Baraglia, David2015-12-100393-0440http://hdl.handle.net/1885/62076We show that the moduli space of deformations of a compact coassociative submanifold C has a natural local embedding as a submanifold of H2(C,R). We show that a G2-manifold with a T4-action of isometries such that the orbits are coassociative tori is locally equivalent to a minimal 3-manifold in R3,3 with positive induced metric where R3,3~=H2(T4,R). By studying minimal surfaces in quadrics we show how to construct minimal 3-manifold cones in R3,3 and hence G2-metrics from a real form of the affine Toda equations. The relations to semi-flat special Lagrangian fibrations and the Monge-Ampère equation are explained.Keywords: Coassociative submanifolds; G2-manifolds; Torus fibrationsModuli of coassociative submanifolds and semi-flat G2-manifolds201010.1016/j.geomphys.2010.07.0062016-02-24