Gradient estimation of a generalized non-linear heat type equation along Super-Perelman Ricci flow on weighted Riemannian manifolds
Abstract
In this article we derive gradient estimation for positive solution of the equation equation* (∂t-f)u = A(u)p(x,t) + B(u)q(x,t) + G(u) equation* on a weighted Riemannian manifold evolving along the (k,m) super Perelman-Ricci flow equation* ∂ g∂ t(x,t)+2Ricfm(g)(x,t) -2kg(x,t). equation* As an application of gradient estimation we derive a Harnack type inequality along with a Liouville type theorem.
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