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| Main Authors: | , |
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| Format: | Preprint |
| Published: |
2024
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| Subjects: | |
| Online Access: | https://arxiv.org/abs/2407.00775 |
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Table of Contents:
- We show that Lipschitz solutions $u$ of $\mathrm{div}\, G(\nabla u)=0$ in $B_1\subset\mathbb R^2$ are $C^1$, for strictly monotone vector fields $G\in C^0(\mathbb R^2;\mathbb R^2)$ satisfying a mild ellipticity condition. If $G=\nabla F$ for a strictly convex function $F$, and $0\leq λ(ξ)\leq Λ(ξ)$ are the two eigenvalues of $\nabla^2 F(ξ)$, our assumption is that the set $\lbraceλ=0\rbrace \cap \lbrace Λ=\infty\rbrace$, where ellipticity degenerates $both$ from below and from above, is finite. This extends results by De Silva and Savin (Duke Math. J. 151, No. 3, p.487-532, 2010), which assumed either that set empty, or the larger set $\lbrace λ=0\rbrace$ finite. Our main new input is to transfer estimates in $\lbrace λ> 0 \rbrace $ to estimates in $\lbrace Λ<\infty\rbrace$ by means of a conjugate equation. When $G$ is not a gradient, the ellipticity assumption needs to be interpreted in a specific way, and we highlight the nontrivial effect of the antisymmetric part of $\nabla G$.