A Reduction theorem for AH algebras with ideal property

Abstract

Let A be an AH algebra, that is, A is the inductive limit C*-algebra of A1φ1,2A2φ2,3A3·s An·s with An=i=1tnPn,iM[n,i](C(Xn,i))Pn,i, where Xn,i are compact metric spaces, tn and [n,i] are positive integers, and Pn,i∈ M[n,i](C(Xn,i)) are projections. Suppose that A has the ideal property: each closed two-sided ideal of A is generated by the projections inside the ideal, as a closed two-sided ideal. Suppose that n,idim(Xn,i)<+∞. In this article, we prove that A can be written as the inductive limit of B1 B2·s Bn·s, where Bn=i=1snQn,iM\n,i\(C(Yn,i))Qn,i, where Yn,i are \pt\, [0,1], S1, TII, k, TIII, k and S2 (all of them are connected simplicial complexes of dimension at most three), sn and \n,i\ are positive integers and Qn,i∈ M\n,i\(C(Yn,i)) are projections. This theorem unifies and generalizes the reduction theorem for real rank zero AH algebras due to Dadarlat and Gong ([D], [G3] and [DG]) and the reduction theorem for simple AH algebras due to Gong (see [G4]).