A survey on frame representations via dynamical sampling

Abstract

Dynamical sampling deals with representations of a frame \ fk \k=1∞ as an orbit \ Tn \n=0∞ of a linear and possibly bounded operator T acting on the underlying Hilbert space. It is known that the desire of boundedness of the operator T puts severe restrictions on the frame \ fk \k=1∞. The purpose of the paper is to present an overview of the results in the literature and also discuss various alternative ways of representing a frame; in particular the class of considered frames can be enlarged drastically by allowing representations using only a subset \ Tα(k) \∞k=1 of the operator orbit \ Tn \n=0∞. In general it is difficult to specify appropriate values for the scalars α(k) and the vector ; however, by accepting an arbitrarily small and controllable deviation between the given frame \ fk \k=1∞ and \ Tα(k) \k=1∞ we will be able to do so.

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