The space of all triples of projective lines of distinct intersections in RPn

Abstract

We study the space of all triples of projective lines in RPn such that any line in a triple intersects the two others at distinct points. We show that for n=2 and 3 these spaces are homotopically equivalent to the real complete flag variety Flag(Rn) for n=3 and 4, respectively, and we explicitly calculate the integral homology of the corresponding spaces. We prove that for arbitrary n, this space is homotopy equivalent to Flag(1,2,3,Rn+1), the variety of all partial flags of signature (0,1,2,3,n+1) in an (n+1)-dimensional vector space over R.