摘要
本文研究具负指数奇性的广义平均曲率方程,在一个适当的且不可改进的条件下证明了径向对称古典解的存在唯一性.
出处
《数学年刊(A辑)》
CSCD
北大核心
2000年第4期483-490,共8页
Chinese Annals of Mathematics
基金
国家自然科学基金!(No.19831060)
参考文献1
-
1Ni W M,Commun Pure Appl Math,1986年,39卷,379页
同被引文献6
-
1Kusano T, Swanson C A. Radical Entire Solutions of a Class of Quasilinear Elliptic Equations [ J ]. J Differential Equations, 1990, 83(2) : 379-399.
-
2Kusano T, Ogota A, Usami H. On the Oscillation of Solutions of Second Order Quasilinear Ordinary Differential Equations [J]. Hiroshima Math J, 1993, 23(3) : 645-667.
-
3Peletier L A, Serrin J. Ground States for the Prescibed Mean Curvature Equation [ J]. Proc Amer Math Soc, 1987, 100 : 694-700.
-
4Bonheure D, Habets P, Obersnel F, et al. Classical and Non-classical Solutions of a Prescribed Curvature Equation [ J ]. J Differential Equations, 2007, 243 ( 2 ) : 208-237.
-
5Patrick Habets. Multiple Positive Solutions of a One-dimensional Prescribed Mean Curvature Problem [J]. Communications in Contemporary Mathematics, 2007, 9(5 ) : 701-730.
-
6Bereanu C, Mawhin J. Existence and Multiplicity Results for Some Nonlinear Problems with Singular φ-Laplacian [ J ] J Differential Equations, 2007, 243 (2) : 536-557.
-
1梁载涛,鲁世平.具偏差变元的广义平均曲率方程周期解问题(英文)[J].四川大学学报(自然科学版),2014,51(2):240-247. 被引量:2
-
2梁载涛,鲁世平.一类广义平均曲率方程的周期解问题(英文)[J].安徽师范大学学报(自然科学版),2013,36(5):437-442.
-
3沈柳平,杨继昌.一类Dirichlet问题正解的精确个数[J].黄冈师范学院学报,2010,30(6):32-35.
-
4杨俊,沈尧天.含临界位势的广义平均曲率方程的解[J].应用数学,2006,19(1):110-119.
