The linear span of projections in AH algebras and for inclusions of C*-algebras

Abstract

A C*-algebra is said to have the LP property if the linear span of projections is dense in a given algebra. In the first part of this paper, we show that an AH algebra A = (Ai,φi) has the LP property if and only if every real-valued continuous function on the spectrum of Ai (as an element of Ai via the non-unital embedding) belongs to the closure of the linear span of projections in A. As a consequence, a diagonal AH-algebra has the LP property if it has small eigenvalue variation. The second contribution of this paper is that for an inclusion of unital C*-algebras P ⊂ A with a finite Watatani Index, if a faithful conditional expectation E A → P has the Rokhlin property in the sense of Osaka and Teruya, then P has the LP property under the condition A has the LP property. As an application, let A be a simple unital C*-algebra with the LP property, G a finite group and α an action of G onto Aut(A). If α has the Rokhlin property in the sense of Izumi, then the fixed point algebra AG and the crossed product algebra A α G have the LP property. We also point out that there is a symmetry on CAR algebra, which is constructed by Elliott, such that its fixed point algebra does not have the LP property.