Cohomogeneity One Coassociative Submanifolds in the Bundle of Anti-self-dual 2-forms over the 4-sphere

Abstract

Coassociative submanifolds are 4-dimensional calibrated submanifolds in G2-manifolds. In this paper, we construct explicit examples of coassociative submanifolds in 2- S4, which is the complete G2-manifold constructed by Bryant and Salamon. Classifying the Lie groups which have 3- or 4-dimensional orbits, we show that the only homogeneous coassociative submanifold is the zero section of 2- S4 up to the automorphisms and construct many cohomogeneity one examples explicitly. In particular, we obtain examples of non-compact coassociative submanifolds with conical singularities and their desingularizations.