Diffusion semigroup on manifolds with time-dependent metrics

Abstract

Let Lt:=t +Zt , t∈ [0,Tc) on a differential manifold equipped with time-depending complete Riemannian metric (gt)t∈ [0,Tc), where t is the Laplacian induced by gt and (Zt)t∈ [0,Tc) is a family of C1,1-vector fields. We first present some explicit criteria for the non-explosion of the diffusion processes generated by Lt; then establish the derivative formula for the associated semigroup; and finally, present a number of equivalent semigroup inequalities for the curvature lower bound condition, which include the gradient inequalities, transportation-cost inequalities, Harnack inequalities and functional inequalities for the diffusion semigroup.