Spherical T-Duality and the spherical Fourier-Mukai transform

Abstract

In earlier papers, we introduced spherical T-duality, which relates pairs of the form (P,H) consisting of an oriented S3-bundle P→ M and a 7-cocycle H on P called the 7-flux. Intuitively, the spherical T-dual is another such pair ( P, H) and spherical T-duality exchanges the 7-flux with the Euler class, upon fixing the Pontryagin class and the second Stiefel-Whitney class. Unless dim(M)≤ 4, not all pairs admit spherical T-duals and the spherical T-duals are not always unique. In this paper, we define a canonical Poincar\'e virtual line bundle P on S3 × S3 (actually also for Sn× Sn) and the spherical Fourier-Mukai transform, which implements a degree shifting isomorphism in K-theory on the trivial S3-bundle. This is then used to prove that all spherical T-dualities induce natural degree-shifting isomorphisms between the 7-twisted K-theories of the pairs (P,H) and ( P, H) when dim(M)≤ 4, improving our earlier results.