Equivariant KK-theory of Bernoulli shifts on C*-algebras with approximately inner flip

Abstract

Building on Enders--Schemeitat--Tikuisis' classification, we show that a separable C*-algebra A with approximately inner flip in the UCT class is K-theoretically self-absorbing if and only if for every finite group G, the Bernoulli shift on A G is KKG-equivalent to the trivial action. This in particular applies to UHF-algebras of infinite type and computes the K-theory of the associated crossed product. Along the way, we obtain an alternative proof of Hirshberg--Winter's result that the Bernoulli shift of G on a UHF-algebra of infinite type absorbs the trivial action up to conjugacy. For more general amenable groups G, we develop K-theory formulas for Bernoulli shifts on UHF-absorbing C*-algebras, and establish KKG-triviality for Bernoulli shifts on strongly self-absorbing C*-algebras satisfying the UCT.