Isometric dilations of non-commuting finite rank n-tuples

Abstract

A contractive n-tuple A=(A1,...,An) has a minimal joint isometric dilation S=(S1,...,Sn) where the Si's are isometries with pairwise orthogonal ranges. This determines a representation of the Cuntz-Toeplitz algebra. When A acts on a finite dimensional space, the -closed nonself-adjoint algebra S generated by S is completely described in terms of the properties of A. This provides complete unitary invariants for the corresponding representations. In addition, we show that the algebra S is always hyper-reflexive. In the last section, we describe similarity invariants. In particular, an n-tuple B of d× d matrices is similar to an irreducible n-tuple A if and only if a certain finite set of polynomials vanish on B.

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