Differential, Difference and Asymptotic Relations for Pollaczek-Jacobi Type Orthogonal Polynomials and Their Hankel Determinants

Abstract

In this paper, we study the orthogonal polynomials with respect to a singularly perturbed Pollaczek-Jacobi type weight w(x,t):=(1-x2)αe-t1-x2, x∈[-1,1],\;\;α>0,\;\;t>0. By using the ladder operator approach, we establish the second-order difference equations satisfied by the recurrence coefficient βn(t) and the sub-leading coefficient p(n,t) of the monic orthogonal polynomials, respectively. We show that the logarithmic derivative of βn(t) can be expressed in terms of a particular Painlev\'e V transcendent. The large n asymptotic expansions of βn(t) and p(n,t) are obtained by using Dyson's Coulomb fluid method together with the related difference equations. Furthermore, we study the associated Hankel determinant Dn(t) and show that a quantity σn(t), allied to the logarithmic derivative of Dn(t), can be expressed in terms of the σ-function of a particular Painlev\'e V. The second-order differential and difference equations for σn(t) are also obtained. In the end, we derive the large n asymptotics of σn(t) and Dn(t) from their relations with βn(t) and p(n,t).