Character Space and Gelfand type representation of locally C^{*}-algebra

Santhosh Kumar Pamula, Rifat Siddique
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Abstract

In this article, we identify a suitable approach to define the character space of a commutative unital locally $C^{\ast}$-algebra via the notion of the inductive limit of topological spaces. Also, we discuss topological properties of the character space. We establish the Gelfand type representation between a commutative unital locally $C^{\ast}$-algebra and the space of all continuous functions defined on its character space. Equivalently, we prove that every commutative unital locally $C^{\ast}$-algebra is identified with the locally $C^{\ast}$-algebra of continuous functions on its character space through the coherent representation of projective limit of $C^{\ast}$-algebras. Finally, we construct a unital locally $C^{\ast}$-algebra generated by a given locally bounded normal operator and show that its character space is homeomorphic to the local spectrum. Further, we define the functional calculus and prove spectral mapping theorem in this framework.
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局部 C^{*} 代数的字符空间和格尔方型表示
在这篇文章中,我们通过拓扑空间的归纳极限概念,确定了定义交换独元局部 $C^{\ast}$ 代数的字符空间的合适方法。同时,我们还讨论了字符空间的拓扑性质。我们在一个互素单元局部 $C^{\ast}$ 代数和定义在其特征空间上的所有连续函数的空间之间建立了格尔芬德型表示。等价地,我们通过$C^{/ast}$-代数的投影极限的相干表示,证明了每一个交换单整局部$C^{/ast}$-代数都与其特征空间上的局部$C^{/ast}$-连续函数代数相一致。最后,我们构造了一个由给定的局部有界正算子生成的单元局部$C^{ast}$代数,并证明其特征空间与局部谱同构。此外,我们在这个框架中定义了函数微积分并证明了谱映射定理。
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