Semi-invertible extensions and asymptotic homomorphisms
Abstract
We consider the semigroup Ext(A,B) of extensions of a separable C*-algebra A by a stable C*-algebra B modulo unitary equivalence and modulo asymptotically split extensions. This semigroup contains the group Ext-1/2(A,B) of invertible elements (i.e. of semi-invertible extensions). We show that the functor Ext1/2(A,B) is homotopy invariant and that it coincides with the functor of homotopy classes of asymptotic homomorphisms from C( T) A to M(B) that map SA⊂eq C( T) A into B.
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