具有收缩自聚焦核心的半线性椭圆系统解的极限轮廓

IF 1.2 4区 数学 Q1 MATHEMATICS
Ke Jin, Ying Shi, Huafei Xie
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引用次数: 0

摘要

在本文中,我们考虑半线性椭圆方程系统 $$\left\{ {\matrix{{ -\Delta u + u = \alpha {Q_n}(x)|u{|^{\alpha - 2}}|v{|^\beta }u\、\,{\rm{in}}\,{\mathbb{R}^N},} \hfill \cr { - \Delta v + v = \beta Q(x)|u{|^\alpha }|v{|^{\beta - 2}}v\,\,{\rm{in}}\,{\mathbb{R}^N},} \hfill \cr }}\right.$$where \(N\geqslant 3,\,\,\alpha ,\,\beta > 1,\,\alpha + \beta < {2^ * },\,{2^ * })= {{2N}\over{N-2}})和 Qn 都是有界给定函数,当 n → ∞ 时,它们的自聚焦核心 {x∈ ℍNQn(x) > 0} 会收缩为具有有限个点的集合。受方和王[13]的研究启发,我们利用变分法研究了集中于有限多点集合中某一点的基态解的极限轮廓,并建立了上述方程系统的局部集中边界解。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
The limiting profile of solutions for semilinear elliptic systems with a shrinking self-focusing core

In this paper, we consider the semilinear elliptic equation systems

$$\left\{ {\matrix{{ - \Delta u + u = \alpha {Q_n}(x)|u{|^{\alpha - 2}}|v{|^\beta }u\,\,{\rm{in}}\,{\mathbb{R}^N},} \hfill \cr { - \Delta v + v = \beta Q(x)|u{|^\alpha }|v{|^{\beta - 2}}v\,\,\,\,{\rm{in}}\,{\mathbb{R}^N},} \hfill \cr } } \right.$$

where \(N\geqslant 3,\,\,\alpha ,\,\,\beta > 1,\,\alpha + \beta < {2^ * },\,{2^ * } = {{2N} \over {N - 2}}\) and Qn are bounded given functions whose self-focusing cores {x ∈ ℍNQn(x) > 0} shrink to a set with finitely many points as n → ∞. Motivated by the work of Fang and Wang [13], we use variational methods to study the limiting profile of ground state solutions which are concentrated at one point of the set with finitely many points, and we build the localized concentrated bound state solutions for the above equation systems.

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来源期刊
CiteScore
2.00
自引率
10.00%
发文量
2614
审稿时长
6 months
期刊介绍: Acta Mathematica Scientia was founded by Prof. Li Guoping (Lee Kwok Ping) in April 1981. The aim of Acta Mathematica Scientia is to present to the specialized readers important new achievements in the areas of mathematical sciences. The journal considers for publication of original research papers in all areas related to the frontier branches of mathematics with other science and technology.
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