Frame Properties of Operator Orbits

Abstract

We consider sequences in a Hilbert space H of the form (Tnf0)n∈ I, with a linear operator T, the index set being either I = N or I = Z, a vector f0∈ H, and answer the following two related questions: (a) Which frames for H are of this form with an at least closable operator T? and (b) For which bounded operators T and vectors f0 is (Tnf0)n∈ I a frame for H? As a consequence of our results, it turns out that an overcomplete Gabor or wavelet frame can never be written in the form (Tnf0)n∈ N with a bounded operator T. The corresponding problem for I = Z remains open. Despite the negative result for Gabor and wavelet frames, the results demonstrate that the class of frames that can be represented in the form (Tnf0)n∈ N with a bounded operator T is significantly larger than what could be expected from the examples known so far.