The structure of algebraic Baer *-algebras

Abstract

The purpose of this note is to describe when a general complex algebraic *-algebra is pre-C*-normed, and to investigate their structure when the *-algebras are Baer *-rings in addition to algebraicity. As a main result we prove the following theorem for complex algebraic Baer *-algebras: every *-algebra of this kind can be decomposed as a direct sum M B, where M is a finite dimensional Baer *-algebra and B is a commutative algebraic Baer *-algebra. The summand M is *-isomorphic to a finite direct sum of full complex matrix algebras of size at least 2×2. The commutative summand B is *-isomorphic to the linear span of the characteristic functions of the clopen sets in a Stonean topological space. As an application we show that a group G is finite exactly when the complex group algebra C[G] is an algebraic Baer *-algebra.