Associative Submanifolds of Squashed 3-Sasakian Manifolds

Abstract

Every compact 3-Sasakian 7-manifold M admits a canonical 2-parameter family of co-closed G2-structures a,b for a,b > 0, as well as a foliation by a,b-associative 3-folds whose leaf space X is a positive quaternion-K\"ahler 4-orbifold. We prove that associative 3-folds in (M,a,b) that are ruled by a certain type of geodesic are in correspondence with pseudo-holomorphic curves in the almost-complex 8-manifold Z × S2, where Z is the twistor space of X equipped with its strict nearly-K\"ahler structure. As an application, we construct infinitely many topological types of non-trivial, compact associative 3-folds in the squashed 7-spheres (S7, a,b) and squashed exceptional Aloff-Wallach spaces (N1,1, a,b). Topologically, our examples are circle bundles over a genus g surface, for any g ≥ 0.