Universality of a double scaling limit near singular edge points in random matrix models

Abstract

We consider unitary random matrix ensembles Zn,s,t-1e-n tr Vs,t(M)dM on the space of Hermitian n x n matrices M, where the confining potential Vs,t is such that the limiting mean density of eigenvalues (as n∞ and s,t 0) vanishes like a power 5/2 at a (singular) endpoint of its support. The main purpose of this paper is to prove universality of the eigenvalue correlation kernel in a double scaling limit. The limiting kernel is built out of functions associated with a special solution of the PI2 equation, which is a fourth order analogue of the Painleve I equation. In order to prove our result, we use the well-known connection between the eigenvalue correlation kernel and the Riemann-Hilbert (RH) problem for orthogonal polynomials, together with the Deift/Zhou steepest descent method to analyze the RH problem asymptotically. The key step in the asymptotic analysis will be the construction of a parametrix near the singular endpoint, for which we use the model RH problem for the special solution of the PI2 equation. In addition, the RH method allows us to determine the asymptotics (in a double scaling limit) of the recurrence coefficients of the orthogonal polynomials with respect to the varying weights e-nVs,t on R. The special solution of the PI2 equation pops up in the n-2/7-term of the asymptotics.

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