Gradient estimates for p-Laplacian equation with cubic polynomial nonlinearity on Riemannian manifolds

Abstract

This paper studies a class of p-Laplace equations with cubic polynomial nonlinearity \[ p v + (v-a1)(v-a2)(v-a3) = 0 \] on complete Riemannian manifolds M with lower Ricci curvature bounds, where a1 < a2 < a3 are real constants and p v = div(|∇ v|p-2∇ v) denotes the p-Laplace operator. Depending on whether the solution lies in the intervals (a1,a2), (a2,a3) or (a1,a3), we employ, respectively, a logarithmic transformation or a hyperbolic tangent transformation to convert the original equation to another one for further analysis. Through a detailed analysis of the lower-bound estimate for the linearized operator of the new equation, and by combining Saloff-Coste's Sobolev inequality with a Moser iteration, we establish Cheng-Yau type gradient estimates under an additional assumption on p. As applications, the Liouville theorem and a Harnack inequality are further proved.

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