具有指数临界增长的 $${mathbb {R}}^N$ 中 N 拉普拉斯方程的归一化解

Jingbo Dou, Ling Huang, Xuexiu Zhong
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引用次数: 0

摘要

在本文中,我们关注的是 W^{1、N}(\mathbb {R}^N)\times \mathbb {R}^+\) 下面的 N 拉普拉斯问题 $$\begin{aligned} -\{text {div}}(|\nabla u|^{N-2} \nabla u)+\lambda |u|^{N-2} u=f(u) \text{ in }\mathbb {R}^N,~N \ge 2, \end{aligned}$满足归一化约束条件\(\int _{mathbb {R}^N}|u^N\textrm{d}x=c^N\).非线性 f(s) 是一个指数临界增长函数,即在某个 \(α >0\)条件下表现为 \(\exp (\α |s|^{N /(N-1)})\) as \(|s| \rightarrow \infty \)。在一些温和的条件下,我们通过变分法证明了归一化山口类型解的存在。我们还强调归一化基态解在一些进一步假设下具有山口特征。本文的存在性结果还解决了一个指数临界增长的非线性问题 Soave's type open problem (J Funct Anal 279(6):108610, 2020)。
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Normalized Solutions to N-Laplacian Equations in $${\mathbb {R}}^N$$ with Exponential Critical Growth

In this paper, we are concerned with normalized solutions \((u,\lambda )\in W^{1,N}(\mathbb {R}^N)\times \mathbb {R}^+\) to the following N-Laplacian problem

$$\begin{aligned} -{\text {div}}(|\nabla u|^{N-2} \nabla u)+\lambda |u|^{N-2} u=f(u) \text{ in } \mathbb {R}^N,~N \ge 2, \end{aligned}$$

satisfying the normalization constraint \(\int _{\mathbb {R}^N}|u|^N\textrm{d}x=c^N\). The nonlinearity f(s) is an exponential critical growth function, i.e., behaves like \(\exp (\alpha |s|^{N /(N-1)})\) for some \(\alpha >0\) as \(|s| \rightarrow \infty \). Under some mild conditions, we show the existence of normalized mountain pass type solution via the variational method. We also emphasize the normalized ground state solution has a mountain pass characterization under some further assumption. Our existence results in present paper also solve a Soave’s type open problem (J Funct Anal 279(6):108610, 2020) on the nonlinearities having an exponential critical growth.

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