Doubly commuting invariant subspaces for representations of product systems of C*-correspondences
Abstract
We obtain a Shimorin-Wold-type decomposition for a doubly commuting covariant representation of a product system of C*-correspondences. This extends a recent Wold-type decomposition by Jeu and Pinto for a q-doubly commuting isometries. Application to the wandering subspaces of doubly commuting induced representations is explored, and a version of Mandrekar's Beurling type theorem is obtained to study doubly commuting invariant subspaces using Fock space approach due to Popescu.
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