Compactly supported Gabor orthonormal bases

Abstract

We characterize all lattices Λ⊂ R2 and all compactly supported functions g ∈ L2(R) for which the Gabor system \ e2πi s x g(x-t) : (t,s) ∈ Λ \ forms an orthonormal basis for L2(R). The characterization is given in geometric terms through translation tilings and discreteness properties of lattice projections. In particular, this resolves a conjecture of Han and Wang on the non-existence of Gabor bases along specific irrational lattices. Finally, we construct Gabor bases that cannot be realized by any product set, answering a problem of Iosevich and Mayeli.