Homomorphisms of Fourier–Stieltjes algebras

Ross Stokke
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Abstract

Every homomorphism $\varphi: B(G) \rightarrow B(H)$ between Fourier-Stieltjes algebras on locally compact groups $G$ and $H$ is determined by a continuous mapping $\alpha: Y \rightarrow \Delta(B(G))$, where $Y$ is a set in the open coset ring of $H$ and $\Delta(B(G))$ is the Gelfand spectrum of $B(G)$ (a $*$-semigroup). We exhibit a large collection of maps $\alpha$ for which $\varphi=j_\alpha: B(G) \rightarrow B(H)$ is a completely positive/completely contractive/completely bounded homomorphism and establish converse statements in several instances. For example, we fully characterize all completely positive/completely contractive/completely bounded homomorphisms $\varphi: B(G) \rightarrow B(H)$ when $G$ is a Euclidean- or $p$-adic-motion group. In these cases, our description of the completely positive/completely contractive homomorphisms employs the notion of a "fusion map of a compatible system of homomorphisms/affine maps" and is quite different from the Fourier algebra situation.
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Fourier-Stieltjes代数的同态
在局部紧群$G$和$H$上的Fourier-Stieltjes代数之间的每一个同态$\varphi: B(G) \rightarrow B(H)$由一个连续映射$\alpha: Y \rightarrow \Delta(B(G))$确定,其中$Y$是$H$的开协集环中的一个集合,$\Delta(B(G))$是$B(G)$的Gelfand谱($*$半群)。我们展示了大量的映射$\alpha$,其中$\varphi=j_\alpha: B(G) \rightarrow B(H)$是一个完全正/完全收缩/完全有界同态,并在几个实例中建立了相反的命题。例如,当$G$是欧几里得运动群或$p$运动群时,我们完全刻画了所有完全正/完全收缩/完全有界同态$\varphi: B(G) \rightarrow B(H)$。在这些情况下,我们对完全正/完全收缩同态的描述采用了“同态/仿射映射相容系统的融合映射”的概念,这与傅里叶代数的情况完全不同。
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