Rank-one decomposition of operators and construction of frames

Abstract

The construction of frames for a Hilbert space H can be equated to the decomposition of the frame operator as a sum of pos- itive operators having rank one. This realization provides a different approach to questions regarding frames with particular properties and motivates our results. We find a necessary and sufficient condition un- der which any positive finite-rank operator B can be expressed as a sum of rank-one operators with norms specified by a sequence of positive numbers {ci}. Equivalently, this result proves the existence of a frame with B as it's frame operator and with vector norms { p ci}. We further prove that, given a non-compact positive operator B on an infinite di- mensional separable real or complex Hilbert space, and given an infinite sequence {ci} of positive real numbers which has infinite sum and which has supremum strictly less than the essential norm of B, there is a se- quence of rank-one positive operators, with norms given by {ci}, which sum to B in the strong operator topology. These results generalize results by Casazza, Kovaycevic, Leon, and Tremain, in which the operator is a scalar multiple of the identity op- erator (or equivalently the frame is a tight frame), and also results by Dykema, Freeman, Kornelson, Larson, Ordower, and Weber in which {ci} is a constant sequence.