Reflecting Diffusion Process on Time-Inhomogeneous Manifolds with Boundary

Abstract

Let Lt:=t+Zt for a C1,1-vector field Z on a differential manifold M with boundary ∂ M, where t is the Laplacian induced by a time dependent metric gt differentiable in t∈ [0,Tc). We first introduce the reflecting diffusion process generated by Lt and establish the derivative formula for the associated diffusion semigroup; then construct the couplings for the reflecting Lt-diffusion processes by parallel and reflecting displacement, which implies the gradient estimates of the associated heat semigroup; and finally, present a number of equivalent inequalities for the curvature lower bound and the convexity of the boundary, including the gradient estimations, Harnack inequalities, transportation-cost inequalities and other functional inequalities for diffusion semigroup.