Strong asymptotics for Jacobi polynomials with varying nonstandard parameters
Abstract
Strong asymptotics on the whole complex plane of a sequence of monic Jacobi polynomials Pn(αn, βn) is studied, assuming that n∞ αnn=A, n∞ β nn=B, with A and B satisfying A > -1, B>-1, A+B < -1. The asymptotic analysis is based on the non-Hermitian orthogonality of these polynomials, and uses the Deift/Zhou steepest descent analysis for matrix Riemann-Hilbert problems. As a corollary, asymptotic zero behavior is derived. We show that in a generic case the zeros distribute on the set of critical trajectories of a certain quadratic differential according to the equilibrium measure on in an external field. However, when either αn, βn or αn+βn are geometrically close to , part of the zeros accumulate along a different trajectory of the same quadratic differential.
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