The normal growth exponent of a codimension-1 hypersurface of a negatively curved manifold

Abstract

Let X be a Hadamard manifold with pinched negative curvature -b2≤≤ -1. Suppose ⊂eq X is a totally geodesic, codimension-1 submanifold and consider the geodesic flow t on X generated by a unit normal vector field on . We say the normal growth exponent of in X is at most β if \[ t → ∞ d t ∞ eβ t < ∞, \] where d t ∞ is the supremum of the operator norm of d t over all points of . We show that if is bi-Lipschitz to hyperbolic n-space Hn and the normal growth exponent is at most 1, then X is bi-Lipschitz to Hn+1. As an application, we prove that if M is a closed, negatively curved (n+1)-manifold, and N⊂ M is a totally geodesic, codimension-1 submanifold that is bi-Lipschitz to a hyperbolic manifold and whose normal growth exponent is at most 1, then π1(M) is isomorphic to a lattice in Isom(Hn+1). Finally, we show that the assumption on the normal growth exponent is necessary in dimensions at least 4.