they lead to a generating function for averages of products of traces.