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《Journal of Hefei University of Technology(Natural Science)》 2009-03
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Oscillation of solutions to a class of second order damped time-delay partial differential equations

CAI Jiang-tao,LUO Li-ping,XIAO Juan(Dept.of Mathematics,Hengyang Normal University,Hengyang 421008,China)  
Oscillatory properties of solutions to a class of second order damped time-delay partial differential equations are studied.Some criteria of sufficient conditions for the oscillation of all solutions of the equations are obtained under two kinds of boundary conditions by using second order damped differential inequalities.
【Fund】: 湖南省教育厅科研基金资助项目(06C189)
【CateGory Index】: O175.27
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【Citations】
Chinese Journal Full-text Database 3 Hits
1 LUO Li-ping1,OUYANG Zi-gen2(1.Dept.of Math.,Hengyang Normal University,Hengyang Hunan 421008,China; 2.Dept.of Math.,Nanhua University,Hengyang Hunan 421001,China);Oscillatory Criteria for a Class of Second Order Nonlinear Partial Differential Equations with Continuous Distribution Delay[J];Bulletin of Science and Technology;2007-01
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3 Wang Peiguang (Dept. of Math., Hebei University, Baoding 071002)Fu Xilin (Dept. of Math., Shandong Normal University, Jinan 250014)Yu Yuanhong (Inst. of Appl. Math., Academia Sinica, Beijing 100080);Oscillatory Criteria for Certain Delay Hyperbolic Equations[J];JOURNAL OF MATHEMATICAL RESEARCH AND EXPOSITION;1998-01
【Co-citations】
Chinese Journal Full-text Database 10 Hits
1 DENG Li hu 1, GE Wei gao 1, WANG Pei guang 2 (1.Department of Mathematics, Beijing Institute of Technology, Beijing100081; 2.Department of Mathematics,Hebei University,Baoding071002);Forced Oscillation of Hyperbolic Equation with Distributed Deviating Argument[J];Journal of Beijing Institute of Technology;2000-05
2 SHENG Wei-hong (Department of Mathematics,Binzhou University,Binzhou 256603,China);Oscillation for a Class of Second Order Nonlinear Differential Equation with Damping[J];Journal of Binzhou Teachers College;2004-04
3 ZHANG Ce,LI Tong-rong(Department of Mathematics and Information Science,Binzhou University,Binzhou 256603,China);New Oscillation Theorems for Second Order Nonlinear Differential Inquation with Perturbation[J];Journal of Binzhou University;2006-06
4 XU Hua-zhong1,2,ZHANG Ji-qing1,FAN Jin-mei1(1.Department of Mathematical and Information Science,Binzhou University,Binzhou 256603,China;2.Department of Mathematics and System,Shandong University,Jinan 250100,China);New Results of Oscillation for a Class of Second Order Nonlinear Differential Inequality with Damping[J];Journal of Binzhou University;2007-03
5 ZHANG Hao-ran(Faculty of Business,the Hong Kong Polytechnic University,Kowloon,Hong Kong);Asymptotic Behavior of Solutions to Second Order Nonlinear Differential Inequality with Damping[J];Journal of Binzhou University;2007-03
6 ZHANG Ji-qing,HUANG Li-guo(Department of Mathematics and Information Science,Binzhou University,Binzhou 256603,China);Oscillatory Property for Second Order Nonlinear Functional Differential Equations[J];Journal of Binzhou University;2008-03
7 ZHANG Quan-xin1,YAN Ju-rang2(1.Department of Mathematics and Information Science,Binzhou University,Binzhou 256603,China;2.School of Mathematical Sciences,Shanxi University,Taiyuan 030006,China);Oscillatory property of solutions for a class of second order nonlinear differential equations with damping[J];Pure and Applied Mathematics;2008-04
8 LUO Li-ping (Department of Mathematics,Hengyang Normal University,Hengyang 421008);Forced Oscillation of High-order Nonlinear Partial Functional Differential Equations[J];Chinese Journal of Engineering Mathematics;2007-01
9 PENG Bai-yu(Department of Mathematics,Hengyang Normal University,Hengyang 421008,China);Oscillatory Criteria for a Class of Nonlinear Neutral Partial Differential Equations with Continuous Distribution Delay[J];Journal of Gansu Lianhe University(Natural Science Edition);2007-03
10 CAI Jiang-tao,LUO Li-ping,YANG Liu (Department of Mathmatics,Hengyang Normal University,Hengyang 421008,China);Oscillation of Solutions to a Class of Second Order Damped Partial Differential Equations with High Order Laplace Operator[J];Journal of Gansu Lianhe University(Natural Science Edition);2008-05
【Secondary Citations】
Chinese Journal Full-text Database 4 Hits
1 YAN JU-RANG (Shanxi University,Taiyuan 030006)ZHANG QUAN-XIN (Binzhou Teachers College,Shandong 256604);OSCILLATION THEOREMS FOR SECOND ORDER NONLINEAR DIFFERENTIAL EQUATIONS WITH DAMPING[J];;1993-03
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4 CUI BAOTONG(Binzhou Normal Collage, Shandong 256604)YU YUANHONG(Institute of Applied Mathematics, the Chinese Academy of Science, Beijing 100080)LIN SHIZHONG(Deportment of Mathematics, Hainan Normal College , Haikou 571158);OSCILLATION OF SOLUTIONS OF DELAY HYPERBOLIC DIFFERENTIAL EQUATIONS[J];ACTA MATHEMATICAE APPLICATAE SINICA;1996-01
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