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Normalized solutions for Kirchhoff type equations with combined nonlinearities: The Sobolev critical case

Xiaojing Feng, Haidong Liu, Zhitao Zhang

2023Discrete and Continuous Dynamical Systems22 citationsDOIOpen Access PDF

Abstract

In this paper, we study the Kirchhoff equation with Sobolev critical exponent \begin{document}$ -\left(a+b\int_{ {\mathbb{R}}^3}|\nabla u|^2\right)\Delta u = \lambda u+\mu|u|^{q-2}u+|u|^{4}u\ \ {\rm in}\ {\mathbb{R}}^3 $\end{document} under the normalized constraint$ \int_{ {\mathbb{R}}^3}u^2 = c^2, $where \begin{document}$ a, \, b, \, c>0 $\end{document} are constants, \begin{document}$ \lambda, \, \mu\in{\mathbb{R}} $\end{document} and \begin{document}$ 2<q<6 $\end{document}. The number \begin{document}$ 2+8/3 $\end{document} behaves as the \begin{document}$ L^2 $\end{document}-critical exponent for the above problem. When \begin{document}$ \mu>0 $\end{document}, we distinguish the problem into four cases: \begin{document}$ 2<q<2+4/3 $\end{document}, \begin{document}$ q = 2+4/3 $\end{document}, \begin{document}$ 2+4/3<q<2+8/3 $\end{document} and \begin{document}$ 2+8/3\leq q<6 $\end{document}, and prove the existence and multiplicity of normalized solutions under suitable assumptions on \begin{document}$ \mu $\end{document} and \begin{document}$ c $\end{document}. The solution obtained is either a minimum (local or global) or a mountain pass solution. When \begin{document}$ \mu\leq 0 $\end{document}, we establish the nonexistence of nonnegative normalized solutions. Finally, we investigate the asymptotic behavior of normalized solutions obtained above as \begin{document}$ \mu\to0^+ $\end{document} and as \begin{document}$ b\to0^+ $\end{document} respectively.

Topics & Concepts

PhysicsNabla symbolCombinatoricsSobolev spaceExponentMathematical analysisMathematicsOmegaQuantum mechanicsPhilosophyLinguisticsAdvanced Mathematical Physics ProblemsNonlinear Partial Differential EquationsStability and Controllability of Differential Equations