Abstract
AbstractWe resolve the isomorphism problem for tensor algebras of unital multivariable dynamical systems. Specifically, we show that unitary equivalence after a conjugation for multivariable dynamical systems is a complete invariant for complete isometric isomorphisms between their tensor algebras. In particular, this settles a conjecture of Davidson and Kakariadis,Inter. Math. Res. Not.2014(2014), 1289–1311 relating to work of Arveson,Acta Math.118(1967), 95–109 from the 1960s, and extends related work of Kakariadis and Katsoulis,J. Noncommut. Geom.8(2014), 771–787.
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