C* exponential length of commutators unitaries in AH algebras

Abstract

For each unital C*-algebra A, we denote celCU(A)=\cel(u):u∈ CU(A)\, where cel(u) is the exponential length of u and CU(A) is the closure of the commutator subgroup of U0(A). In this paper, we prove that celCU(A)=2π provided that A is an AH algebras with slow dimension growth whose real rank is not zero. On the other hand, we prove that celCU(A)≤ 2π when A is an AH algebra with ideal property and of no dimension growth (if we further assume A is not of real rank zero, we have celCU(A)= 2π).