Frames of translates with prescribed fine structure in shift invariant spaces

Abstract

For a given finitely generated shift invariant (FSI) subspace ⊂ L2(k) we obtain a simple criterion for the existence of shift generated (SG) Bessel sequences E() induced by finite sequences of vectors ∈ n that have a prescribed fine structure i.e., such that the norms of the vectors in and the spectra of SE() is prescribed in each fiber of Spec()⊂ k. We complement this result by developing an analogue of the so-called sequences of eigensteps from finite frame theory in the context of SG Bessel sequences, that allows for a detailed description of all sequences with prescribed fine structure. Then, given 0<α1≤ …≤ αn we characterize the finite sequences ∈n such that \|fi\|2=αi, for 1≤ i≤ n, and such that the fine spectral structure of the shift generated Bessel sequences E() have minimal spread (i.e. we show the existence of optimal SG Bessel sequences with prescribed norms); in this context the spread of the spectra is measured in terms of the convex potential P induced by and an arbitrary convex function :+→ +.