Feasibility of Nash-Moser iteration for Cheng-Yau-type gradient estimates of nonlinear equations on complete Riemannian manifolds
Abstract
In this manuscript, we employ the Nash-Moser iteration technique to determine a condition under which the positive solution u of the generalized nonlinear Poisson equation div ((|∇ u|2)∇ u) + (u2)u = 0, on a complete Riemannian manifold with Ricci curvature bounded from below can be shown to satisfy a Cheng-Yau-type gradient estimate. We define a class of -Laplacian operators by (u):=div ((|∇ u|2)∇ u), where is a C2 function under some certain growth conditions. This can be regarded as a natural generalization of the p-Laplacian, the (p,q)-Laplacian and the exponential Laplacian, as well as having a close connection to the prescribed mean curvature problem. We illustrate the feasibility of applying the Nash-Moser iteration for such Poisson equation to get the Cheng-Yau-type gradient estimates in different cases with various and . Utilizing these estimates, we proves the related Harnack inequalities and a series of Liouville theorems. Our results can cover a wide range of quasilinear Laplace operator (e.g. p-Laplacian for (t)=tp/2-1), and Lichnerowicz-type nonlinear equations (i.e. (t) = Atp + Btq + Ct t + D).
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