Factorable Weak Operator-Valued Frames

Abstract

Let H and H0 be Hilbert spaces and \An\n be a sequence of bounded linear operators from H to H0. The study frames for Hilbert spaces initiated the study of operators of the form Σn=1∞An*An, where the convergence is in the strong-operator topology, by Kaftal, Larson and Zhang in the paper: Operator-valued frames. Trans. Amer. Math. Soc., 361(12):6349-6385, 2009. In this paper, we generalize this and study the series of the form Σn=1∞n*An, where \ n\n is a sequence of operators from H to H0. Main tool used in the study of Σn=1∞An*An is the factorization of this series. Since the series Σn=1∞n*An may not be factored, it demands greater care. Therefore we impose a factorization of Σn=1∞n*An and derive various results. We characterize them and derive dilation results. We further study the series by taking the indexed set as group as well as group-like unitary system. We also derive stability results.