On the rigidity of special and exceptional geometries with torsion a closed 3-form

Abstract

Under some suitable assumptions Riemannian manifolds (M, g, H) that admit a connection ∇ with torsion a 3-form H, which is both closed d H=0 and ∇-covariantly constant, are locally isometric to a product N× G, where G is a semisimple group and N is a Riemannian manifold with HN=0. If M is simply connected and complete, then by the de Rham theorem M=N× G globally. We use this to simplify the proof of similar results for strong CYT and HKT manifolds that obey the above hypotheses and extend them to strong G2 and Spin(7) manifolds with torsion. As an application, we describe the geometry of all complete and simply connected G2 and Spin(7) manifolds that satisfy the above conditions. Compact, strong, 8-dimensional HKT manifolds, which are not hyper-Kähler, admit an either 4 u(1) or a u(1) su(2) locally free action, otherwise, they are group manifolds. We find that if these Lie algebra actions can be integrated to an appropriate free action of T4 or S(U(1)× U(2)) Lie groups that preserves the span of three complex structures, then these HKT manifolds are either locally isometric and tri-holomorphic to R× S3× B4 or diffeomorphic to SU(3), where B4= R× S3, R4 or K3.