LEAVITT PATH ALGEBRAS OF WEIGHTED AND SEPARATED GRAPHS

Pub Date : 2022-05-11 DOI:10.1017/S1446788722000155
P. Ara
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引用次数: 1

Abstract

Abstract In this paper, we show that Leavitt path algebras of weighted graphs and Leavitt path algebras of separated graphs are intimately related. We prove that any Leavitt path algebra $L(E,\omega )$ of a row-finite vertex weighted graph $(E,\omega )$ is $*$ -isomorphic to the lower Leavitt path algebra of a certain bipartite separated graph $(E(\omega ),C(\omega ))$ . For a general locally finite weighted graph $(E, \omega )$ , we show that a certain quotient $L_1(E,\omega )$ of $L(E,\omega )$ is $*$ -isomorphic to an upper Leavitt path algebra of another bipartite separated graph $(E(w)_1,C(w)^1)$ . We furthermore introduce the algebra ${L^{\mathrm {ab}}} (E,w)$ , which is a universal tame $*$ -algebra generated by a set of partial isometries. We draw some consequences of our results for the structure of ideals of $L(E,\omega )$ , and we study in detail two different maximal ideals of the Leavitt algebra $L(m,n)$ .
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加权图和分离图的Leavitt路径代数
摘要本文证明了加权图的Leavitt路径代数与分离图的Leavitt路径代数是密切相关的。证明了行有限顶点加权图$(E,\)$的任意Leavitt路径代数$L(E,\)$与某二部分离图$(E(\),C(\))$的下Leavitt路径代数$*$ -同构。对于一般的局部有限加权图$(E, \)$,我们证明了$L(E,\)$的某个商$L_1(E,\)$与另一个二部分离图$(E(w)_1,C(w)^1)$的上Leavitt路径代数$*$ -同构。进一步引入了代数${L^{\ mathm {ab}}} (E,w)$,它是由一组部分等距生成的一个泛驯服$*$ -代数。我们给出了L(E,)$理想结构的一些结果,并详细研究了Leavitt代数$L(m,n)$的两种不同的极大理想。
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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