Critical edge behavior in the singularly perturbed Pollaczek-Jacobi type unitary ensemble

Abstract

In this paper, we study the strong asymptotic for the orthogonal polynomials and universality associated with singularly perturbed Pollaczek-Jacobi type weight wpJ2(x,t)=e-tx(1-x)xα(1-x)β, where t 0, α >0, β >0 and x ∈ [0,1]. Our main results obtained here include two aspects: I. Strong asymptotics: We obtain the strong asymptotic expansions for the monic Pollaczek-Jacobi type orthogonal polynomials in different interval (0,1) and outside of interval C (0,1), respectively; Due to the effect of tx(1-x) for varying t, different asymptotic behaviors at the hard edge 0 and 1 were found with different scaling schemes. Specifically, the uniform asymptotic behavior can be expressed as a Airy function in the neighborhood of point 1 as ζ= 2n2t ∞, n ∞, while it is given by a Bessel function as ζ 0, n ∞. II. Universality: We respectively calculate the limit of the eigenvalue correlation kernel in the bulk of the spectrum and at the both side of hard edge, which will involve a -functions associated with a particular Painleve 3 equation near x= 1. Further, we also prove the -funcation can be approximated by a Bessel kernel as ζ 0 compared with a Airy kernel as ζ ∞. Our analysis is based on the Deift-Zhou nonlinear steepest descent method for the Riemann-Hilbert problems.