Orthogonal Polynomials with Recursion Coefficients of Generalized Bounded Variation
Abstract
We consider probability measures on the real line or unit circle with Jacobi or Verblunsky coefficients satisfying an condition and a generalized bounded variation condition. This latter condition requires that a sequence can be expressed as a sum of sequences , each of which has rotated bounded variation, i.e., is finite for some . This includes discrete Schr\"odinger operators on a half-line or line with finite linear combinations of Wigner--von Neumann type potentials. For the real line, we prove that in the Lebesgue decomposition of such measures, the intersection of (-2,2) with the support of is contained in an explicit finite set S (thus, has no singular continuous part), and f is continuous and non-vanishing on . The results for the unit circle are analogous, with (-2,2) replaced by the unit circle.
Cite
@article{arxiv.1008.3844,
title = {Orthogonal Polynomials with Recursion Coefficients of Generalized Bounded Variation},
author = {Milivoje Lukic},
journal= {arXiv preprint arXiv:1008.3844},
year = {2011}
}
Comments
28 pages, no figures