Hermitian crossed product Banach algebras

Rachid El Harti, Paulo R. Pinto
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Abstract

We show that the Banach *-algebra $\ell^1(G,A,\alpha)$, arising from a C*-dynamical system $(A,G,\alpha)$, is an hermitian Banach algebra if the discrete group $G$ is finite or abelian (or more generally, a finite extension of a nilpotent group). As a corollary, we obtain that $\ell^1(\mathbb{Z},C(X),\alpha)$ is hermitian, for every topological dynamical system $\Sigma = (X, \sigma)$, where $\sigma: X\to X$ is a homeomorphism of a compact Hausdorff space $X$ and the action is $\alpha_n(f)=f\circ \sigma^{-n}$ with $n\in\mathbb{Z}$.
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赫米特交叉积巴拿赫代数
我们证明,如果离散群 $G$ 是有限的或阿贝尔的(或者更一般地说,是零能群的有限扩展),那么由 C* 动力系统 $(A,G,\alpha)$ 产生的 Banach *-algebra $\ell^1(G,A,\alpha)$ 就是一个全息 Banach 代数。作为推论,我们可以得到,对于每一个拓扑动力系统 $\Sigma = (X, \sigma)$ 都是全等的,其中 $\sigma:X/to X$ 是紧凑 Hausdorff 空间 $X$ 的同构,作用是$alpha_n(f)=f/circ \sigma^{-n}$,$nin\mathbb{Z}$。
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