Heat flow regularity, Bismut-Elworthy-Li's derivative formula, and pathwise couplings on Riemannian manifolds with Kato bounded Ricci curvature

Abstract

We prove that if the Ricci tensor Ric of a geodesically complete Riemannian manifold M, endowed with the Riemannian distance d and the Riemannian measure m, is bounded from below by a continuous function k M whose negative part k- satisfies, for every t>0, the exponential integrability condition equation* x∈ M E[e∫0t k-(brx)/2\,d r\,1\t < ζx\] < ∞, equation* then the lifetime ζx of Brownian motion bx on M starting in any x∈ M is a.s. infinite. This assumption on k holds if k- belongs to the Kato class of M. We also derive a Bismut-Elworthy-Li derivative formula for ∇ Ptf for every f∈ L∞(M) and t>0 along the heat flow (Pt)t≥ 0 with generator /2, yielding its L∞-Lip-regularization as a corollary. Moreover, given the stochastic completeness of M, but without any assumption on k except continuity, we prove the equivalence of lower boundedness of Ric by k to the existence, given any x,y∈ M, of a coupling (bx,by) of Brownian motions on M starting in (x,y) such that a.s., equation* d(btx,bty) ≤ e-∫st k(brx,bry)/2\,d r\,d(bsx,bsy) equation* holds for every s,t≥ 0 with s≤ t, involving the "average" k(u,v) := ∈fγ ∫01 k(γr)\,d r of k along geodesics from u to v. Our results generalize to weighted Riemannian manifolds, where the Ricci curvature is replaced by the corresponding Bakry-\'Emery Ricci tensor.