Optimal transport, gradient estimates, and pathwise Brownian coupling on spaces with variable Ricci bounds

Abstract

Given a metric measure space (X,d,m) and a lower semicontinuous, lower bounded function k X, we prove the equivalence of the synthetic approaches to Ricci curvature at x∈ X being bounded from below by k(x) in terms of the Bakry-\'Emery estimate (f)/2 - (f, f) ≥ k\,(f) in an appropriate weak formulation, and the curvature-dimension condition CD(k,∞) in the sense Lott-Sturm-Villani with variable k. Moreover, for all p∈(1,∞), these properties hold if and only if the perturbed p-transport cost equation* Wpk(μ1,μ2,t):=∈f(b1,b2) E[e∫02t p k(b1r, b2r)/2\,d r dp\!(b12t,b22t )\!]1/p equation* is nonincreasing in t. The infimum here is taken over pairs of coupled Brownian motions b1 and b2 on X with given initial distributions μ1 and μ2, respectively, and k(x,y) := ∈fγ ∫01 k(γs)\,d s denotes the "average" of k along geodesics γ connecting x and y. Furthermore, for any pair of initial distributions μ1 and μ2 on X, we prove the existence of a pair of coupled Brownian motions b1 and b2 such that a.s. for every s,t∈[0,∞) with s≤ t, we have equation* d\!(bt1,bt2)≤ e-∫st k(br1,br2)/2\,d r d\!(bs1,bs2)\!. equation*