Anomalous symmetries of classifiable C*-algebras
Abstract
We study the H3 invariant of a group homomorphism φ:G → Out(A), where A is a classifiable C*-algebra. We show the existence of an obstruction to possible H3 invariants arising from considering the unitary algebraic K1 group. In particular, we prove that when A is the Jiang--Su algebra Z this invariant must vanish. We deduce that the unitary fusion categories Hilb(G, ω) for non-trivial ω ∈ H3(G, T) cannot act on Z.
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