在 $$\mathbb {R}^2$ 中具有指数临界增长的基尔霍夫型方程的多凸块解决方案

Zeitschrift für angewandte Mathematik und Physik Pub Date : 2024-06-27 DOI:10.1007/s00033-024-02282-z

Jian Zhang, Xinyi Zhang

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引用次数: 0

摘要

本文研究以下基尔霍夫方程的多凸块解： $$begin{aligned} -M\left( \,\,\int \limits _\{mathbb {R}^2}|\nabla u|^2 \textrm{d} x\right) \Delta u +\left( \mu V(x)+h(x)\right) u =\lambda f(u)\ \ \textrm{in}.\ end{aligned}$where M is continuous with $\inf _\mathbb {R}^+}M>0$, $V \ge 0$ and its zero set has several disjointed bounded components, $\mu $, $\lambda $ are positive parameters, f has exponential critical growth.当 V 在无穷远处衰减为零时，我们利用变分法得到多凸块解的存在性和集中行为。

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Multi-bump solutions to Kirchhoff type equations with exponential critical growth in $$\mathbb {R}^2$$

In this paper, we study multi-bump solutions of the following Kirchhoff type equation:

$$\begin{aligned} -M\left( \,\,\int \limits _{\mathbb {R}^2}|\nabla u|^2 \textrm{d} x\right) \Delta u +\left( \mu V(x)+h(x)\right) u =\lambda f(u)\ \ \textrm{in} \ \ \mathbb {R}^2, \end{aligned}$$

where M is continuous with $\inf _{\mathbb {R}^+}M>0$, $V \ge 0$ and its zero set has several disjoint bounded components, $\mu $, $\lambda $ are positive parameters, f has exponential critical growth. When V decays to zero at infinity, we use variational methods to obtain the existence and concentration behavior of multi-bump solutions.

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Zeitschrift für angewandte Mathematik und Physik

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