English

Counterexamples to the B-spline conjecture for Gabor frames

Functional Analysis 2015-08-20 v3

Abstract

The frame set conjecture for B-splines BnB_n, n2n \ge 2, states that the frame set is the maximal set that avoids the known obstructions. We show that any hyperbola of the form ab=rab=r, where rr is a rational number smaller than one and aa and bb denote the sampling and modulation rates, respectively, has infinitely many pieces, located around b=2,3,b=2,3,\dots, \emph{not} belonging to the frame set of the nnth order B-spline. This, in turn, disproves the frame set conjecture for B-splines. On the other hand, we uncover a new region belonging to the frame set for B-splines BnB_n, n2n \ge 2.

Keywords

Cite

@article{arxiv.1507.03982,
  title  = {Counterexamples to the B-spline conjecture for Gabor frames},
  author = {Jakob Lemvig and Kamilla Haahr Nielsen},
  journal= {arXiv preprint arXiv:1507.03982},
  year   = {2015}
}

Comments

Version 2: Lem. 5, Prop. 6, and Thm. 7 added, Version 3: Thm. 8 changed

R2 v1 2026-06-22T10:11:51.878Z