Doubly Commuting Semigroups of Isometries
Abstract
In this paper, we discuss the structure of doubly commuting semigroups of isometries. We record a new proof of Cooper's theorem in the Hilbert module setting. We discuss the Fell topology on the set of equivalence classes of irreducible, doubly commuting isometric representations of R+d. We show that if d is finite, the topology is T0. We indicate the pathologies that occur when d=∞. In particular, we show that Wold decomposition fails for isometric representations of R+∞ and prove that the Fell topology on the set of equivalence classes of irreducible, doubly commuting isometric representations of R+∞ is not T0
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