Integral formulas for a foliated sub-Riemannian manifold

Abstract

In this article, we deduce a series of integral formulas for a foliated sub-Riemannian manifold, which is a new geometric concept denoting a Riemannian manifold equipped with a distribution D and a foliation F, whose tangent bundle is a subbundle of D. Our integral formulas generalize some results for foliated Riemannian manifolds and involve the shape operators of F with respect to normals in D and the curvature tensor of induced connection on D. The formulas also include arbitrary functions fj\ (0 j< F) depending on scalar invariants of the shape operators, and for a special choice of fj reduce to integral formulas with the Newton transformations of the shape operators. We apply our formulas to foliated sub-Riemannian manifolds with restrictions on the curvature and extrinsic geometry of F and to codimension-one foliations.