LIOUVILLE TYPE RESULTS AND REGULARITY OF THE EXTREMAL SOLUTIONS OF BIHARMONIC EQUATION WITH NEGATIVE EXPONENTS

被引：23

作者：

Guo, Zongming ^{[1
]}

Wei, Juncheng ^{[2
,3
]}

机构：

[1] Henan Normal Univ, Dept Math, Xinxiang 453007, Peoples R China

[2] Univ Hong Kong, Dept Math Chinese, Shatin, Hong Kong, Peoples R China

[3] Univ British Columbia, Dept Math, Vancouver, BC V6T 1Z2, Canada

来源：

DISCRETE AND CONTINUOUS DYNAMICAL SYSTEMS | 2014年 / 34卷 / 06期

基金：

加拿大自然科学与工程研究理事会;

关键词：

Stable entire solutions; biharmonic equations with singularity; regularity of the extremal solutions; POSITIVE SOLUTIONS; ELLIPTIC EQUATION; STABLE-SOLUTIONS; COMPACTNESS; STABILITY;

D O I：

10.3934/dcds.2014.34.2561

中图分类号：

O29 [应用数学];

学科分类号：

070104 ;

摘要：

We first obtain Liouville type results for stable entire solutions of the biharmonic equation -Delta(2)u = u(-p) in R-N for p > 1 and 3 <= N <= 12. Then we consider the Navier boundary value problem for the corresponding equation and improve the known results on the regularity of the extremal solution for 3 <= N <= 12. As a consequence, in the case of p = 2, we show that the extremal solution u* is regular when N = 7. This improves earlier results of Guo-Wei [20] (N <= 4), Cowan-Esposito-Ghoussoub [2] (N = 5), Cowan-Ghoussoub [4] (N = 6).

引用

页码：2561 / 2580

页数：20

共 50 条

[31] Liouville type theorems and regularity of solutions to degenerate or singular problems part II: odd solutions
Sire, Yannick
Terracini, Susanna
Vita, Stefano
MATHEMATICS IN ENGINEERING, 2021, 3 (01): : 1 - 50
[32] Liouville type theorems and regularity of solutions to degenerate or singular problems part I: even solutions
Sire, Yannick
Terracini, Susanna
Vita, Stefano
COMMUNICATIONS IN PARTIAL DIFFERENTIAL EQUATIONS, 2021, 46 (02) : 310 - 361
[33] Ring-type singular solutions of the biharmonic nonlinear Schrodinger equation
Baruch, G.
Fibich, G.
Mandelbaum, E.
NONLINEARITY, 2010, 23 (11) : 2867 - 2887
[34] Existence and Multiplicity of Solutions for a Biharmonic Equation with p(x)-Kirchhoff Type
Zhang, Qi
Miao, Qing
DISCRETE DYNAMICS IN NATURE AND SOCIETY, 2021, 2021
[35] A new proof of I. Guerra's results concerning nonlinear biharmonic equations with negative exponents
Lai, Baishun
JOURNAL OF MATHEMATICAL ANALYSIS AND APPLICATIONS, 2014, 418 (01) : 469 - 475
[36] THE LIOUVILLE TYPE THEOREM AND LOCAL REGULARITY RESULTS FOR NONLINEAR DIFFERENTIAL AND INTEGRAL SYSTEMS
Li, Zhenjie
Cheng, Ze
Li, Dongsheng
COMMUNICATIONS ON PURE AND APPLIED ANALYSIS, 2015, 14 (02) : 565 - 576
[37] Multiplicity results for biharmonic equations involving multiple Rellich-type potentials and critical exponents
Zhang, Jinguo
Hsu, Tsing-San
BOUNDARY VALUE PROBLEMS, 2019, 2019 (1)
[38] LIOUVILLE-TYPE RESULTS FOR THE LANE-EMDEN EQUATION
Roncoroni, Alberto
BRUNO PINI MATHEMATICAL ANALYSIS SEMINAR, 2023, 14 (01) : 77 - 94
[39] Multiplicity results for biharmonic equations involving multiple Rellich-type potentials and critical exponents
Jinguo Zhang
Tsing-San Hsu
Boundary Value Problems, 2019
[40] INTERIOR AND BOUNDARY-REGULARITY OF SOLUTIONS TO A PLASMA TYPE EQUATION
KWONG, YC
PROCEEDINGS OF THE AMERICAN MATHEMATICAL SOCIETY, 1988, 104 (02) : 472 - 478

← 1 2 3 4 5 →