A characterization of the ellipsoid in terms of pairs of sections associated by a harmonic homology

Abstract

Let K be a convex body in an affine chart of the n dimensional real Projective space RPn, n ≥ 3, let H be a hyperplane which is not a support hyperplane of K and let p1,p2 ∈ RPn H be two distinct interior points of K. In this work we prove that if for every (n-2)-plane l ⊂ H, there exists a harmonic homology, with plane G and center τ, such that l⊂ G, τ ∈ H and which maps the hypersection of K defined by aff\p1, l\ onto the hypersection of K defined by aff\p2, l\, then K is an ellipsoid.