Systems of Left Translates and Oblique Duals on the Heisenberg Group
Abstract
In this paper, we characterize the system of left translates \L(2k,l,m)g:k,l,m∈Z\, g∈ L2(H), to be a frame sequence or a Riesz sequence in terms of the twisted translates of the corresponding function gλ. Here, (H denotes the Heisenberg group and gλ the inverse Fourier transform of g with respect to the central variable. This type of characterization for a Riesz sequence allows us to find some concrete examples. We also study the structure of the oblique dual of the system of left translates \L(2k,l,m)g:k,l,m∈Z\ on (H. This result is also illustrated with an example.
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