Abelian gerbes, generalized geometries and foliations of small exotic R4

Abstract

In the paper we prove the existence of the strict but relative relation between small exotic R4 for a fixed radial family of DeMichelis-Freedman type, and cobordism classes of codimension one foliations of S3 distinguished by the Godbillon-Vey invariant, GV∈ H3(S3,R) (represented by a 3-form). This invariant can be integrated to get the Godbillon-Vey number. For a fixed radial family, we will show that the isotopy classes (invariance w.r.t. small diffeomorphisms or coordinate transformations) of all members in this family are distinguished by the Godbillon-Vey number of the foliation which is equal to the square of the radius of the radial family. The special case of integer Godbillon-Vey invariants GV∈ H3(S3,Z) is also discussed and is connected to flat PSL(2,R)-bundles. Next we relate these distinguished small exotic smooth R4's to twisted generalized geometries of Hitchin on TS3 TS3 and abelian gerbes on S3. In particular the change of the smoothness on R4 corresponds to the twisting of the generalized geometry by the abelian gerbe. We formulate the localization principle for exotic 4-regions in spacetime and show that the existence of these domains causes the quantization of electric charge, the effect usually ascribed to the existence of magnetic monopoles.