On Embedded Spheres of Affine Manifolds

Abstract

This paper studies certain embedded spheres in closed affine manifolds. For n ≥ 3, we investigate the dome bodies in a closed affine n-manifold M with its boundary homeomorphic to a sphere under the assumption that a developing map restricted to a component of ∂M is an embedding onto a strictly convex sphere in An. By using the recurrent property of an incomplete geodesic we show that dome bodies are compact. Then a maximal dome body is a closed solid ball bounded by a component of ∂M, and hence equals M. The main theorem is that the standard ball in an affine space can only bound one compact affine manifold inside, namely the solid ball.