Partially hyperbolic flows on flat vector bundles with an application to complete affine manifolds

Abstract

Let N be a manifold of dimension m with a flat vector bundle given by a representation :π1(N) → GL(n, R) where π1(N) is finitely generated. The holonomy group is a k-partially hyperbolic holonomy representation if the flat bundle pulled back over the unit tangent bundle of a sufficiently large compact submanifold of N splits into expanding, neutral, and contracting subbundles along the geodesic flow, where the expanding and contracting subbundles are k-dimensional with k < n/2. Suppose that each element of (π1(N)) has an eigenvalue of norm 1, or, alternatively, has some singular values of subexponential growth in terms of word length. We show that is a P-Anosov representation for a parabolic subgroup P of GL(n, R) if and only if is a partially hyperbolic representation. We are going to primarily employ representation theory techniques. As an application, we will show that the equivalence holds when N is a complete affine n-manifold, and is a linear part of the holonomy representation. This had never been done over the full general linear group.