Topological Twisting of 4d N=2 Supersymmetric Field Theories

Abstract

We discuss what topological data must be provided to define topologically twisted partition functions of four-dimensional N=2 supersymmetric field theories. The original example of Donaldson-Witten theory depends only on the diffeomorphism type of the spacetime and 't Hooft fluxes (characteristic classes of background gerbe connections, a.k.a. "one-form symmetry connections.") The example of N=2* theories shows that, in general, the twisted partition functions depend on further topological data. We describe topological twisting for general four-dimensional N=2 theories and argue that the topological partition functions depend on (a): the diffeomorphism type of the spacetime, (b): the characteristic classes of background gerbe connections and (c): a "generalized spin-c structure," a concept we introduce and define. The main ideas are illustrated with both Lagrangian theories and class S theories. In the case of class S theories of A1 type, we note that the different S-duality orbits of a theory associated with a fixed UV curve Cg,n can have different topological data.

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