Daniel Azagra, Juan Ferrera, Beatriz Sanz
Published 2006-12-23, updated 2008-03-13Version 3
We prove comparison, uniqueness and existence results for viscosity solutions to a wide class of fully nonlinear second order partial differential equations $F(x, u, du, d^{2}u)=0$ defined on a finite-dimensional Riemannian manifold $M$. Finest results (with hypothesis that require the function $F$ to be degenerate elliptic, that is nonincreasing in the second order derivative variable, and uniformly continuous with respect to the variable $x$) are obtained under the assumption that $M$ has nonnegative sectional curvature, while, if one additionally requires $F$ to depend on $d^{2}u$ in a uniformly continuous manner, then comparison results are established with no restrictive assumptions on curvature.
Comments: Final version: the domain of F in the equation F=0 has been changed in order to get more generality and simplicity in the definitions and assumptions, and several important misprints have been corrected
Dirichlet Duality and the Nonlinear Dirichlet Problem on Riemannian Manifolds
Dirichlet problem of nonlinear second order partial differential equations resolved with any derivatives
user's guide to viscosity solutions of second order partial differential equations
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