Asymptotics of a Fredholm determinant involving the second Painlev\'e transcendent

Abstract

We study the determinant (I-KPII) of an integrable Fredholm operator KPII acting on the interval (-s,s) whose kernel is constructed out of the -function associated with the Hastings-McLeod solution of the second Painlev\'e equation. This Fredholm determinant describes the critical behavior of the eigenvalue gap probabilities of a random Hermitian matrix chosen from the Unitary Ensemble in the bulk double scaling limit near a quadratic zero of the limiting mean eigenvalue density. Using the Riemann-Hilbert method, we evaluate the large s-asymptotics of (I-KPII).