The Compact Metric Space of the Lattice of Varieties and ^{*}-Varieties of C^{*}-Algebras

G. KHALILZADEH; MOHAMMAD HASAN FAROUGHI

The Compact Metric Space of the Lattice of Varieties and ^{}-Varieties of C^{}-Algebras

Authors: G. KHALILZADEH, MOHAMMAD HASAN FAROUGHI

Abstract: Variety of Banach algebras is a non-empty class of Banach algebras in which there exist a family of laws such that all of its members satisfy all of the laws. In this paper, we have used merely mathematical items such as Banach algebras and varieties including Banach algebras in order to change the space of all varieties of Banach algebras into a compact metric space. We prove some theorems in the metric space of zero at infinity varieties, define the ^*-varieties of ^{*}-algebra and prove many theorems about ^*-varieties of C^*-algebras.

Keywords: Variety of Banach algebras, H-variety, Q-algebras, IR-algebras

Full Text: PDF