English

Block-equivalent finite Gabor frames

Functional Analysis 2026-05-18 v1

Abstract

We study finite systems of vectors whose frame operator matrices are unitarily equivalent, via explicit and computationally efficient unitary transformations, to block-diagonal matrices. We call such systems block-equivalent. We show that a Gabor system G=G(g,L×K)CN\mathcal{G}=\mathcal{G}(g,L\times K)\subset \mathbb C^N is block-equivalent when either the modulation set LL or the translation set KK is a subgroup of ZN\mathbb Z_N. We also characterize situations in which the frame operator matrix becomes diagonal. Finally, we show that geometric conditions on subsets of ZN\mathbb Z_N force certain diagonals of the frame operator matrix of G\mathcal{G} to vanish, yielding additional sparsity and block structures.

Keywords

Cite

@article{arxiv.2605.16139,
  title  = {Block-equivalent finite Gabor frames},
  author = {Oleg Asipchuk and Laura De Carli and Luis Rodriguez},
  journal= {arXiv preprint arXiv:2605.16139},
  year   = {2026}
}