Timelike Ricci curvature lower bounds via optimal transport for Orlicz-type Lorentzian costs

Abstract

We study the optimal transport problem on globally hyperbolic spacetimes associated with Orlicz-type Lorentzian cost functions of the form u , where u is a suitable monotonically increasing and concave function, and is the time separation. Our work encompasses and generalises the case u(x) = up(x) = p-1xp for p ∈ (0,1), as well as the more recent p < 0, which have been the only examples considered so far in the literature. A fundamental notion for our purposes is the property of u-separation for a pair of measures, which generalises McCann's p-separation and for which we are able to obtain strong duality to the full Orlicz-type optimization problem. In our main results, we characterise timelike Ricci curvature lower bounds via the convexity of the relative entropy along geodesics arising from the Orlicz-type optimal transport with cost u , which is a far-reaching generalisation of McCann's seminal work in the case u = up, p ∈ (0,1).