Shrinking the Fibers of a Submersion Splits the Riemann Tensor

Abstract

This paper uses Karcher's formulation [Kar99] of the O'Neill tensors [O'N66,Gra67] to derive a concise formula for the family ε of curvature forms obtained by shrinking the fibers of a submersion π:M B of semi-Riemannian manifolds by a factor of 1-ε. The formula clearly shows that as ε approaches 1, ε approaches the sum of the vertical curvature form V and the pullback π*B of the curvature form of B. The Gauss-Bonnet integrand Pf(ε) therefore approaches the wedge Pf(V)π*Pf(B). So if π has compact fiber F, the pushforward π*Pf(ε) approaches (F)·Pf(B).