一类具有临界增长和对数扰动的非线性退化椭圆算子的 Dirichlet 问题

IF 2.1 2区数学 Q1 MATHEMATICS Calculus of Variations and Partial Differential Equations Pub Date : 2024-04-26 DOI:10.1007/s00526-024-02708-6

Hua Chen, Xin Liao, Ming Zhang

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引用次数: 0

摘要

本文研究了一类具有临界非线性和对数扰动的退化椭圆狄里夏特问题的弱解存在性，即 $$\begin{aligned}\Big \{begin{array}{l} -(\Delta _{x} u+(\alpha +1)^2|x|^{2 \alpha }.\Delta _{y} u)=u^{frac{Q+2}{Q-2}}+lambda u\log u^2,u=0~~ （text { on }\Partial \Omega , \end{array}\end{aligned}$(0.2) where $(x,y)\in \Omega \subset \mathbb {R}^N = \mathbb {R}^m \times \mathbb {R}^n$ with $m \ge 1$, $n\ge 0$, $\Omega \cap \{x=0\}\ne \emptyset $ is a bounded domain、参数 $\alpha \ge 0$ 和 $ Q=m+ n(\alpha +1)$ 表示 $\mathbb {R}^N$ 的 "同次元维度"。当 $\lambda =0$ 时，我们知道 [23] 问题（0.2）有一个 Pohožaev 型的不存在结果。那么对于 $\lambda \in \mathbb {R}\backslash \{0\}$，我们在一定条件下建立了非负基态弱解和非三维弱解的存在性。

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Dirichlet problem for a class of nonlinear degenerate elliptic operators with critical growth and logarithmic perturbation

In this paper, we investigate the existence of weak solutions for a class of degenerate elliptic Dirichlet problems with critical nonlinearity and a logarithmic perturbation, i.e.

$$\begin{aligned} \Big \{\begin{array}{l} -(\Delta _{x} u+(\alpha +1)^2|x|^{2 \alpha } \Delta _{y} u)=u^{\frac{Q+2}{Q-2}} + \lambda u\log u^2,\\ u=0~~ \text { on } \partial \Omega , \end{array} \end{aligned}$$(0.2)

where $(x,y)\in \Omega \subset \mathbb {R}^N = \mathbb {R}^m \times \mathbb {R}^n$ with $m \ge 1$, $n\ge 0$, $\Omega \cap \{x=0\}\ne \emptyset $ is a bounded domain, the parameter $\alpha \ge 0$ and $ Q=m+ n(\alpha +1)$ denotes the “homogeneous dimension” of $\mathbb {R}^N$. When $\lambda =0$, we know that from [23] the problem (0.2) has a Pohožaev-type non-existence result. Then for $\lambda \in \mathbb {R}\backslash \{0\}$, we establish the existences of non-negative ground state weak solutions and non-trivial weak solutions subject to certain conditions.

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来源期刊

Calculus of Variations and Partial Differential Equations 数学-数学

CiteScore

3.30

自引率

4.80%

发文量

224

审稿时长

6 months

期刊介绍： Calculus of variations and partial differential equations are classical, very active, closely related areas of mathematics, with important ramifications in differential geometry and mathematical physics. In the last four decades this subject has enjoyed a flourishing development worldwide, which is still continuing and extending to broader perspectives. This journal will attract and collect many of the important top-quality contributions to this field of research, and stress the interactions between analysts, geometers, and physicists. The field of Calculus of Variations and Partial Differential Equations is extensive; nonetheless, the journal will be open to all interesting new developments. Topics to be covered include: - Minimization problems for variational integrals, existence and regularity theory for minimizers and critical points, geometric measure theory - Variational methods for partial differential equations, optimal mass transportation, linear and nonlinear eigenvalue problems - Variational problems in differential and complex geometry - Variational methods in global analysis and topology - Dynamical systems, symplectic geometry, periodic solutions of Hamiltonian systems - Variational methods in mathematical physics, nonlinear elasticity, asymptotic variational problems, homogenization, capillarity phenomena, free boundary problems and phase transitions - Monge-Ampère equations and other fully nonlinear partial differential equations related to problems in differential geometry, complex geometry, and physics.