Wigner transform and quasicrystals
Functional Analysis
2021-06-18 v1
Abstract
Quasicrystals are tempered distributions which satisfy symmetric conditions on and . This suggests that techniques from time-frequency analysis could possibly be useful tools in the study of such structures. In this paper we explore this direction considering quasicrystals type conditions on time-frequency representations instead of separately on the distribution and its Fourier transform. More precisely we prove that a tempered distribution on whose Wigner transform, , is supported on a product of two uniformly discrete sets in is a quasicrystal. This result is partially extended to a generalization of the Wigner transform, called matrix-Wigner transform which is defined in terms of the Wigner transform and a linear map on .
Keywords
Cite
@article{arxiv.2106.09364,
title = {Wigner transform and quasicrystals},
author = {Paolo Boggiatto and Carmen Fernández and Antonio Galbis and Alessandro Oliaro},
journal= {arXiv preprint arXiv:2106.09364},
year = {2021}
}