具有 L2 超临界增长的 p-Kirchhoff 方程的归一化解法

Pub Date : 2024-03-27 DOI:10.1007/s10255-024-1120-9

Zhi-min Ren, Yong-yi Lan

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引用次数: 0

摘要

在本文中，我们研究了以下 p-Kirchhoff 方程 $$\left\{ {\matrix{{(a + b\,\int_{\mathbb{R}^N}}{(|\nabla u{|^p} + |u{|^p})dx)\,( - {\Delta _p}u + |u{|^{p - 2}}u) = |u{|^{s - 2}}u + \mu u,\,x \ in {\mathbb{R}^N},}}h\fill \cr {\int_{\mathbb{R}^N}}{|u{|^2}dx = \rho ,}}h\fill \cr }}\right.$$ 其中 a > 0, b ≥ 0, ρ > 0 是常数, ${p^ * } = {{Np} \over {N - p}}$ 是临界索波列夫指数, μ 是拉格朗日乘数, $ - {\Delta _p}u = - {\rm{div}}(|\nabla u{|^{p - 2}}\nabla u)$, $2 <；p < N < 2p,\,\,\mu \in \mathbb{R}$ and$s \in (2{{N + 2} \over N}p - 2,\,\,\,{p^ * })$.我们利用山口阶梯和一些分析技术证明 p-Kirchhoff 方程有一个归一化解。

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Normalized Solution for p-Kirchhoff Equation with a L2-supercritical Growth

In this paper, we investigate the following p-Kirchhoff equation

$$\left\{ {\matrix{{(a + b\,\int_{{\mathbb{R}^N}} {(|\nabla u{|^p} + |u{|^p})dx)\,( - {\Delta _p}u + |u{|^{p - 2}}u) = |u{|^{s - 2}}u + \mu u,\,\,x \in {\mathbb{R}^N},} } \hfill \cr {\int_{{\mathbb{R}^N}} {|u{|^2}dx = \rho ,} } \hfill \cr } } \right.$$

where a > 0, b ≥ 0, ρ > 0 are constants, ${p^ * } = {{Np} \over {N - p}}$ is the critical Sobolev exponent, μ is a Lagrange multiplier, $ - {\Delta _p}u = - {\rm{div}}(|\nabla u{|^{p - 2}}\nabla u)$, $2 < p < N < 2p,\,\,\,\mu \in \mathbb{R}$ and $s \in (2{{N + 2} \over N}p - 2,\,\,\,{p^ * })$. We demonstrate that the p-Kirchhoff equation has a normalized solution using the mountain pass lemma and some analysis techniques.

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