Block-equivalent finite Gabor frames

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 is block-equivalent when either the modulation set L or the translation set K is a subgroup of ZN. We also characterize situations in which the frame operator matrix becomes diagonal. Finally, we show that geometric conditions on subsets of ZN force certain diagonals of the frame operator matrix of G to vanish, yielding additional sparsity and block structures.