Gabor unconditional bases and frames in Lp(R)

Abstract

We consider the following problem: given a set Λ⊂ R × R and p ≠ 2, does there exist a function g ∈ Lp(R) such that the Gabor system \g(x-t) e2 πisx\, (t,s) ∈ Λ, consisting of time-frequency shifts of g, forms an unconditional basis or unconditional Schauder frame in the space Lp(R)? We completely resolve this question for p>2; in particular, we characterize the sets Λ such that an unconditional Schauder frame of this form exists. We also prove a Balian-Low type result, showing that the window function g cannot enjoy mild continuity and decay conditions. For 1<p<2, we prove that a Gabor system cannot form an unconditional basis or unconditional Schauder frame in Lp(R) if the set Λ satisfies a natural separation condition.