Spectral theory of Jacobi operators with increasing coefficients. The critical case

Abstract

Spectral properties of Jacobi operators J are intimately related to an asymptotic behavior of the corresponding orthogonal polynomials Pn(z) as n∞. We study the case where the off-diagonal coefficients an and, eventually, diagonal coefficients bn of J tend to infinity in such a way that the ratio γn:=2-1bn (anan-1)-1/2 has a finite limit γ . %We study 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∞ and suppose that the sequence γn:=2-1bn (anan-1)-1/2 has a limit γ as n∞. In the case |γ | < 1 asymptotic formulas for Pn(z) generalize those for the Hermite polynomials and the corresponding Jacobi operators J have absolutely continuous spectra covering the whole real line. If |γ | > 1, then spectra of the operators J are discrete. Our goal is to investigate the critical case | γ |=1 that occurs, for example, for the Laguerre polynomials. The formulas obtained depend crucially on the rate of growth of the coefficients an (or bn) and are qualitatively different in the cases where an ∞ faster or slower then n. For the fast growth of an, we also have to distinguish the cases |γn| 1-0 and |γn| 1+0. Spectral properties of the corresponding Jacobi operators are quite different in all these cases. Our approach works for an arbitrary power growth of the Jacobi coefficients.