On convergence of intrinsic volumes of Riemannian manifolds

Abstract

In 1939 H. Weyl has introduced the so called intrinsic volumes Vi(Mn), i=0,…,n, (known also as Lipschitz-Killing curvatures) for any closed smooth Riemannian manifold Mn. Given a Riemmanian submersion of compact smooth Riemannian manifolds M B, B is connected. For >0 let us define a new Riemannian metric on M by multiplying the original one by along the vertical directions and keeping it the same along the (orthogonal) horizontal directions. Denote the corresponding Riemannian manifold by M. The main result says that +0 Vi(M)=(Z) Vi(B), where (Z) is the Euler characteristic of a fiber of the submersion. This result is consistent with more general open conjectures on convergence of intrinsic volumes formulated previously by the author.