Fubini Theorem for pseudo-Riemannian metrics

Abstract

We generalize the following classical result of Fubini for pseudo-Riemannian metrics: if three essentially different metrics on Mn 3 share the same unparametrized geodesics, and two of them (say, g and g) are strictly nonproportional (i.e., the minimal polynomial of giα gα j coincides with the characteristic polynomial) at least at one point, then they have constant curvature.