Gabor Frames for Quasicrystals, K-theory, and Twisted Gap Labeling

Abstract

We study the connection between Gabor frames for quasicrystals, the topology of the hull of a quasicrystal , and the K-theory of the twisted groupoid C*-algebra Aσ arising from a quasicrystal. In particular, we construct a finitely generated projective module H over Aσ related to time-frequency analysis, and any multiwindow Gabor frame for can be used to construct an idempotent in MN(Aσ) representing H in K0(Aσ). We show for lattice subsets in dimension two, this element corresponds to the Bott element in K0(Aσ), allowing us to prove a twisted version of Bellissard's gap labeling theorem.