The restricted discrete Fourier transform
Abstract
We investigate the restriction of the discrete Fourier transform to the space of functions with support on the discrete interval , whose transforms are supported inside the same interval. A periodically tridiagonal matrix on is constructed having the three properties that it commutes with , has eigenspaces of dimensions 1 and 2 only, and the span of its eigenspaces of dimension 1 is precisely . The simple eigenspaces of provide an orthonormal eigenbasis of the restriction of to . The dimension 2 eigenspaces of have canonical basis elements supported on and its complement. These bases give an interpolation formula for reconstructing from the values of and on , i.e., an explicit Fourier uniqueness pair interpolation formula. The coefficients of the interpolation formula are expressed in terms of theta functions. Lastly, we construct an explicit basis of having extremal support and leverage it to obtain explicit formulas for eigenfunctions of in when .
Keywords
Cite
@article{arxiv.2407.20379,
title = {The restricted discrete Fourier transform},
author = {W. Riley Casper and Milen Yakimov},
journal= {arXiv preprint arXiv:2407.20379},
year = {2024}
}
Comments
18 pages