Decomposable (4,7) solutions in eleven-dimensional supergravity

Abstract

Consider an oriented four-dimensional Lorentzian manifold (M3, 1, g) and an oriented seven-dimensional Riemannian manifold (M7, g). We describe a class of decomposable eleven-dimensional supergravity backgrounds on the product manifold (M10, 1=M3,1 × M7, gM=g+g), endowed with a flux form given in terms of the volume form on M3, 1 and a closed 4-form F4 on M7. We show that the Maxwell equation for such a flux form can be read in terms of the co-closed 3-form φ=7F4. Moreover, the supergravity equation reduces to the condition that (M3,1,g) is an Einstein manifold with negative Einstein constant and (M7, g, F) is a Riemannian manifold which satisfies the Einstein equation with a stress-energy tensor associated to the 3-form φ. Whenever this 3-form is generic, the Maxwell equation induces a weak G2-structure on M7 and then we obtain decomposable supergravity backgrounds given by the product of a weak G2-manifold (M7, φ, g) with a Lorentzian Einstein manifold (M3,1,g). We classify homogeneous 7-manifolds M7=G/H of a compact Lie group G and indicate the cosets which admit an invariant or non-invariant G2-structure, or even no G2-structure. Then we construct examples of compact homogeneous Riemannian 7-manifolds endowed with non-generic invariant 3-forms which satisfy the Maxwell equation, but the construction of decomposable homogeneous supergravity backgrounds of this type remains an open problem.