G2 geometry and integrable systems
Abstract
We study the Hitchin component in the space of representations of the fundamental group of a Riemann surface into a split real simple Lie group in the rank 2 case. We prove that such representations are described by a conformal structure and class of Higgs bundle we call cyclic and we show cyclic Higgs bundles correspond to a form of the affine Toda equations. In each case we relate cyclic Higgs bundles to geometric structures on the surface. We elucidate the geometry of generic 2-plane distributions in 5 dimensions, relating it to a parabolic geometry associated to the split real form of and a conformal geometry with holonomy in . We prove the distribution is the bundle of maximal isotropics corresponding to the annihilator of a spinor satisfying the twistor-spinor equation. We study the moduli space of coassociative submanifolds of a -manifold with an aim towards understanding coassociative fibrations. We consider coassociative fibrations where the fibres are orbits of a -action of isomorphisms and prove a local equivalence to minimal 3-manifolds in with positive induced metric.
Keywords
Cite
@article{arxiv.1002.1767,
title = {G2 geometry and integrable systems},
author = {David Baraglia},
journal= {arXiv preprint arXiv:1002.1767},
year = {2010}
}
Comments
Thesis 149 pages, minor corrections