On qualitative properties of solutions for elliptic problems with the p-Laplacian through domain perturbations

Vladimir Bobkov; Sergey Kolonitskii

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On qualitative properties of solutions for elliptic problems with the p-Laplacian through domain perturbations

机译：通过域扰动与P-Laplacian解决方案的定性特性

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We study the dependence of least nontrivial critical levels of the energy functional corresponding to the zero Dirichlet problem -?_pu = f (u) in a bounded domain ??R~N upon domain perturbations. Assuming that the nonlinearity f is superlinear and subcritical, we establish Hadamard-type formulas for such critical levels. As an application, we show that among all (generally eccentric) spherical annuli ? least nontrivial critical levels attain maximum if and only if ? is concentric. As a consequence of this fact, we prove the nonradiality of least energy nodal solutions whenever ? is a ball or concentric annulus.

机译：我们研究了对应于零级别问题的能量功能的最小值临界水平的依赖性 - α_μS在域扰动的界面Δθ中的Δθ。假设非线性F是超连线和亚临界的，我们建立了这种关键水平的Hadamard型公式。作为申请，我们展示了所有（一般偏心）球形的annuli？最不值得的关键水平达到最大值，如果才能达到最大值是同心的。由于这一事实，我们每当何时证明最少能源节点解决方案的非产物性是一个球或同心环。

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来源
《Communications in Partial Differential Equations》 |2020年第3期|共23页
作者
Vladimir Bobkov; Sergey Kolonitskii;
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作者单位

Department of Mathematics and NTIS Faculty of Applied Sciences University of West Bohemia Plzeň Czech Republic;

Saint Petersburg Electrotechnical University "LETI" St. Petersburg Russia;

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原文格式 PDF
正文语种 eng
中图分类偏微分方程;
关键词
p-Laplacian; superlinear nonlinearity; domain derivative; shape optimization; Hadamard formula; Nehari manifold; least energy solution; nodal solution; nonradiality;

机译：p-laplacian;超线性非线性;域衍生物;形状优化;哈马德公式;奈哈里歧管;最少能量解决;节点溶液;非产物;
入库时间 2022-08-19 23:57:06

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专利

1. On qualitative properties of solutions for elliptic problems with the p-Laplacian through domain perturbations [J] . Vladimir Bobkov, Sergey Kolonitskii Communications in Partial Differential Equations . 2020,第1a3期

机译：通过域扰动与P-Laplacian解决方案的定性特性
2. Holder Continuity and the Harnack Inequality for the Solutions of an Elliptic Equation Containing the p-Laplacian and Uniformly Degenerating in a Part of the Domain [J] . Huseynov S. T. Ukrainian mathematical journal . 2018,第12期

机译：持有者连续性和壳体不等式的椭圆方程解决含有p-laplacian的溶液和均匀退化的域
3. Solutions of elliptic problems of p-Laplacian type in a cylindrical symmetric domain [J] . Chung N.T., Toan H.Q. Acta mathematica Hungarica . 2012,第1a2期

机译：圆柱对称域中p-Laplacian型椭圆问题的解
4. Perturbations of elliptic operators in chord arc domains [C] . Emmanouil Milakis, Jill Pipher, Tatiana Toro Conference on Harmonic Analysis and Partial Differential Equations . 2014

机译：和弦弧域中的椭圆算子的扰动
5. Normalized p-laplacian evolution: boundary behavior of non-negative solutions of fully nonlinear parabolic equations: Gradient bounds for p-harmonic systems with vanishing neumann (dirichlet) data in a convex domain. [D] . Banerjee, Agnid. 2014

机译：归一化的p-拉普拉斯演化：完全非线性抛物方程的非负解的边界行为：具有在凸域中消失的Neumann（dirichlet）数据的p调和系统的梯度界。
6. A NOTE ON LOCAL PROPERTIES OF SOLUTIONS OF ELLIPTIC DIFFERENTIAL EQUATIONS [O] . A. P. Calderón, A. Zygmund 1960

机译：椭圆型微分方程解的局部性质的一个注记
7. On qualitative properties of solutions for elliptic problems with thep-Laplacian through domain perturbations [O] . Vladimir Bobkov, Sergey Kolonitskii 2019

机译：论域扰动与Laplacian椭圆问题解决方案的定性特性
8. Some Qualitative Properties of Solutions of Semilinear Elliptic Equations inCylindrical Domains [R] . Berestycki, H., Nirenberg, L. 1990

机译：圆柱域中半线性椭圆方程解的一些定性性质

On qualitative properties of solutions for elliptic problems with the p-Laplacian through domain perturbations

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