Yau Type Gradient Estimates For u + au( u)p+bu=0 On Riemannian Manifolds

Abstract

In this paper, we consider the gradient estimates of the positive solutions to the following equation defined on a complete Riemannian manifold (M, g) u + au( u)p+bu=0, where a, b∈ R and p is a rational number with p=k12k2+1≥2 where k1 and k2 are positive integer numbers. we obtain the gradient bound of a positive solution to the equation which does not depend on the bounds of the solution and the Laplacian of the distance function on (M, g). Our results can be viewed as a natural extension of Yau's estimates on positive harmonic function.