ON STRONG SHIFT EQUIVALENCE OF HILBERT $C^{*}$ -BIMODULES
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概要
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We will study a notion of strong shift equivalence between two Hilbert $C^{*}-$ bimodules as a generalization of strong shift equivalence between two nonnegative matrices. We will prove that if two finite projective Hilbert $C^{*}-$ bimodules are strong shift equivalent, the gauge actions of the $C^{*}$ -algebras of the Hilbert $C^{*}$-bimodules are stably outer conjugate. Hence the K-theoretic groups of the $C^{*}$ -algebras of strong shift equivalent Hilbert $C^{*}$-bimodules are invariant.
- Yokohama City University and Yokohama National Universityの論文
- 2007-00-00
Yokohama City University and Yokohama National University | 論文
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