Universality in the two matrix model: a Riemann-Hilbert steepest descent analysis

Abstract

The eigenvalue statistics of a pair (M1,M2) of n× n Hermitian matrices taken random with respect to the measure 1Zn(-n (V(M1)+W(M2)-τ M1M2)) dM1 d M2 can be described in terms of two families of biorthogonal polynomials. In this paper we give a steepest descent analysis of a 4 × 4 matrix-valued Riemann-Hilbert problem characterizing one of the families of biorthogonal polynomials in the special case W(y)=y4/4 and V an even polynomial. As a result we obtain the limiting behavior of the correlation kernel associated to the eigenvalues of M1 (when averaged over M2) in the global and local regime as n ∞ in the one-cut regular case. A special feature in the analysis is the introduction of a vector equilibrium problem involving both an external field and an upper constraint.