RPn \# RPn and some others admit no real projective structure

Abstract

A manifold M possesses a real projective structure if it has an atlas consisting of charts mapping to Sn, where the transition maps lie in SL(n+1, R). In this context, we present a concise proof demonstrating that RPn\#RPn and a few other manifolds do not possess a real projective structure when n≥3. Notably, our proof is shorter than those provided by Cooper-Goldman for n=3 and Coban for n≥ 4. To do this, we reprove the classification of closed real projective manifolds with infinite-cyclic holonomy groups by Benoist due to a small error. We will leverage the concept of the octantizability of real projective manifolds with nilpotent holonomy groups, as introduced by Benoist and Smillie, which serves as a powerful tool.