English

Uncertainty principles for integral operators

Classical Analysis and ODEs 2018-08-27 v1

Abstract

The aim of this paper is to prove new uncertainty principles for an integral operator \tt with a bounded kernel for which there is a Plancherel theorem. The first of these results is an extension of Faris's local uncertainty principle which states that if a nonzero function fL2(Rd,μ)f\in L^2(\R^d,\mu) is highly localized near a single point then (f)\tt (f) cannot be concentrated in a set of finite measure. The second result extends the Benedicks-Amrein-Berthier uncertainty principle and states that a nonzero function fL2(Rd,μ)f\in L^2(\R^d,\mu) and its integral transform (f)\tt (f) cannot both have support of finite measure. From these two results we deduce a global uncertainty principle of Heisenberg type for the transformation \tt. We apply our results to obtain a new uncertainty principles for the Dunkl and Clifford Fourier transforms.

Keywords

Cite

@article{arxiv.1206.1195,
  title  = {Uncertainty principles for integral operators},
  author = {Saifallah Ghobber and Philippe Jaming},
  journal= {arXiv preprint arXiv:1206.1195},
  year   = {2018}
}
R2 v1 2026-06-21T21:15:00.508Z