Representation Theory and Numerical AF-invariants: The representations and centralizers of certain states on Od
Abstract
Let Od be the Cuntz algebra on generators S1,...,Sd, 2 ≤ d < ∞, and let Dd ⊂ Od be the abelian subalgebra generated by monomials Sα Sα* =Sα1...SαkSαk*...Sα1* where α=(α1...αk) ranges over all multi-indices formed from 1,...,d. In any representation of Od, Dd may be simultaneously diagonalized. Using Si(Sα Sα*) =(SiαSiα*)Si, we show that the operators Si from a general representation of Od may be expressed directly in terms of the spectral representation of Dd. We use this in describing a class of type III representations of Od and corresponding endomorphisms, and the heart of the paper is a description of an associated family of AF-algebras arising as the fixed-point algebras of the associated modular automorphism groups. Chapters 5--18 are devoted to finding effective methods to decide isomorphism and non-isomorphism in this class of AF-algebras.
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