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Flow equivalence of graph algebras - MaRDI portal

Flow equivalence of graph algebras

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Publication:4663953

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DOI10.1017/S0143385703000348zbMath1076.46046arXivmath/0212241OpenAlexW2102280169MaRDI QIDQ4663953

David Pask, Teresa Bates

Publication date: 5 April 2005

Published in: Ergodic Theory and Dynamical Systems (Search for Journal in Brave)

Full work available at URL: https://arxiv.org/abs/math/0212241

zbMATH Keywords

graph \(C^*\)-algebras strongly Morita equivalent \(C^*\)-algebras

Mathematics Subject Classification ID

Noncommutative dynamical systems (46L55) General theory of (C^*)-algebras (46L05) Symbolic dynamics (37B10)

Related Items (28)

The complete classification of unital graph \(C^{\ast}\)-algebras: geometric and strong ⋮ Extensions of Cuntz-Krieger algebras ⋮ Singular equivalence of finite dimensional algebras with radical square zero ⋮ The Cuntz splice does not preserve \(\ast\)-isomorphism of Leavitt path algebras over \(\mathbb{Z}\) ⋮ Moves on k-graphs preserving Morita equivalence ⋮ Invariance of the Cuntz splice ⋮ Relative Morita equivalence of Cuntz–Krieger algebras and flow equivalence of topological Markov shifts ⋮ On the classification and description of quantum lens spaces as graph algebras ⋮ Graded \(K\)-theory, filtered \(K\)-theory and the classification of graph algebras ⋮ SATURATED ACTIONS BY FINITE-DIMENSIONAL HOPF *-ALGEBRAS ON C*-ALGEBRAS ⋮ SUBSETS OF VERTICES GIVE MORITA EQUIVALENCES OF LEAVITT PATH ALGEBRAS ⋮ Classification of unital simple Leavitt path algebras of infinite graphs. ⋮ The dynamics of Leavitt path algebras. ⋮ Graph algebras and orbit equivalence ⋮ Flow invariants in the classification of Leavitt path algebras. ⋮ State splitting, strong shift equivalence and stable isomorphism of Cuntz–Krieger algebras ⋮ A dual graph construction for higher-rank graphs, and 𝐾-theory for finite 2-graphs ⋮ DYNAMICAL SYSTEMS IN GRAPH C*-ALGEBRAS ⋮ Imprimitivity bimodules of Cuntz–Krieger algebras and strong shift equivalences of matrices ⋮ The classification question for Leavitt path algebras. ⋮ Equivalent groupoids have Morita equivalent Steinberg algebras. ⋮ A gauge invariant uniqueness theorem for corners of higher rank graph algebras ⋮ Balanced strong shift equivalence, balanced in-splits, and eventual conjugacy ⋮ Realizing corners of Leavitt path algebras as Steinberg algebras, with corresponding connections to graph \(C^{\ast}\)-algebras ⋮ Geometric classification of simple graph algebras ⋮ Flow equivalence of diagram categories and Leavitt path algebras ⋮ The spectra of digraphs with Morita equivalent \(C^\ast\)-algebras ⋮ On conjugacy of subalgebras in graph C*-algebras. II

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