Anisotropic Finsler $N$-Laplacian Liouville equation in convex cones

TL;DR

This paper classifies all finite mass solutions to an anisotropic Finsler $N$-Laplacian Liouville equation within convex cones, extending previous results and introducing new inequalities like the radial Poincaré inequality.

Contribution

It provides a complete classification of solutions for the anisotropic Finsler $N$-Laplacian Liouville equation in convex cones, generalizing prior work and introducing key inequalities.

Findings

All solutions with finite mass are classified.

Extension of classification results to general convex cones.

Introduction of a radial Poincaré type inequality.

Abstract

We consider the anisotropic Finsler $N$-Laplacian Liouville equation \[-\Delta ^{H}_{N}u=e^u \qquad {\rm{in}}\,\, \mathcal{C},\] where $N\geq2$, $\mathcal{C}\subseteq\mathbb{R}^{N}$ is an open convex cone including $\mathbb{R}^{N}$, the half space $\mathbb{R}^{N}_{+}$ and $\frac{1}{2^{m}}$-space $\mathbb{R}^{N}_{2^{-m}}:=\{x\in\mathbb{R}^{N}\mid x_{1},\cdots,x_{m}>0\}$ ($m=1,\cdots,N$), and the anisotropic Finsler $N$-Laplacian $\Delta ^{H}_{N}$ is induced by a positively homogeneous function $H(x)$ of degree $1$. All solutions to the Finsler $N$-Laplacian Liouville equation with finite mass are completely classified. In particular, if $H(\xi)=|\xi|$, then the Finsler $N$-Laplacian $\Delta ^{H}_{N}$ reduces to the regular $N$-Laplacian $\Delta_N$. Our result is a counterpart in the limiting case $p=N$ of the classification results in \cite{CFR} for the critical anisotropic $p$-Laplacian equations with $1<p<N$ in convex cones, and also extends the classification results in \cite{CK,CL,CW,CL2,E} for Liouville equation in the whole space $\mathbb{R}^{N}$ to general convex cones. In our proof, besides exploiting the anisotropic isoperimetric inequality inside convex cones, we have also proved and applied the radial Poincar\'{e} type inequality (Lemma \ref{A1}), which are key ingredients in the proof and of their own importance and interests.