Full-Text Search:
Home|Journal Papers|About CNKI|User Service|FAQ|Contact Us|中文
《微分方程年刊(英文版)》 2012-01
Add to Favorite Get Latest Update

PERIODIC SOLUTIONS TO A HIGH-ORDER NEUTRAL FUNCTIONAL DIFFERENTIAL EQUATION

Xiulin Hu (Dept.of Math.and Physics,Hefei University,Hefei 230601) Zongfu Zhou (School of Math.Science,Anhui University,Hefei 230039)  
In this paper,using the principle of a priori boundedness,we study the existence and uniqueness of periodic solutions to a high-order neutral functional differential equation.Some new results for the existence and uniqueness of the periodic solution are obtained.
【Fund】: Supported by the Science Foundation for the Excellent Youth Scholars of Anhui Province (2010SQRL159)
【CateGory Index】: O175
Download(CAJ format) Download(PDF format)
CAJViewer7.0 supports all the CNKI file formats; AdobeReader only supports the PDF format.
【Citations】
Chinese Journal Full-text Database 2 Hits
1 Shi Ping -LIT (Department of Mathematics, Anhui Normal University, Wuhu 241000, P. R. China) Wei Gao GE (Department of Applied Mathematics, Beijing Institute of Technology, Beijing 100081, P. R. China);On the Existence of Periodic Solutions for a Kind of Second Order n-Dimensional Neutral Differential Systems[J];Acta Mathematica Sinica;2003-03
2 Li Lei~(1,2) Zhou Zongfu~1 (1.School of Math.and Computation Science,Anhui University,Hefei 230039;2.Shanghai Taopu Middle School,Shanghai 200331);PERIODIC SOLUTION TO A CLASS OF SECOND ORDER NEUTRAL FUNCTIONAL DIFFERENTIAL EQUATION WITH A STATEMENT-DEPENDENT DEVIATION VARIABLE[J];微分方程年刊(英文版);2007-03
【Co-citations】
Chinese Journal Full-text Database 7 Hits
1 LI Lei1,ZHOU Zong-fu2(1.Shenzhen Foreign Languages School,Shenzhen,Guangdong 518034;2.School of Mathematics and Computational Science,Anhui University,Hefei 230039,China);Periodic Solution of Second Order Neutral Functional Differential Equation with Statement-dependent Deviation Variables[J];Journal of Hefei University(Natural Sciences Edition);2008-01
2 YAO Xiao-jie (Department of Mathematics and Computer Science,Liuzhou Teachers College,Liuzhou 545004,China);Existence of Periodic Solutions for a Class of High Order Neutral Functional Differential Equation with Multiple Deviating Arguments[J];Mathematics in Practice and Theory;2011-16
3 LU Sniping GE Weigao ZHENG-Zuxiu Department of Mathematics, Anhui Normal University, Wuhu 241000, Anhui, China. Department of Mathematics, Beijing Institute of Technology, Beijing 100081, China. Department of Mathematics, Anhui University, Hefei 230039, China.;EXISTENCE OF PERIODIC SOLUTIONS FOR NEUTRAL FUNCTIONAL DIFFERENTIAL EQUATION[J];Chinese Annals of Mathematics,series A;2004-05
4 Lu Shiping (Department of Mathematics, Anhui Normal University, Wuhu 241000) Ge Weigao (Department of Mathematics, Beijing Institute of Technology, Beijing 100081);On the Existence of Periodic Solutions to Neutral Rayleigh Functional Differential Equation with Multiple Deviating Arguments[J];Acta Mathematica Scientia;2006-06
5 XU Yan,TANG Zhao-ding,WANG Wen,LU Shi-ping Department of Mathematics,Anhui Normal University,Wuhu Anhui,241000;On the Existence of Periodic Solutions to a Class of Second-Order 3-Dimensional Neutral Differential Systems[J];Journal of Suzhou University;2011-02
6 LUO Fang-qiong~1,YAO Xiao-jie~1,QIN Fa-jin~(1,2) (1.Department of Mathematics and Computer Science,Liuzhou Teachers College,Liushou 545004,China) (2.Mathematical College,Sichuan University,Chengdu 610064,China);Periodic Solutions for A Kind of Second-order Neutral Functional Differential Equation with Multiple Deviating Arguments[J];Mathematics in Practice and Theory;2012-20
7 LI XIAOJING ZHOU YOUMING (College of Mathematics and Physics,Jiangsu Teachers University of Technology,Changzhou 213001) LU Shiping (Department of Mathematics,Anhui Normal University,Wuhu 241000);On the Existence of Periodic Solutions for a Kind of Second-order n-dimensional Neutral Functional Differential System[J];Acta Mathematicae Applicatae Sinica;2011-03
【Secondary Citations】
Chinese Journal Full-text Database 1 Hits
1 Liu Xiping Jia Mei Yang Liu (College of Science, University of Shanghai for Science and Technology, Shanghai 200093) Ge Weigao (Dept. of Applied Math., Beijing Institute of Technology, Beijing 100081);PERIODIC SOLUTIONS FOR NEUTRAL LINARD EQUATION WITH A STATEMENT-DEPENDENT DEVIATION VARIABLE[J];微分方程年刊(英文版);2005-03
©2006 Tsinghua Tongfang Knowledge Network Technology Co., Ltd.(Beijing)(TTKN) All rights reserved