# Liouville-type theorems with finite Morse index for   \Delta_{\lambda}-Laplace operator

**Authors:** Belgacem Rahal

arXiv: 1701.04119 · 2017-01-17

## TL;DR

This paper establishes Liouville-type theorems for solutions of a degenerate elliptic PDE with finite Morse index, showing nonexistence of certain stable solutions under specific conditions.

## Contribution

It introduces new Liouville-type theorems for the bla_{\u03bb}-Laplace operator, extending stability analysis to solutions possibly unbounded and sign-changing.

## Key findings

- Proves nonexistence of stable solutions under certain conditions.
- Derives integral estimates using stability properties.
- Uses Pohozaev identity to extend results to solutions stable outside compact sets.

## Abstract

In this paper we study solutions, possibly unbounded and sign-changing, of the following problem:   -\D_{\lambda} u=|x|_{\lambda}^a |u|^{p-1}u, in R^n,\;n\geq 1,\; p>1, and a \geq 0, where \D_{\lambda} is a strongly degenerate elliptic operator, the functions \lambda=(\lambda_1, ..., \lambda_k) : R^n \rightarrow R^k, satisfies some certain conditions, and |.|_{\lambda} the homogeneous norm associated to the \D_{\lambda}-Laplacian.   We prove various Liouville-type theorems for smooth solutions under the assumption that they are stable or stable outside a compact set of R^n. First, we establish the standard integralestimates via stability property to derive the nonexistence results for stable solutions. Next, by mean of the Pohozaev identity, we deduce the Liouville-type theorem for solutions stable outside a compact set.

## Full text

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## References

24 references — full list in the complete paper: https://tomesphere.com/paper/1701.04119/full.md

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Source: https://tomesphere.com/paper/1701.04119