The Fine Structure of the Kasparov Groups III: Relative Quasidiagonality

TL;DR

This paper characterizes quasidiagonal classes in KK-theory for certain C*-algebras using K-theory, establishing quasidiagonality as a topological invariant and exploring related applications and conditions.

Contribution

It provides a new description of quasidiagonal KK-classes in terms of K-theory and proves their invariance under topological transformations.

Findings

Quasidiagonality of KK-classes is a topological invariant.

Identifies QD(A,B) with Pext(K_*(A),K_*(B))_0 for certain C*-algebras.

Provides conditions linking quasidiagonality of A/K to that of A.

Abstract

In this paper we identify QD(A,B), the quasidiagonal classes in KK_1(A,B), in terms of K_*(A) and K_*(B), and we use these results in various applications. Here is our central result. Theorem: Suppose that A is in the category of separable nuclear C^*-algebras which satisfy the UCT and A is quasidiagonal relative to B. Then there is a natural isomorphism QD(A,B) = Pext (K_*(A), K_*(B))_0 . Thus quasidiagonality of KK-classes is indeed a topological invariant. We give several applications. Finally, we establish a converse to a theorem of Davidson, Herrero, and Salinas, giving conditions under which the quasidiagonality of A/K implies the quasidiagonality of the associated representation of A.