KMS STATES ON FINITE-GRAPH C∗-ALGEBRAS
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概要
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We study Kubo-Martin-Schwinger(KMS) states on finite-graph C∗-algebras with sinks and sources. We compare finite-graph C∗-algebras with C∗-algebras associated with complex dynamical systems of rational functions. We show that if the inverse temperature β is large, then the set of extreme β-KMS states is parametrized by the set of sinks of the graph. This means that the sinks of a graph correspond to the branched points of a rational function from the point of KMS states. Since we consider graphs with sinks and sources, left actions of the associated bimodules are not injective. Then the associated graph C∗-algebras are realized as (relative) Cuntz-Pimsner algebras studied by Katsura. We need to generalize Laca-Neshvyevs theorem of the construction of KMS states on Cuntz-Pimsner algebras to the case that left actions of bimodules are not injective.
- 九州大学大学院数理学研究院の論文
著者
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KAJIWARA Tsuyoshi
Department of Environmental and Mathematical Sciences Okayama University
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KAJIWARA Tsuyoshi
Department of Applied Mathematics Faculty of Engineering Science Osaka University
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WATATANI Yasuo
Department of Mathematical Sciences Kyushu University
関連論文
- Hilbert C^*-bimodules and continuous Cuntz-Krieger algebras
- Induced Traces on Coaction Crosses Product $C^\ast$-algebras
- Group extensions and Plancherel formulas
- Traces on group extensions and C*-crossed products
- KMS STATES ON FINITE-GRAPH C∗-ALGEBRAS