Isometric tuples are hyperreflexive
Abstract
An n-tuple of operators (V1,...,Vn) acting on a Hilbert space H is said to be isometric if the row operator (V1,...,Vn) : Hn H is an isometry. We prove that every isometric n-tuple is hyperreflexive, in the sense of Arveson. For n = 1, the hyperreflexivity constant is at most 95. For n ≥ 2, the hyperreflexivity constant is at most 6.
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