Determinant Rank of C*-algebras

Abstract

Let A be a unital C*-algebra and let U0(A) be the group of unitaries of A which are path connected to the identity. Denote by CU(A) the closure of the commutator subgroup of U0(A). Let iA(1, n) U0(A)/CU(A)→ U0( Mn(A))/CU( Mn(A)) be the \, defined by sending u to diag(u,1n). We study the problem when the map iA(1,n) is an isomorphism for all n. We show that it is always surjective and is injective when A has stable rank one. It is also injective when A is a unital C*-algebra of real rank zero, or A has no tracial state. We prove that the map is an isomorphism when A is the Villadsen's simple AH--algebra of stable rank k>1. We also prove that the map is an isomorphism for all Blackadar's unital projectionless separable simple C*-algebras. Let A= Mn(C(X)), where X is any compact metric space. It is noted that the map iA(1, n) is an isomorphism for all n. As a consequence, the map iA(1, n) is always an isomorphism for any unital C*-algebra A that is an inductive limit of finite direct sum of C*-algebras of the form Mn(C(X)) as above. Nevertheless we show that there are unital C*-algebras A such that iA(1,2) is not an isomorphism.