Asymptotic behavior and zero distribution of polynomials orthogonal with respect to Bessel functions

Abstract

We consider polynomials Pn orthogonal with respect to the weight J on [0,∞), where J is the Bessel function of order . Asheim and Huybrechs considered these polynomials in connection with complex Gaussian quadrature for oscillatory integrals. They observed that the zeros are complex and accumulate as n ∞ near the vertical line Re\, z = π2. We prove this fact for the case 0 ≤ ≤ 1/2 from strong asymptotic formulas that we derive for the polynomials Pn in the complex plane. Our main tool is the Riemann-Hilbert problem for orthogonal polynomials, suitably modified to cover the present situation, and the Deift-Zhou steepest descent method. A major part of the work is devoted to the construction of a local parametrix at the origin, for which we give an existence proof that only works for ≤ 1/2.