Remarks on anomalous symmetries of C*-algebras

Abstract

For a group G and ω∈ Z3(G, U(1)), an ω-anomalous action on a C*-algebra B is a U(1)-linear monoidal functor between 2-groups 2-Gr(G, U(1), ω)→ Aut(B), where the latter denotes the 2-group of *-automorphisms of B. The class [ω]∈ H3(G, U(1)) is called the anomaly of the action. We show for every n 2 and every finite group G, every anomaly can be realized on the stabilization of a commutative C*-algebra C(M) K for some closed connected n-manifold M. We also show that although there are no anomalous symmetries of Roe C*-algebras of coarse spaces, for every finite group G, every anomaly can be realized on the Roe corona C*(X)/K of some bounded geometry metric space X with property A.