Large n limit of Gaussian random matrices with external source, Part III: Double scaling limit
Abstract
We consider the double scaling limit in the random matrix ensemble with an external source 1Zn e-n (1/2M2 -AM) dM defined on n× n Hermitian matrices, where A is a diagonal matrix with two eigenvalues a of equal multiplicities. The value a=1 is critical since the eigenvalues of M accumulate as n ∞ on two intervals for a > 1 and on one interval for 0 < a < 1. These two cases were treated in Parts I and II, where we showed that the local eigenvalue correlations have the universal limiting behavior known from unitary random matrix ensembles. For the critical case a=1 new limiting behavior occurs which is described in terms of Pearcey integrals, as shown by Br\'ezin and Hikami, and Tracy and Widom. We establish this result by applying the Deift/Zhou steepest descent method to a 3 × 3-matrix valued Riemann-Hilbert problem which involves the construction of a local parametrix out of Pearcey integrals. We resolve the main technical issue of matching the local Pearcey parametrix with a global outside parametrix by modifying an underlying Riemann surface.
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