Meromorphic Approximants to Complex Cauchy Transforms with Polar Singularities
Classical Analysis and ODEs
2015-05-13 v1
Abstract
We study AAK-type meromorphic approximants to functions , where is a sum of a rational function and a Cauchy transform of a complex measure with compact regular support included in , whose argument has bounded variation on the support. The approximation is understood in -norm of the unit circle, . We obtain that the counting measures of poles of the approximants converge to the Green equilibrium distribution on the support of relative to the unit disk, that the approximants themselves converge in capacity to , and that the poles of attract at least as many poles of the approximants as their multiplicity and not much more.
Cite
@article{arxiv.0806.4681,
title = {Meromorphic Approximants to Complex Cauchy Transforms with Polar Singularities},
author = {Laurent Baratchart and Maxim Yattselev},
journal= {arXiv preprint arXiv:0806.4681},
year = {2015}
}
Comments
39 pages, 4 figures