Existence of solutions for a nonlinear elliptic Dirichlet boundary value problem with an inverse square potential

被引:0
作者
Shenghua Weng
Yongqing Li
机构
[1] Fujian Normal University,Department of Mathematics
来源
Boundary Value Problems | / 2006卷
关键词
Differential Equation; Partial Differential Equation; Ordinary Differential Equation; Functional Equation; Dirichlet Boundary;
D O I
暂无
中图分类号
学科分类号
摘要
Via the linking theorem, the existence of nontrivial solutions for a nonlinear elliptic Dirichlet boundary value problem with an inverse square potential is proved.
引用
收藏
相关论文
共 50 条
[31]   Existence and Numerical Method for Nonlinear Third-Order Boundary Value Problem in the Reproducing Kernel Space [J].
Xueqin Lü ;
Minggen Cui .
Boundary Value Problems, 2010
[32]   A Multidimensional Inverse Boundary Value Problem for a Linear Hyperbolic Equation in a Bounded Domain [J].
M. A. Kuliev .
Differential Equations, 2002, 38 :104-108
[33]   A multidimensional inverse boundary value problem for a linear hyperbolic equation in a bounded domain [J].
Kuliev, MA .
DIFFERENTIAL EQUATIONS, 2002, 38 (01) :104-108
[34]   A singular elliptic boundary value problem in domains with corners: I. Function spaces [J].
V. V. Katrakhov ;
S. V. Kiselevskaya .
Differential Equations, 2006, 42 :422-430
[35]   A boundary value problem for a second-order singular elliptic equation in a sector on the plane [J].
Larin, AA .
DIFFERENTIAL EQUATIONS, 2000, 36 (12) :1850-1858
[36]   A Boundary Value Problem for a Second-Order Singular Elliptic Equation in a Sector on the Plane [J].
A. A. Larin .
Differential Equations, 2000, 36 :1850-1858
[37]   A singular elliptic boundary value problem in domains with corners: 1. Function spaces [J].
Katrakhov, VV ;
Kiselevskaya, SV .
DIFFERENTIAL EQUATIONS, 2006, 42 (03) :422-430
[38]   An existence result for a multipoint boundary value problem on a time scale [J].
Basant Karna ;
Bonita A Lawrence .
Advances in Difference Equations, 2006
[39]   Correction to the paper “Existence of solutions for the Dirichlet problem with superlinear nonlinearities” [J].
Andrzej Nowakowski ;
Andrzej Rogowski .
Czechoslovak Mathematical Journal, 2005, 55 :543-544
[40]   Existence and Uniqueness of Solutions for Singular Higher Order Continuous and Discrete Boundary Value Problems [J].
Chengjun Yuan ;
Daqing Jiang ;
You Zhang .
Boundary Value Problems, 2008
12345