English

Heisenberg modules as function spaces

Operator Algebras 2022-07-12 v2 Functional Analysis

Abstract

Let Δ\Delta be a closed, cocompact subgroup of G×G^G \times \widehat{G}, where GG is a second countable, locally compact abelian group. Using localization of Hilbert CC^*-modules, we show that the Heisenberg module EΔ(G)\mathcal{E}_{\Delta}(G) over the twisted group CC^*-algebra C(Δ,c)C^*(\Delta,c) due to Rieffel can be continuously and densely embedded into the Hilbert space L2(G)L^2(G). This allows us to characterize a finite set of generators for EΔ(G)\mathcal{E}_{\Delta}(G) as exactly the generators of multi-window (continuous) Gabor frames over Δ\Delta, a result which was previously known only for a dense subspace of EΔ(G)\mathcal{E}_{\Delta}(G). We show that EΔ(G)\mathcal{E}_{\Delta}(G) as a function space satisfies two properties that make it eligible for time-frequency analysis: Its elements satisfy the fundamental identity of Gabor analysis if Δ\Delta is a lattice, and their associated frame operators corresponding to Δ\Delta are bounded.

Keywords

Cite

@article{arxiv.1904.10826,
  title  = {Heisenberg modules as function spaces},
  author = {Are Austad and Ulrik Enstad},
  journal= {arXiv preprint arXiv:1904.10826},
  year   = {2022}
}

Comments

24 pages; several changes have been made to the presentation, while the content remains essentially unchanged; to appear in Journal of Fourier Analysis and Applications

R2 v1 2026-06-23T08:48:21.861Z