Anomaly of 4d Weyl fermions with discrete symmetries

Abstract

We derive explicit anomaly-index formulas for four-dimensional Weyl fermions charged under the finite symmetries Spin× Zn and Spin× Z2 F Z2m F. The strategy is to start from the standard perturbative anomaly indices for Spin× U(1) and Spin× Z2 F U(1)=Spinc, and then restrict the continuous U(1) symmetry to a finite cyclic subgroup. On the level of invertible field theories this gives natural homomorphisms TP5(Spin× U(1)) TP5(Spin× Zn), TP5(Spinc) TP5(Spin× Z2 F Z2m F). We compute these maps explicitly by evaluating reduced η-invariants on geometric representatives of the finite anomaly groups. For Spin× Zn, the relevant backgrounds are the five-dimensional lens-space bundle X(n;1,1) and the product L(n;1)×K3. For Spin× Z2 F Z2m F, the relevant backgrounds are L(m;1,1,1) and, depending on the parity of m, either L(m;1)×Enriques or L(m;1)×K3. The output is a pair of integer-valued anomaly indices for each finite symmetry. These indices are normalized in the cyclic factors of the finite anomaly group, so they can be used directly in anomaly-cancellation checks for fermions with discrete gauge or global symmetries.