Extensions of quasidiagonal $C^*$-algebras and controlling the $K_0$-map of embeddings

Abstract: We study the validity of the Blackadar-Kirchberg conjecture for extensions of separable, nuclear, quasidiagonal C * -algebras that satisfy the UCT. More specifically, we show that the conjecture for the extension has an affirmative answer if the ideal lies in a class of C * -algebras that is closed under local approximations and contains all separable ASH algebras, as well as certain classes of simple, unital C * -algebras and crossed products of unital C * -algebras with Z.