# Maximal solutions for the Infinity-eigenvalue problem

**Authors:** Joao V. da Silva, Julio D. Rossi, Ariel M. Salort

arXiv: 1704.01875 · 2017-04-07

## TL;DR

This paper proves the existence and uniqueness of a maximal solution for the infinity-Laplacian eigenvalue problem, showing it as a limit of concave problems similar to the p-Laplacian eigenvalue case.

## Contribution

It establishes the maximal eigenfunction's uniqueness and its derivation as a limit of concave problems, extending the understanding of infinity-Laplacian eigenvalues.

## Key findings

- Unique maximal eigenfunction exists for the infinity-Laplacian.
- Maximal eigenfunction is obtained as a limit of concave problems.
- The approach parallels the p-Laplacian eigenvalue problem for 1<p<∞.

## Abstract

In this article we prove that the first eigenvalue of the $\infty-$Laplacian $$ \left\{ \begin{array}{rclcl}   \min\{ -\Delta_\infty v,\, |\nabla v|-\lambda_{1, \infty}(\Omega) v \} & = & 0 & \text{in} & \Omega v & = & 0 & \text{on} & \partial \Omega, \end{array} \right. $$ has a unique (up to scalar multiplication) maximal solution. This maximal solution can be obtained as the limit as $\ell \nearrow 1$ of concave problems of the form $$ \left\{ \begin{array}{rclcl}   \min\{ -\Delta_\infty v_{\ell},\, |\nabla v_{\ell}|-\lambda_{1, \infty}(\Omega) v_{\ell}^{\ell} \} & = & 0 & \text{in} & \Omega v_{\ell} & = & 0 & \text{on} & \partial \Omega. \end{array} \right. $$ In this way we obtain that the maximal eigenfunction is the unique one that is the limit of the concave problems as happens for the usual eigenvalue problem for the $p-$Laplacian for a fixed $1<p<\infty$.

## Full text

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## References

26 references — full list in the complete paper: https://tomesphere.com/paper/1704.01875/full.md

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Source: https://tomesphere.com/paper/1704.01875