An asymptotic homotopy lifting property
Abstract
A C*-algebra A is said to have the homotopy lifting property if for all C*-algebras B and E, for every surjective *-homomorphism π E → B and for every *-homomorphism φ A → E, any path of *-homomorphisms A → B starting at π φ lifts to a path of *-homomorphisms A → E starting at φ. Blackadar has shown that this property holds for all semiprojective C*-algebras. We show that a version of the homotopy lifting property for asymptotic morphisms holds for separable C*-algebras that are sequential inductive limits of semiprojective C*-algebras. It also holds for any separable C*-algebra if the quotient map π satisfies an approximate decomposition property in the spirit of (but weaker than) the notion of quasidiagonality for extensions.
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