On the Geometry of Conullity Two Manifolds

Abstract

If is the nullity space of the curvature tensor of a Riemannian manifold Mn, it is well known that if its dimension is constant and if Mn is complete then the distribution is completely integrable with flat leaves. The case of = n-2 are the so called conullity two manifolds which naturally arise in various geometric contexts. The obstruction to the metric splitting isometrically is a 2x2 matrix which is either nilpotent or invertible. We study the case where it is nilpotent, or equivalently where the scalar curvature is constant along the leaves of . When Mn is locally irreducible we show that Mn admits a Lipschitz foliation F by totally geodesic flat hyperplanes and determine the metric on a naturally defined open dense subset in terms of n-1 functions, uniquely determined up to isometry. We can also find examples of smooth complete metrics of conullity two where the foliation F is smooth only on the complement of a Cantor set. We furthermore show that the fundamental group is either trivial or infinite cyclic.