$G$-kernels of Kirchberg algebras

TL;DR

This paper introduces a new K-theoretic invariant for G-kernels of Kirchberg algebras, providing classification results and new constraints on obstruction classes, advancing understanding of automorphism structures in purely infinite C*-algebras.

Contribution

It develops a novel invariant for G-kernels using K-theory and classifies Z^n-kernels for strongly self-absorbing Kirchberg algebras, extending the Dadarlat-Pennig theory.

Findings

New K-theoretic invariant for G-kernels

Classification of Z^n-kernels in Kirchberg algebras

Constraints on obstruction classes in purely infinite case

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\'{o}n 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 $\mathbb{Z}^n$-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.