Normalized solutions for coupled Kirchhoff equations with critical and subcritical nonlinearities

Qilin Xie; Lin Xu

doi:10.56754/0719-0646.2801.053

DOI:

https://doi.org/10.56754/0719-0646.2801.053

Abstract

In this paper, we study Kirchhoff equations with constraint conditions
\begin{equation}\tag{P}\label{00001}
\left\{
\begin{aligned}
-\bigg(&a+b \int_{\mathbb{R}^{3}}|\nabla u_{1}|^{2} \, d x\bigg)\,\Delta u_{1}
= \lambda_{1} u_{1}\\
&+\mu_{1}|u_{1}|^{p_{1}-2} u_{1}
+\beta r_{1}|u_{1}|^{r_{1}-2} u_{1}|u_{2}|^{r_{2}}
\quad \text{in } \mathbb{R}^{3}, \\
-\bigg(&a+b \int_{\mathbb{R}^{3}}|\nabla u_{2}|^{2} \, d x\bigg)\, \Delta u_{2}
= \lambda_{2} u_{2}\\
&+\mu_{2}|u_{2}|^{p_{2}-2} u_{2} +\beta r_{2}|u_{1}|^{r_{1}}|u_{2}|^{r_{2}-2} u_{2}
\quad \text{in } \mathbb{R}^{3}, \\
\int_{\mathbb{R}^{3}} &|u_{1}|^{2}\,dx=c_{1},\quad
\int_{\mathbb{R}^{3}} |u_{2}|^{2}\,dx=c_{2}, \\
u&_{1} \in H^{1}\left(\mathbb{R}^{3}\right),\quad
u_{2} \in H^{1}\left(\mathbb{R}^{3}\right).
\end{aligned}
\right.
\end{equation}
where \(a\), \(b\), \(\beta\), \(\mu_{i}\), \(c_{i}>0\), \(r_{i}>1\), \(2<p_{i}<\frac{14}{3}<r:=r_{1}+r_{2}\leq2^{*}\) for \(i=1\), \(2\), and \(\lambda_{1}\), \(\lambda_{2}\in \mathbb{R}\) appear as Lagrange multipliers. The existence of normalized solutions for \(p_1\) and \( p_2\) within a specific range of \((2, \frac{14}{3})\) has been considered both the Sobolev subcritical case (\(r < 2^{*}\)) and the critical case (\(r = 2^{*}\)) by the Minimax principle and variational methods. This paper provides a refinement and extension of the results for the normalized solutions to Kirchhoff equations.

Keywords

Normalized solution , Kirchhoff equation , variational methods

Mathematics Subject Classification:

35J60 , 47J30 , 35J20

Qilin Xie School of Mathematics and Statistics, Guangdong University of Technology, Guangzhou 510520, Guangdong, People’s Republic of China. https://orcid.org/0000-0002-6569-5005
Lin Xu School of Mathematics and Statistics, Southwest University, Chongqing 400715, People’s Republic of China. https://orcid.org/0009-0005-0811-0567

Pages: 53–78
Date Published: 2026-01-22
Vol. 28 No. 1 (2026)

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