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Abstract

This paper is devoted to some Lipschitz estimates between sub- and super-solutions of Fully Nonlinear equations on the model of the anisotropic $\vec{p}$ -Laplacian. In particular we derive from the results enclosed that the continuous viscosity solutions for the equation $\sum_{1}^{N} \partial_{i} (\partial_{i} u |^{p_{i} - 2} \partial_{i} u) = f$ are Lipschitz continuous when ${sup}_{i} p_{i} < {inf}_{i} p_{i} + 1$ , where $\vec{p} = \sum_{i} p_{i} e_{i}$ .

Keywords

Degenerate fully Nonlinear equations viscosity solutions regularity

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Regularity properties of viscosity solutions for fully nonlinear equations on the model of the anisotropic p → -Laplacian

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