Unitary discrete Hilbert transforms
Complex Variables
2013-12-30 v2 Functional Analysis
Abstract
Weighted discrete Hilbert transforms from to are considered, where and are disjoint sequences of points in the complex plane and and are positive weight sequences. It is shown that if such a Hilbert transform is unitary, then is a subset of a circle or a straight line, and a description of all unitary discrete Hilbert transforms is then given. A characterization of the orthogonal bases of reproducing kernels introduced by L. de Branges and D. Clark is implicit in these results: If a Hilbert space of complex-valued functions defined on a subset of satisfies a few basic axioms and has more than one orthogonal basis of reproducing kernels, then these bases are all of Clark's type.
Cite
@article{arxiv.0911.0318,
title = {Unitary discrete Hilbert transforms},
author = {Yurii Belov and Tesfa Y. Mengestie and Kristian Seip},
journal= {arXiv preprint arXiv:0911.0318},
year = {2013}
}