The Taylor joint spectrum and restriction to hyperinvariant subspaces
Abstract
It is well known that for a single bounded operator A0 on a Hilbert H, if M⊂ H is hyperinvariant for A0, then the spectrum of A0|M is contained in the spectrum of A0. In this note, we modify an example of Taylor to prove the following. There exist a quadruple A=(A1,A2,A3,A4) of commuting bounded Hilbert space operators and a hyperinvariant subspace X1 for A such that the Taylor joint spectrum of A restricted to X1 is a not a subset of the Taylor joint spectrum of A.
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