Uniqueness, multiplicity and nondegeneracy of positive solutions to the Lane-Emden problem

IF 2.3 1区数学 Q1 MATHEMATICS Journal de Mathematiques Pures et Appliquees Pub Date : 2023-09-19 DOI:10.1016/j.matpur.2023.09.001

Houwang Li , Juncheng Wei , Wenming Zou

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引用次数: 1

Abstract

In this paper, we study the nearly critical Lane-Emden equations(⁎) ${\begin{matrix} - Δ u = u^{p - ε} & in Ω, \\ u > 0 & in Ω, \\ u = 0 & on \partial Ω, \end{matrix}$ where $Ω \subset R^{N}$ with $N \geq 3$ , $p = \frac{N + 2}{N - 2}$ and $ε > 0$ is small. Our main result is that when Ω is a smooth bounded convex domain and the Robin function on Ω is a Morse function, then for small ε the equation (⁎) has a unique solution, which is also nondegenerate. As for non-convex domain, we also obtain exact number of solutions to (⁎) under some conditions.

In general, the solutions of (⁎) may blow-up at multiple points $a_{1}, \dots, a_{k}$ of Ω as $ε \to 0$ . In particular, when Ω is convex, there must be a unique blow-up point (i.e., $k = 1$ ). In this paper, by using the local Pohozaev identities and blow-up techniques, even having multiple blow-up points (non-convex domain), we can prove that such blow-up solution is unique and nondegenerate. Combining these conclusions, we finally obtain the uniqueness, multiplicity and nondegeneracy of solutions to (⁎).

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Lane-Emden问题正解的唯一性、多重性和非一般性

在本文中，我们研究了近临界Lane-Emden方程（）｛-Δu=up-εinΩ，u>；0inΩ，u=0 on⏴Ω，其中Ω⊂RN的N≥3，p=N+2N−2和ε>；0很小。我们的主要结果是，当Ω是光滑有界凸域，Ω上的Robin函数是Morse函数时，对于小ε，方程（）有一个独特的解决方案，也是非退化的。对于非凸域，我们还得到了在某些条件下（i）解的精确个数。通常，（·）的解可能在Ω的多个点a1、…、ak处爆炸为ε→0。特别是，当Ω是凸的时，必须有一个唯一的爆破点（即k=1）。本文利用局部Pohozaev恒等式和爆破技术，即使具有多个爆破点（非凸域），我们也可以证明这种爆破解是唯一的和不退化的。结合这些结论，我们最终得到了（？）解的唯一性、多重性和非一般性。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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来源期刊

Journal de Mathematiques Pures et Appliquees 数学-数学

CiteScore

4.30

自引率

0.00%

发文量

审稿时长

6 months

期刊介绍： Published from 1836 by the leading French mathematicians, the Journal des Mathématiques Pures et Appliquées is the second oldest international mathematical journal in the world. It was founded by Joseph Liouville and published continuously by leading French Mathematicians - among the latest: Jean Leray, Jacques-Louis Lions, Paul Malliavin and presently Pierre-Louis Lions.