G-kernels of Kirchberg algebras

Abstract

A G-kernel is a group homomorphism from a group G to the outer automorphism group of a C*-algebra. Inspired by recent work of Evington and Gir\'on Pacheco in the stably finite case, we introduce a new invariant of a G-kernel using K-theory, and deduce several new constraints of the obstruction classes of G-kernels in the purely infinite case. We classify Zn-kernels for strongly self-absorbing Kirchberg algebras in the bootstrap category in terms of our new invariant and the Dadarlat-Pennig theory of continuous fields of strongly self-absorbing C*-algebras.