Causality and Legendrian linking for higher dimensional spacetimes

Abstract

Let (Xm+1, g) be an (m+1)-dimensional globally hyperbolic spacetime with Cauchy surface Mm, and let Mm be the universal cover of the Cauchy surface. Let NX be the contact manifold of all future directed unparameterized light rays in X that we identify with the spherical cotangent bundle ST*M. Jointly with Stefan Nemirovski we showed when Mm is not\/ a compact manifold, then two points x, y∈ X are causally related if and only if the Legendrian spheres Sx, Sy of all light rays through x and y are linked in NX. In this short note we use the contact Bott-Samelson theorem of Frauenfelder, Labrousse and Schlenk to show that the same statement is true for all X for which the integral cohomology ring of a closed M is not the one of the CROSS (compact rank one symmetric space). If M admits a Riemann metric g, a point x and a number >0 such that all unit speed geodesics starting from x return back to x in time , then (M, g) is called a Yx manifold. Jointly with Stefan Nemirovski we observed that causality in (M× R, g -t2) is not equivalent to Legendrian linking. Every Yx-Riemann manifold has compact universal cover and its integral cohomology ring is the one of a CROSS. So we conjecture that Legendrian linking is equivalent to causality if and only if one can not put a Yx Riemann metric on a Cauchy surface M.