THE K-THEORY OF THE ${\mathit{C}}^{\star }$ -ALGEBRAS OF 2-RANK GRAPHS ASSOCIATED TO COMPLETE BIPARTITE GRAPHS

Pub Date : 2021-10-25 DOI:10.1017/S1446788721000161

S. A. Mutter

引用次数: 0

Abstract

Abstract Using a result of Vdovina, we may associate to each complete connected bipartite graph $\kappa $ a two-dimensional square complex, which we call a tile complex, whose link at each vertex is $\kappa $ . We regard the tile complex in two different ways, each having a different structure as a $2$ -rank graph. To each $2$ -rank graph is associated a universal $C^{\star }$ -algebra, for which we compute the K-theory, thus providing a new infinite collection of $2$ -rank graph algebras with explicit K-groups. We determine the homology of the tile complexes and give generalisations of the procedures to complexes and systems consisting of polygons with a higher number of sides.

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与完全二部图相关的2-秩图的${\mathit{C}}^{\star}$ -代数的k理论

利用Vdovina的一个结果，我们可以给每一个完全连通二部图$\kappa $关联一个二维方形复合体，我们称之为tile复合体，它在每个顶点处的连杆为$\kappa $。我们以两种不同的方式来看待贴图复合体，每一种都有不同的结构作为$2$ -rank图。对于每一个$2$秩的图，我们都关联了一个泛$C^{\star}$ -代数，为此我们计算了k理论，从而提供了一个新的具有显式k群的$2$秩图代数的无限集合。我们确定了瓷砖复合物的同源性，并给出了由具有较高边数的多边形组成的复合物和系统的程序的概化。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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