We use product systems of $C^*$-correspondences to introduce twisted$C^*$-algebras of topological higher-rank graphs. We define the notion of acontinuous $\mathbb{T}$-valued $2$-cocycle on a topological higher-rank graph,and present examples of such cocycles on large classes of topologicalhigher-rank graphs. To every proper, source-free topological higher-rank graph$\Lambda$, and continuous $\mathbb{T}$-valued $2$-cocycle $c$ on $\Lambda$, weassociate a product system $X$ of $C_0(\Lambda^0)$-correspondences built fromfinite paths in $\Lambda$. We define the twisted Cuntz--Krieger algebra$C^*(\Lambda,c)$ to be the Cuntz--Pimsner algebra $\mathcal{O}(X)$, and wedefine the twisted Toeplitz algebra $\mathcal{T} C^*(\Lambda,c)$ to be theNica--Toeplitz algebra $\mathcal{NT}(X)$. We also associate to $\Lambda$ and$c$ a product system $Y$ of $C_0(\Lambda^\infty)$-correspondences built frominfinite paths. We prove that there is an embedding of $\mathcal{T}C^*(\Lambda,c)$ into $\mathcal{NT}(Y)$, and an isomorphism between$C^*(\Lambda,c)$ and $\mathcal{O}(Y)$.
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机译:我们使用$ C ^ * $对应的乘积系统来引入拓扑较高阶图的扭曲的$ C ^ * $代数。我们在拓扑更高等级的图上定义了连续的$ \ mathbb {T} $值$ 2 $ -cocycle的概念,并在大型拓扑更高等级图上提供了此类cocycle的示例。对于每个适当的,无源的拓扑高阶图$ \ Lambda $,以及$ \ Lambda $上的连续$ \ mathbb {T} $值$ 2 $ -cocycle $ c $,我们将一个产品系统$ X $与$ C_0(\ Lambda ^ 0)$-对应从$ \ Lambda $中的有限路径构建。我们将扭曲的Cuntz-Krieger代数$ C ^ *(\ Lambda,c)$定义为Cuntz-Pimsner代数$ \ mathcal {O}(X)$,并定义扭曲的Toeplitz代数$ \ mathcal {T } C ^ *(\ Lambda,c)$为Nica-Toeplitz代数$ \ mathcal {NT}(X)$。我们还将$ \ Lambda $和$ c $的产品系统$ Y $关联到从无限路径构建的$ C_0(\ Lambda ^ \ infty)$对应关系中。我们证明存在$ \ mathcal {T} C ^ *(\ Lambda,c)$到$ \ mathcal {NT}(Y)$中的嵌入,以及$ C ^ *(\ Lambda,c)之间的同构$和$ \ mathcal {O}(Y)$。
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