Adapted Metrics for Codimension one Singular Hyperbolic Flows

Abstract

For a partially hyperbolic splitting a C1 vector field X on a m-manifold M, we obtain singular hyperbolicity whether E is one-dimensional subspace, based on the idea of cross products. We show the existence of adapted metrics for singular hyperbolic set if it has a partially hyperbolic splitting TM = E F, where F is a volume expanding subbundle, E is an uniformly contracted and one-dimensional subbundle. Theses results extend previous ones from the first author and V. Ara\'ujo.