Homotopy classification of Leavitt path algebras
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Publication:2287949
DOI10.1016/j.aim.2019.106961zbMath1442.16030arXiv1806.09242OpenAlexW2809937519WikidataQ126380537 ScholiaQ126380537MaRDI QIDQ2287949
Diego Montero, Guillermo Cortiñas
Publication date: 22 January 2020
Published in: Advances in Mathematics (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1806.09242
Related Items (6)
Lifting graph C∗$C^*$‐algebra maps to Leavitt path algebra maps ⋮ The dg Leavitt algebra, singular Yoneda category and singularity category ⋮ Classifying Leavitt path algebras up to involution preserving homotopy ⋮ Graded \(K\)-theory, filtered \(K\)-theory and the classification of graph algebras ⋮ Nonarchimedean analytic cyclic homology ⋮ Algebraic bivariant \(K\)-theory and Leavitt path algebras.
Cites Work
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- Leavitt \(R\)-algebras over countable graphs embed into \(L_{2,R}\).
- Localization of the K-theory of polynomial extensions
- Flow invariants in the classification of Leavitt path algebras.
- \(K_0\) of purely infinite simple regular rings
- A class of C*-algebras and topological Markov chains
- On regular rings with stable range 2
- Delooping classifying spaces in algebraic K-theory
- Classification of Cuntz-Krieger algebras
- Leavitt path algebras
- The center of a Leavitt path algebra.
- The Leavitt path algebra of a graph.
- Graded \(K\)-theory, filtered \(K\)-theory and the classification of graph algebras
- Index maps in theK-theory of graph algebras
- Algebraic v. Topological K-Theory: A Friendly Match
- Non-simple purely infinite rings
- $K$-theory of Leavitt path algebras
- K-Theory of Free Rings
- Bivariant algebraic K-theory
- $K$-théorie algébrique et $K$-théorie topologique I.
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