Sub-Riemannian and sub-Lorentzian geometry on (1,1) and on its universal cover

Abstract

We study sub-Riemannian and sub-Lorentzian geometry on the Lie group (1,1) and on its universal cover (1,1). In the sub-Riemannian case we find the distance function and completely describe sub-Riemannian geodesics on both (1,1) and (1,1), connecting two fixed points. In particular, we prove that there is a strong connection between the conjugate loci and the number of geodesics. In the sub-Lorentzian case, we describe the geodesics connecting two points on (1,1), and compare them with Lorentzian ones. It turns out that the reachable sets for Lorentzian and sub-Lorentzian normal geodesics intersect but are not included one to the other. A description of the timelike future is obtained and compared in the Lorentzian and sub-Lorentzain cases.