具动力边界条件的半线性Kirchhoff方程整体解的不存在性(英文)

Nonexistence of Global Solutions to Semi-linear Kirchhoff Equation with Dynamic Boundary Conditions

下载PDF

导出

摘要利用凸性方法得到了具动力边界条件的半线性Kirchhoff方程整体解的不存在性. In this paper, the nonexistence of global solutions to a semi-linear Kirchhoff equation with dynamic boundary conditions is considered. The method of proof relies on an argument of concavity.

作者张宏伟呼青英

机构地区河南工业大学理学院

出处《应用泛函分析学报》 CSCD 2006年第3期193-196,共4页 Acta Analysis Functionalis Applicata

基金 Supported by National Science Foundation of China(10371111) Science Foundation of Henan Provience and Foundation of Zhengzhou Institute of Technology

关键词 KIRCHHOFF方程整体解的不存在性动力边界条件凸性方法 Kirchhoff ectuation nonexistence of global solutions dynamic boundary conditions concavity method

分类号 O175.29 [理学—基础数学]

引文网络
相关文献

参考文献10

1Langese J E.Boundary Stabilization of Thin Plates[M].SIAM,Philadelphia,PA,1989.
2Horn M A.Exact controllability of the Euler-Bernoulli plate via bending moments only on the space of optimal regularity[J].Math Anal Appl,1992,167:557-581.
3Lasiecka I.Exponential decay rates for the solutions of Euler-Bernoulli equations with boundary dissipation occurring in the moments only[J].Differential Equations,1992,95:169-182.
4Horn M A,Lasiecka I.Asymptotic behavior with respect to thickness of boundary stabilizing feedback for the Kirchhoff plate[J].Differential Equations,1994,114:396-433.
5Ji G,Lasiecka I.Nonlinear boundary feedback stabilization for a semilinear Kirchhoff plate with dissipation acting only via moments-limiting bebavior[J].J Math Anal Appl,1999,229:452-479.
6Ji G.Uniformdecay rates and asymptotic analysis of the von-Karman plate with nonlinear dissipation in the boundary moments[J].Nonlinear Analysis,2000,42:835-870.
7Avalos G,Lasiecka I.Uniform Decays in Nonlinear Thermoelastic Systems[M].W.W.Hager and P.M.Pardalos,Optimal Control:Theory,Algorithms and Applications.Kluwer Academic Publishers,1998.
8Avalos G.Exact controllability of a thermoelastic system with control in the thermal component only[J].Diff Integ Equations,2000,13:613-630.
9Maksudov F G,Aliey F A.On a problem for a nonlinear hyperbolic equation of higher order with dissipation on the boundary of the domain[J].Soviet Math Dokl,1992,44:771-774.
10Kalantarov V K,Ladyzhenskaya O A.The occurrence of collapse for quasilinear equations of parabolic and hyperbolic type[J].J of Soviet Math,1978,10:53-70.

1呼青英,阎德明.具抛物型动力边界条件的Laplace方程解的爆破[J].信阳师范学院学报（自然科学版）,2008,21(4):481-483.
2袁德有,呼青英.具双曲动力边界的Laplace方程解的爆破[J].南阳师范学院学报,2007,6(6):9-11. 被引量：2
3申家峰,韩献军,薛红霞.一类具有动力边界条件的进化方程解的衰减性(英文)[J].数学杂志,2010,30(5):808-812.
4刘冰,赵青波,金跃强.拟线性椭圆方程的动力边界问题解的不存在性[J].南京工业职业技术学院学报,2012,12(4):57-59.
5韩献军,刘冰,张宏伟.具双曲动力边界的拟线性椭圆方程解的爆破[J].河南城建学院学报,2010,19(5):65-68. 被引量：1
6尤波.具有动力边界的非自治p-拉普拉斯方程解的适定性[J].兰州大学学报（自然科学版）,2013,49(1):111-115.
7陆军,张宏伟.具正初始能量和耗散边界的Kirchhoff板方程整体解的不存在性[J].许昌学院学报,2006,25(5):8-11.
8呼青英,朱碧,张宏伟.A Decay Result to an Elliptic Equation with Dynamical Boundary Condition[J].Chinese Quarterly Journal of Mathematics,2009,24(3):365-369.
9岳宝增,王照林,匡金炉.非线性晃动问题的 ALE 边界元方法[J].宇航学报,1998,19(1):1-7. 被引量：12

应用泛函分析学报

2006年第3期

浏览历史

内容加载中请稍等...

具动力边界条件的半线性Kirchhoff方程整体解的不存在性(英文)

参考文献10

相关作者

相关机构

相关主题

浏览历史