Multiplicity of solutions for differential inclusion problems in ${mathbb{R}^N}$ involving the p(x)-Laplacian

Bin Ge; Qing-Mei Zhou; Xiao-Ping Xue

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Multiplicity of solutions for differential inclusion problems in ${mathbb{R}^N}$ involving the p(x)-Laplacian

机译：$ {mathbb {R} ^ N} $中涉及p（x）-Laplacian的微分包含问题的多重解

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In this paper we consider the differential inclusion problem in ${mathbb{R}^N}$ involving the p(x)-Laplacian of the type $$ -triangle_{p(x)} u+V(x)|u|^{p(x)-2}uin partial F(x,u),,,{rm in}, mathbb{R}^N. $$ The approach used in this paper is the variational method for locally Lipschitz functions. More precisely, based on the Weirstrass Theorem and Mountain Pass Theorem, we get there exist at least two nontrivial solutions. We also establish a Bartsch–Wang type compact embedding theorem for variable exponent spaces.

机译：在本文中，我们考虑了$ {mathbb {R} ^ N} $中的微分包含问题，该问题涉及类型为$$ -triangle_ {p（x）} u + V（x）| u |的p（x）-Laplacian。 ^ {p（x）-2} u部分F（x，u）,, {rm in}，mathbb {R} ^ N。 $$本文中使用的方法是局部Lipschitz函数的变分方法。更准确地说，基于韦氏定理和山口定理，我们得出至少存在两个非平凡的解。我们还为可变指数空间建立了Bartsch-Wang型紧凑嵌入定理。

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来源
《Monatshefte für Mathematik》 |2012年第4期|p.363-380|共18页
作者
Bin Ge; Qing-Mei Zhou; Xiao-Ping Xue;
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作者单位

Department of Applied Mathematics, Harbin Engineering University, Harbin, 150001, Heilongjiang, People’s Republic of China;

Library, Northeast Forestry University, Harbin, 150040, Heilongjiang, People’s Republic of China;

Department of Mathematics, Harbin Institute of Technology, Harbin, 150001, Heilongjiang, People’s Republic of China;

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正文语种 eng
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关键词
p(x)-Laplacian; Differential inclusion problem; Locally Lipschitz function; Variational method; 35J20; 35J70; 35R70;

机译：p（x）-Laplacian;微分包含问题;局部Lipschitz函数;变分法;35J20;35J70;35R70;

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1. Multiplicity of solutions for differential inclusion problems in ${mathbb{R}^N}$ involving the p(x)-Laplacian [J] . Bin Ge, Qing-Mei Zhou, Xiao-Ping Xue Monatshefte für Mathematik . 2012,第3a4期

机译：$ { mathbb {r} ^ n} $涉及p（x）-laplacian的差分夹杂项问题的多种解决方案
2. Multiplicity of solutions for differential inclusion problems in □~N involving the p(x)-Laplacian [J] . Ge B., Zhou Q.-M., Xue X.-P. Monatshefte fur Mathematik . 2012,第3a4期

机译：涉及p（x）-Laplacian的□〜N微分包含问题的多重解
3. Multiplicity of solutions for a quasilinear elliptic equation with $$-Laplacian and critical exponent on RN$mathbb{R}^{N}$ [J] . Chen Huang, Gao Jia, Tiansi Zhang Boundary value problems . 2018,第1期

机译：RN $ mathbb {R} ^ {N} $上具有$$-Laplacian和临界指数的拟线性椭圆型方程的多重解
4. Multiplicity of Solutions of Dirichlet's problems for Fourth-order p-Laplacian Differential Equations [C] . Stepan A. Tersian International Conference on Applications of Mathematics in Engineering and Economics . 2018

机译：第四阶P-Laplacian微分方程的Dirichlet问题解决方案的多种解决方案
5. Qualitative Properties for Solutions of Nonlinear Equations and Systems involving Higher Order and Fractional Order Laplacians [D] . Zhou, Ran 2015

机译：涉及高阶和分数阶拉普拉斯算子的非线性方程和系统解的定性性质
6. Multiplicity and asymptotic behavior of solutions to a class of Kirchhoff-type equations involving the fractional p-Laplacian [O] . Liejun Shen -1

机译：一类涉及分数p-Laplacian的Kirchhoff型方程解的多重性和渐近行为
7. Existence of solutions for a differential inclusion problem with singular coefficients involving the p(x)-Laplacian [O] . Guowei Dai, Ruyun Ma, Qiaozhen Ma 2012

机译：具有p（x）-Laplacian的具有奇异系数的微分包含问题的解的存在性

Multiplicity of solutions for differential inclusion problems in ${mathbb{R}^N}$ involving the p(x)-Laplacian

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