# Nonexistence of solutions for Dirichlet problems with supercritical   growth in tubular domains

**Authors:** Riccardo Molle, Donato Passaseo

arXiv: 1905.08467 · 2019-05-22

## TL;DR

This paper proves the nonexistence of solutions for certain supercritical Dirichlet problems in tubular domains, especially when the domain's core is a contractible 1-dimensional manifold, highlighting sharp conditions for nonexistence.

## Contribution

It establishes new nonexistence results for supercritical growth problems in tubular domains, particularly for 1-dimensional contractible cores, extending understanding of solution behavior in these geometries.

## Key findings

- No nontrivial solutions for small tubular domains with 1D contractible core.
- Weaker nonexistence results for higher-dimensional or noncontractible cores.
- Results are sharp regarding assumptions on the core's dimension and the growth of the nonlinearity.

## Abstract

We deal with Dirichlet problems of the form $$ \Delta u+f(u)=0 \mbox{ in }\Omega,\qquad u=0\ \mbox{ on }\partial \Omega $$ where $\Omega$ is a bounded domain of $\mathbb{R}^n$, $n\ge 3$, and $f$ has supercritical growth from the viewpoint of Sobolev embedding. In particular, we consider the case where $\Omega$ is a tubular domain $T_\varepsilon(\Gamma_k)$ with thickness $\varepsilon>0$ and centre $\Gamma_k$, a $k$-dimensional, smooth, compact submanifold of $\mathbb{R}^n$. Our main result concerns the case where $k=1$ and $\Gamma_k$ is contractible in itself. In this case we prove that the problem does not have nontrivial solutions for $\varepsilon>0$ small enough. When $k\ge 2$ or $\Gamma_k$ is noncontractible in itself we obtain weaker nonexistence results. Some examples show that all these results are sharp for what concerns the assumptions on $k$ and $f$.

## Full text

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## References

23 references — full list in the complete paper: https://tomesphere.com/paper/1905.08467/full.md

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Source: https://tomesphere.com/paper/1905.08467