The covariant functoriality of graph algebras

IF 0.8 3区 数学 Q2 MATHEMATICS Bulletin of the London Mathematical Society Pub Date : 2024-10-28 DOI:10.1112/blms.13125
Piotr M. Hajac, Mariusz Tobolski
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Abstract

In the standard category of directed graphs, graph morphisms map edges to edges. By allowing graph morphisms to map edges to finite paths (path homomorphisms of graphs), we obtain an ambient category in which we determine subcategories enjoying covariant functors to categories of algebras given by constructions of path algebras, Cohn path algebras, and Leavitt path algebras, respectively. Thus, we obtain new tools to unravel homomorphisms between Leavitt path algebras and between graph C*-algebras. In particular, a graph-algebraic presentation of the inclusion of the C*-algebra of a quantum real projective plane into the Toeplitz algebra allows us to determine a quantum CW-complex structure of the former. It comes as a mixed-pullback theorem where two $*$ -homomorphisms are covariantly induced from path homomorphisms of graphs and the remaining two are contravariantly induced by admissible inclusions of graphs. As a main result and an application of new covariant-induction tools, we prove such a mixed-pullback theorem for arbitrary graphs whose all vertex-simple loops have exits, which substantially enlarges the scope of examples coming from noncommutative topology.

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图代数的协变函数性
在有向图的标准范畴中,图态量把边映射到边。通过允许图态量把边映射到有限路径(图的路径同态性),我们得到了一个环境范畴,在这个范畴中,我们确定了享有协变函数的子范畴,这些协变函数分别由路径代数、科恩路径代数和利维特路径代数的构造给出。因此,我们获得了新的工具来揭示 Leavitt 路径代数之间和图 C* 代数之间的同构。特别是,将量子实射影平面的 C* 代数包含到托普利兹代数中的图代数表达,使我们能够确定前者的量子 CW 复数结构。它是一个混合拉回定理,其中两个∗ $*$ -同态是由图的路径同态协变诱导的,而其余两个同态是由图的可容许夹杂协变诱导的。作为一个主要结果和新的协变诱导工具的应用,我们证明了任意图的混合回拉定理,这些图的所有顶点简单循环都有出口,这大大扩大了来自非交换拓扑学的例子的范围。
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来源期刊
CiteScore
1.90
自引率
0.00%
发文量
198
审稿时长
4-8 weeks
期刊介绍: Published by Oxford University Press prior to January 2017: http://blms.oxfordjournals.org/
期刊最新文献
Issue Information The covariant functoriality of graph algebras Issue Information On a Galois property of fields generated by the torsion of an abelian variety Cross-ratio degrees and triangulations
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