Toeplitz Algebras of Correspondences and Endomorphisms of Sums of Type I Factors
Abstract: It is a well-known fact that endomorphisms of $B(H)$ are intimately connected with families of mutually orthogonal isometries, i.e. with representations of the so-called Toeplitz $C*$-algebras. In this paper we consider a natural generalization of this connection between the representation theory of certain $C*$-algebras associated to graphs and endomorphisms of certain von Neumann subalgebras of $B(H)$. Our primary results give criteria by which it may be determined if two representations give rise to equal or conjugate endomorphisms.
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