A gerbe-like construction in gauge theory II: the case of homology tori

Abstract

In the previous paper, the author showed that for a smooth family X X B of a homotopy K3 surface, the obstruction for the tangent bundle along the fibers TB X to have a spin structure is canonically isomorphic to the obstruction for H+(X), the vector bundle over B consisting of self-dual harmonic 2-forms, to have a spin structure. In this paper, we show an analogous result for homology tori with odd determinant. The strategy for proof is similar to the case of homotopy K3 surfaces: take the determinant line bundle of the K-theoretic Seiberg--Witten invariant and construct an anti-linear Z/4-action on it at the representative level. We also see that the anti-linear Z/4-action possesses the information of the ordinary mod 2 Seiberg--Witten invariant. This recovers part of the result by Baraglia(2023) which computes the mod 2 Seiberg--Witten invariants for any closed spin 4-manifold.