# A note on Liouville type results for a fractional obstacle problem

**Authors:** J\'er\^ome Coville (BIOSP)

arXiv: 1903.00341 · 2019-03-04

## TL;DR

This paper discusses Liouville-type results for solutions to nonlocal reaction-diffusion equations with convex obstacles, extending previous results to the regional fractional Laplacian operator.

## Contribution

It extends Liouville-type results to the regional fractional Laplacian for convex obstacles, building on prior work with convolution-type operators.

## Key findings

- Liouville-type results hold for the regional fractional Laplacian.
- Results apply to bounded smooth convex obstacles.
- Extends previous results to a new class of nonlocal operators.

## Abstract

This note is a synthesis of my reflexions on some questions that have emerged during the MATRIX event "Recent Trends on Nonlinear PDEs of Elliptic and Parabolic Type" concerning the qualitative properties of solutions to some non local reaction-diffusion equations of the form L[u](x) + f (u(x)) = 0, for x $\in$ R n \ K, where K $\subset$ R N is a bounded smooth compact "obstacle", L is non local operator and f is a bistable nonlinearity. When K is convex and the nonlocal operator L is a continuous operator of convolution type then some Liouville-type results for solutions satisfying some asymptotic limiting conditions at infinity have been recently established by Brasseur, Coville, Hamel and Valdinoci [4]. Here, we show that for a bounded smooth convex obstacle K, similar Liouville type results hold true when the operator L is the regional s-fractional Laplacian.

## Full text

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## Figures

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## References

10 references — full list in the complete paper: https://tomesphere.com/paper/1903.00341/full.md

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Source: https://tomesphere.com/paper/1903.00341