Closed flat affine 3-manifolds are prime

Abstract

An (flat) affine 3-manifold is a 3-manifold with an atlas of charts to an affine space R3 with transition maps in the affine transformation group Aff( R3). Equivalently an affine 3-manifold is a 3-manifold with a flat torsion-free affine connection. We show that a closed affine 3-manifold is either irreducible or is finitely covered by an affine Hopf manifold. A real projective 3-manifold is a manifold with an atlas of charts to a real projective space R P3 with transition maps in the projective transformation group PGL(4, R). Using the convex concave decomposition of real projective manifolds, we will show that a closed real projective 3-manifold decomposes into concave affine submanifolds, toral π-submanifolds and 2-convex real projective manifolds.