Leavitt path algebras of weighted and separated graphs

TL;DR

This paper establishes a deep connection between Leavitt path algebras of weighted and separated graphs, showing isomorphisms and introducing a universal algebra, with implications for ideal structure and specific algebra cases.

Contribution

It demonstrates that Leavitt path algebras of weighted graphs are $*$-isomorphic to separated graph algebras and introduces a universal tame $*$-algebra, advancing the understanding of their structure.

Findings

Leavitt path algebras of weighted graphs are $*$-isomorphic to separated graph algebras.

A universal tame $*$-algebra $L^{ ext{ab}}(E,w)$ is introduced.

Structural insights into ideals of $L(E, ext{w})$ and analysis of maximal ideals in $L(m,n)$.

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 $L(m,n)$.