English

An Inverse Problem for Localization Operators

Functional Analysis 2015-06-04 v2 Mathematical Physics Complex Variables math.MP

Abstract

A classical result of time-frequency analysis, obtained by I. Daubechies in 1988, states that the eigenfunctions of a time-frequency localization operator with circular localization domain and Gaussian analysis window are the Hermite functions. In this contribution, a converse of Daubechies' theorem is proved. More precisely, it is shown that, for simply connected localization domains, if one of the eigenfunctions of a time-frequency localization operator with Gaussian window is a Hermite function, then its localization domain is a disc. The general problem of obtaining, from some knowledge of its eigenfunctions, information about the symbol of a time-frequency localization operator, is denoted as the inverse problem, and the problem studied by Daubechies as the direct problem of time-frequency analysis. Here, we also solve the corresponding problem for wavelet localization, providing the inverse problem analogue of the direct problem studied by Daubechies and Paul.

Cite

@article{arxiv.1202.5841,
  title  = {An Inverse Problem for Localization Operators},
  author = {Luis Daniel Abreu and Monika Doerfler},
  journal= {arXiv preprint arXiv:1202.5841},
  year   = {2015}
}

Comments

18 pages, 1 figure

R2 v1 2026-06-21T20:25:26.084Z