Gradient estimates for a weighted parabolic equation under geometric flow

Abstract

Let (Mn,g,e-φdv) be a weighted Riemannian manifold evolving by geometric flow ∂ g∂ t=2h(t),\,\,\,∂ φ∂ t= φ. In this paper, we obtain a series of space-time gradient estimates for positive solutions of a parabolic partial equation (φ-∂t)u(x,t)=q(x,t)ua+1(x,t)+p(x,t)A(u(x,t))),\,\,\,\,(x,t)∈ M×[0,T] on a weighted Riemannian manifold under geometric flow. By integrating the gradient estimates, we find the corresponding Harnack inequalities.