Every AF-algebra is Morita equivalent to a graph algebra
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Publication:4824810
DOI10.1017/S0004972700035978zbMath1062.46045arXivmath/0310416MaRDI QIDQ4824810
Publication date: 1 November 2004
Published in: Bulletin of the Australian Mathematical Society (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/math/0310416
Related Items (10)
Purely infinite simple \(C^\ast\)-algebras that are principal groupoid \(C^\ast\)-algebras ⋮ AF 𝐶*-algebras from non-AF groupoids ⋮ Rank-two graphs whose \(C^*\)-algebras are direct limits of circle algebras ⋮ When is the Cuntz-Krieger algebra of a higher-rank graph approximately finite-dimensional? ⋮ Category equivalences involving graded modules over path algebras of quivers. ⋮ Twisted \(k\)-graph algebras associated to Bratteli diagrams ⋮ Continuous-trace \(k\)-graph \(C^*\)-algebras ⋮ A gauge invariant uniqueness theorem for corners of higher rank graph algebras ⋮ An equivariant pullback structure of trimmable graph \(C^{\ast}\)-algebras ⋮ \(C^\ast\) completions of Leavitt-path-algebra pullbacks
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