English

Redundancy for localized and Gabor frames

Functional Analysis 2009-12-30 v2

Abstract

Redundancy is the qualitative property which makes Hilbert space frames so useful in practice. However, developing a meaningful quantitative notion of redundancy for infinite frames has proven elusive. Though quantitative candidates for redundancy exist, the main open problem is whether a frame with redundancy greater than one contains a subframe with redundancy arbitrarily close to one. We will answer this question in the affirmative for 1\ell^1-localized frames. We then specialize our results to Gabor multi-frames with generators in M1(Rd)M^1(\R^d), and Gabor molecules with envelopes in W(C,l1)W(C,l^1). As a main tool in this work, we show there is a universal function g(x)g(x) so that for every ϵ>0\epsilon>0, every Parseval frame {fi}i=1M\{f_i\}_{i=1}^M for an NN-dimensional Hilbert space HNH_N has a subset of fewer than (1+ϵ)N(1+\epsilon)N elements which is a frame for HNH_N with lower frame bound g(ϵ/(2MN1))g(\epsilon/(2\frac{M}{N}-1)). This work provides the first meaningful quantative notion of redundancy for a large class of infinite frames. In addition, the results give compelling new evidence in support of a general definition of reudndancy given in [7].

Keywords

Cite

@article{arxiv.0904.4471,
  title  = {Redundancy for localized and Gabor frames},
  author = {Radu Balan and Pete Casazza and Zeph Landau},
  journal= {arXiv preprint arXiv:0904.4471},
  year   = {2009}
}

Comments

35 pages. Formulation of the Gabor results strengthened. An acknowledgement section added. To appear in the Israel Journal of Mathematics

R2 v1 2026-06-21T12:56:02.003Z