Localization of a KO(pt)-valued index and the orientability of the Pin-(2) monopole moduli space

Abstract

It is known that the Dirac index of a Spinc structure is localized to the characteristic submanifold. We introduce the notion of G(n,s+,s-) structure on a manifold as a common generalization of the Spinc structure and the Hn(s) structure defined by D.~Freed--M.~Hopkins, and formulate a version of characteristic submanifold for the G(n,s+,s-) structure. We show that the KO*(pt)-valued index associated with the G(n,s+,s-) structure is localized to the characteristic submanifold. As an application, we give a topological sufficient condition for the moduli space of Pin-(2) monopoles to be orientable.