Complete affine manifolds with Anosov holonomy groups II: partially hyperbolic holonomy and cohomological dimensions

Abstract

Let N be a complete affine manifold An/ of dimension n where is an affine transformation group and K(, 1) is realized as a finite CW-complex. N has a partially hyperbolic holonomy group if the tangent bundle pulled over the unit tangent bundle over a sufficiently large compact part splits into expanding, neutral, and contracting subbundles along the geodesic flow. We show that if the holonomy group is partially hyperbolic of index k, k < n/2, then cd() ≤ n-k. Moreover, if a finitely-presented affine group acts on An properly discontinuously and freely with the k-Anosov linear group for k ≤ n/2, then cd() ≤ n-k. Also, there exists a compact collection of n-k-dimensional affine subspaces where acts on. The techniques here are mostly from coarse geometry.