Symmetries of Kirchberg Algebras

Abstract

Let G₀ and G₁ be countable abelian groups. Let γ_i be an automorphism of G_i of order two. Then there exists a unital Kirchberg algebra A satisfying the Universal Coefficient Theorem and with [1_A] = 0 in K₀(A), and an automorphism α ∈ Aut(A) of order two, such that K₀(A) ≅ G₀, such that K₁(A) ≅ G₁, and such that α_* : K_i(A) → K_i(A) is γ_i. As a consequence, we prove that every -graded countable module over the representation ring R() of is isomorphic to the equivariant K-theory K (A) for some action of on a unital Kirchberg algebra A.Along the way, we prove that every not necessarily finitely generated []-module which is free as a -module has a direct sum decomposition with only three kinds of summands, namely [] itself and on which the nontrivial element of acts either trivially or by multiplication by −1.