Explicit construction of non-stationary frames for L2

Abstract

We show the existence of a family of frames of L2(R) which depend on a parameter α∈ [0,1]. If α=0, we recover the usual Gabor frame, if α=1 we obtain a frame system which is closely related to the so called DOST basis, first introduced by Stockwell and then analyzed by Battisti and Riba. If α∈ (0,1), the frame system is associated to a so called α-partitioning of the frequency domain. Restricting to the case α=1, we provide a truly n-dimensional version of the DOST basis and an associated frame of L2(Rd).