Frames of multi-windowed exponentials on subsets of Rd

Abstract

Given discrete subsets j⊂ Rd, j=1,...,q, consider the set of windowed exponentials j=1q\gj(x)e2π i <λ,x>: λ∈j\ on L2(). We show that a necessary and sufficient condition for the windows gj to form a frame of windowed exponentials for L2() with some j is that m≤ j∈ J|gj|≤ M almost everywhere on for some subset J of \1,..., q\. If is unbounded, we show that there is no frame of windowed exponentials if the Lebesgue measure of is infinite. If is unbounded but of finite measure, we give a sufficient condition for the existence of Fourier frames on L2(). At the same time, we also construct examples of unbounded sets with finite measure that have no tight exponential frame.