Classification of certain inductive limit actions of compact groups on AF algebras

Abstract

Let A=An be an AF algebra, G be a compact group. We consider inductive limit actions of the form α=αn, where αn G An is an action on the finite dimensional C*-algebra An which fixes each matrix summand. If each αn is inner, such actions are classified by equivariant K-theory by Handelman and Rossmann. However, if the actions αn are not inner, we show that such actions are not classifiable by equivariant K-theory. We give a complete classification of such actions using twisted equivariant K-theory.