The Balian-Low theorem for locally compact abelian groups and vector bundles

Abstract

Let be a lattice in a second countable, locally compact abelian group G with annihilator ⊂eq G. We investigate the validity of the following statement: For every η in the Feichtinger algebra S0(G), the Gabor system \ Mτ Tλ η \λ ∈ , τ ∈ is not a frame for L2(G). When G = R and = α Z, this statement is a variant of the Balian-Low theorem. Extending a result of R. Balan, we show that whether the statement generalizes to (G,) is equivalent to the nontriviality of a certain vector bundle over the compact space (G/) × (G/). We prove this equivalence using a connection between Gabor frames and Heisenberg modules. More specifically, we show that the Zak transform can be viewed as an isomorphism of certain Hilbert C*-modules. As an application, we prove a new Balian-Low theorem for the group R × Qp, where Qp denotes the p-adic numbers.