Asymptotic behavior of orthogonal polynomials. Singular critical case

Abstract

Our goal is to find an asymptotic behavior as n∞ of the orthogonal polynomials Pn(z) defined by Jacobi recurrence coefficients an (off-diagonal terms) and bn (diagonal terms). We consider the case an∞, bn∞ in such a way that Σ an-1<∞ (that is, the Carleman condition is violated) and γn:=2-1bn (anan-1)-1/2 γ as n∞. In the case |γ | ≠ 1 asymptotic formulas for Pn(z) are known; they depend crucially on the sign of | γ |-1. We study the critical case | γ |=1. The formulas obtained are qualitatively different in the cases |γn| 1-0 and |γn| 1+0. Another goal of the paper is to advocate an approach to a study of asymptotic behavior of Pn(z) based on a close analogy of the Jacobi difference equations and differential equations of Schr\"odinger type.