中心推顶的剩余有限性

arXiv: Operator Algebras Pub Date : 2020-02-26 DOI:10.1090/proc/15368

A. Chirvasitu

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引用次数: 1

摘要

我们证明了中心子代数上的$C^*$-代数在$A_p$和$B_p$， $p\in \ mathm {spec}~C$为残差有限维的情况下，推入$A*_CB$总是残差有限维的，恢复并推广了Korchagin和Courtney-Shulman的结果。这就允许我们证明某些可服从群的中心推入具有RFD群$C^*$-代数。在此过程中，我们讨论了当给定一个中心群嵌入$H\le G$时，所得到的$C^*$-代数态射是一个连续域的问题:对于可服从的$G$总是如此，但不是一般情况。

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Residual finiteness for central pushouts

We prove that pushouts $A*_CB$ of residually finite-dimensional (RFD) $C^*$-algebras over central subalgebras are always residually finite-dimensional provided the fibers $A_p$ and $B_p$, $p\in \mathrm{spec}~C$ are RFD, recovering and generalizing results by Korchagin and Courtney-Shulman. This then allows us to prove that certain central pushouts of amenable groups have RFD group $C^*$-algebras. Along the way, we discuss the problem of when, given a central group embedding $H\le G$, the resulting $C^*$-algebra morphism is a continuous field: this is always the case for amenable $G$ but not in general.

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arXiv: Operator Algebras

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