On the existence of global cross sections to volume-preserving flows

Abstract

We establish a new criterion for the existence of a global cross section to a non-singular volume-preserving flow on a closed smooth manifold M. Namely, if X is the infinitesimal generator of the flow and preserves a smooth volume form , then admits a global cross section if there exists a smooth Riemannian metric g on M with Riemannian volume and g(X,X) = 1 such that δg (iX ) g < 1, where δg denotes the codifferential relative to g; (equivalently, dX g < 1). In that case, there in fact exists another smooth Riemannian metric on M with respect to which the canonical form iX is co-closed and therefore harmonic.