On the relation between Darboux transformations and polynomial mappings
Classical Analysis and ODEs
2012-12-06 v1 Mathematical Physics
math.MP
Spectral Theory
Abstract
Let d\mu(t) be a probability measure on [0,+\infty) such that its moments are finite. Then the Cauchy-Stieltjes transform S of d\mu(t) is a Stieltjes function, which admits an expansion into a Stieltjes continued fraction. In the present paper, we consider a matrix interpretation of the unwrapping transformation from S(\lambda) to \lambda S(\lambda^2), which is intimately related to the simplest case of polynomial mappings. More precisely, it is shown that this transformation is essentially a Darboux transformation of the underlying Jacobi matrix. Moreover, in this scheme, the Chihara construction of solutions to the Carlitz problem appears as a shifted Darboux transformation.
Cite
@article{arxiv.1212.1134,
title = {On the relation between Darboux transformations and polynomial mappings},
author = {Maxim Derevyagin},
journal= {arXiv preprint arXiv:1212.1134},
year = {2012}
}
Comments
18 pages