Convergence of Lorentzian spaces and curvature bounds for generalized cones

Abstract

The goal of this article is twofold. We introduce a notion of convergence for Lorentzian pre-length spaces, -convergence, that extends previous convergence notions in this context. We show that timelike curvature and timelike curvature-dimension bounds are stable under (measured) -convergence. Then, we show that -convergence is well adapted for generalized Lorentzian cones: a sequence of generalized cones -Ii×fiXi converges in sense if the base Ii and the fiber Xi converge in GH sense and the functions fi converge uniformly. We use this to show sharp timelike curvature and timelike curvature-dimension bounds for such cones. Finally, we obtain a pre-compactness theorem for -convergence in the class of smooth generalized cones that have a uniform lower bound on the full Ricci (or Riemann) curvature tensor.