English

Affinely Connected Spaces, Geodesic Loops, $G_2$-Structures and Deformations

Differential Geometry 2021-11-22 v1 Mathematical Physics math.MP

Abstract

We investigate octonion product deformations coming from the parallelizable torsion of the 7-sphere S7S^7, obtaining a family of geometries from solutions of the Lagrangian formalism movement equations. This can be achieved by analyzing the spontaneous compactification M4×S7M_4\times S^7, where M4M_4 is a Lorentzian 44-dimensional manifold. Besides the usual Riemannian geometry and two others proposed by Cartan and Schouten, solutions in geometries with torsion and more general seven-dimensional spaces are obtained. Such formalism may by subsequently derived over the 7-sphere S7S^7, locally given by the structure constants of a nonassociative geodesic loop. Furthermore, G2G_2-structures are investigated, giving rise to the octonion product and bundle OM\mathbb{O} M over a seven-dimensional manifold MM. Then, sections of this bundle over such space can be perceived as spinor fields in an isometric identification mapping the spin connection to an octonion covariant derivative preserving the octonion product defined over OM\mathbb{O} M.

Keywords

Cite

@article{arxiv.2111.10209,
  title  = {Affinely Connected Spaces, Geodesic Loops, $G_2$-Structures and Deformations},
  author = {Aquerman Yanes},
  journal= {arXiv preprint arXiv:2111.10209},
  year   = {2021}
}

Comments

Defended Master thesis, 149 pp., also contains parts of our original work 1803.08282 [hep-th]

R2 v1 2026-06-24T07:44:50.917Z