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引用次数: 0
摘要
设$A$和$B$是两个一元代数$C^{*}$,且$varphi:A右行B$是一个线性映射。在本文中,我们研究了两个$C^{*}$-代数之间的线性映射的结构,它们保持了一定的性质或关系。特别地,我们证明了如果$varphi$是一元的,$B$是交换的,并且$V(varphi(a)^{*}varphi(B))对于所有$a,bin a $都是子集合V(a^{*} B)$,则$varphi$是一个$*$-同态。如果$varphi(|ab|)=|varphi(a)varphi(b)|$对于所有$a,bin a $,则$varphi$是一元$*$-同态。
On Preserving Properties of Linear Maps on $C^{*}$-algebras
Let $A$ and $B$ be two unital $C^{*}$-algebras and $varphi:A rightarrow B$ be a linear map. In this paper, we investigate the structure of linear maps between two $C^{*}$-algebras that preserve a certain property or relation. In particular, we show that if $varphi$ is unital, $B$ is commutative and $V(varphi(a)^{*}varphi(b))subseteq V(a^{*}b)$ for all $a,bin A$, then $varphi$ is a $*$-homomorphism. It is also shown that if $varphi(|ab|)=|varphi(a)varphi(b)|$ for all $a,bin A$, then $varphi$ is a unital $*$-homomorphism.
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