The equivalence between timelike Ricci curvature and the timelike Brunn Minkowski inequality on synthetic Lorentzian spaces

Abstract

We introduce the strong q-timelike Brunn-Minkowski condition sTBMq(K,N) on synthetic Lorentzian spaces, for 0<q<1. We show that, in the timelike q-essentially non-branching setting, the q-timelike curvature dimension condition TCDq(K,N) is equivalent to TBMq(K,N+), and that the entropic q-timelike curvature dimension condition TCDqe(K,N) is equivalent to the reduced sTBM condition, sTBMq*(K,N). This extends, to a non-smooth setting, our earlier work in proving the equivalence between Ricci curvature and the Brunn-Minkowski inequality on C2 spacetimes.