Asymptotic homomorphisms into the Calkin algebra
Abstract
Let A be a separable C*-algebra and let B be a stable C*-algebra with a strictly positive element. We consider the (semi)group as(A,B) (resp. (A,B)) of homotopy classes of asymptotic (resp. of genuine) homomorphisms from A to the corona algebra M(B)/B and the natural map i:(A,B)as(A,B). We show that if A is a suspension then as(A,B) coincides with E-theory of Connes and Higson and the map i is surjective. In particular any asymptotic homomorphism from SA to M(B)/B is homotopic to some genuine homomorphism.
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