The uniqueness theorem for Kasparov theory

Abstract

Answering a question of Carri\'on et al in their recent landmark paper on C*-algebra classification, we prove a general uniqueness theorem for KK-theory. Given arbitrary separable C*-algebras A and B and a Cuntz pair consisting of two absorbing representations ,: A(B), the induced element of KK(A,B) vanishes if and only if and are strongly asymptotically unitarily equivalent. This improves upon the Lin-Dadarlat-Eilers stable uniqueness theorem. The conclusion is deduced by first showing the K1-injectivity of an auxiliary C*-algebra associated to the C*-pair (A,B), which is sometimes called the Paschke dual algebra in the literature. Most of the article is concerned with the treatment of an umbrella theorem, which yields such a uniqueness theorem for other variants of KK-theory. This encompasses nuclear KK-theory, ideal-related KK-theory, equivariant KK-theory, or any combinations thereof.