G2-structures as Octonion Algebras

Abstract

We define the category of G2-structures over a Riemannian 7-manifold M and present an isomorphism between this category and a full subcategory of the category of octonion algebras over the ring of smooth real-valued functions C∞(M) of the same manifold M. A classification of G2-structures in the same metric class is shown to agree with a parametrisation of octonion algebras with isometric norm. A short study of the local structure of octonion algebras over C∞(M) shows similarities to the theory of octonion algebras over R. Thus, many of the results on real octonion algebras, and in general octonion algebras over rings, can be applied to G2-structures viewed as octonion algebras, under the aforementioned isomorphism of categories.