The ideal-valued index of fibrations with total space a G2 flag manifold

Abstract

Using the cohomology of the G2-flag manifolds G2/U(2), and their structure as a fiber bundle over the homogeneous space G2/SO(4), we compute the Z2 Fadell-Husseini index of such fiber bundles, for the Z2 action given by complex conjugation. Also, considering the tautological bundle γ over G4(R7), we compute the Z2 Fadell-Husseini index of the pullback bundle of sγ along the composition of the fiber bundle G2/U(2) G2/SO(4), the embedding between G2/SO(4) and G3(R7), and the map that takes the orthogonal complement of a subspace. Here sγ means the associated sphere bundle of γ. Furthermore, we derive a general formula for the n-fold product bundle sγn for which we make the same computations. We finish our work with an application of our computations in a problem concerning discrete geometry.