English

The restricted discrete Fourier transform

Spectral Theory 2024-09-13 v3 Classical Analysis and ODEs

Abstract

We investigate the restriction of the discrete Fourier transform FN:L2(Z/NZ)L2(Z/NZ)F_N : L^2(\mathbb{Z}/N \mathbb{Z}) \to L^2(\mathbb{Z}/N \mathbb{Z}) to the space Ca\mathcal C_a of functions with support on the discrete interval [a,a][-a,a], whose transforms are supported inside the same interval. A periodically tridiagonal matrix JJ on L2(Z/NZ)L^2(\mathbb{Z}/N \mathbb{Z}) is constructed having the three properties that it commutes with FNF_N, has eigenspaces of dimensions 1 and 2 only, and the span of its eigenspaces of dimension 1 is precisely Ca\mathcal C_a. The simple eigenspaces of JJ provide an orthonormal eigenbasis of the restriction of FNF_N to Ca\mathcal C_a. The dimension 2 eigenspaces of JJ have canonical basis elements supported on [a,a][-a,a] and its complement. These bases give an interpolation formula for reconstructing f(x)L2(Z/NZ)f(x)\in L^2(\mathbb{Z}/N\mathbb{Z}) from the values of f(x)f(x) and f^(x)\widehat f(x) on [a,a][-a,a], 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 Ca\mathcal C_a having extremal support and leverage it to obtain explicit formulas for eigenfunctions of FNF_N in CaC_a when dimCa4\dim \mathcal C_a \leq 4.

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

R2 v1 2026-06-28T17:57:30.513Z