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具有多个偏差变元的Rayleigh型p-Laplacian泛函微分方程的周期解 被引量:2

Periodic Solutions for Rayleigh Type p-Laplacian Functional Differential Equation with Multiple Deviating Arguments
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摘要 利用重合度理论中的延拓定理和不等式分析技巧,获得了一类具有多个偏差变元的Rayleigh型p-Laplacian泛函微分方程的周期解存在性的充分条件,推广和改进了已有文献的相关结果. By using a continuation theorem based on coincidence degree theory and inequality technique, some sufficient conditions of periodic solutions are established for Rayleigh type p-Laplacian neutral functional differential equation with multiple deviating arguments. The results have extend and improved the related reports in the literatures.
作者 汤干文 秦发金 罗朝晖 姚晓洁
机构地区 广西贺州学院 广西柳州师范高等专科学校数学与计算机科学系 广西百色学院数学与信息工程系
出处 《数学的实践与认识》 CSCD 北大核心 2012年第2期177-188,共12页 Mathematics in Practice and Theory
基金 国家自然科学基金(11161029)
关键词 偏差变元 Rayleigh型p-Laplacian泛函微分方程 周期解 重合度 deviating argument Rayleigh type p-Laplacian functional differential equation periodic solutions coincidence degree
分类号 O175 [理学—基础数学]
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  • 1LuShiping,GeWeigao.EXISTENCE OF POSITIVE PERIODIC SOLUTIONS FOR NEUTRAL FUNCTIONAL DIFFERENTIAL EQUATIONS WITH DEVIATING ARGUMENTS[J].Applied Mathematics(A Journal of Chinese Universities),2002,17(4):382-390. 被引量:23
  • 2ShiPingLU,WeiGaoGE.On the Existence of Periodic Solutions for a Kind of Second Order Neutral Functional Differential Equation[J].Acta Mathematica Sinica,English Series,2005,21(2):381-392. 被引量:7
  • 3Cheng W S, Ren J L. On the existence of periodic solutions for p-Laplacian generalized Lienard equation. Nonlinear Anal., 2005, 60: 65-75.
  • 4Lu S P, Ge W G, Zheng Zuxiu. Periodic solutions to neutral differential equation with deviating arguments. Appl. Math. Comput., 2004, 152: 17-27.
  • 5Hale J K. Theory of Functional Differential Equations. New York: Springer-Verlag, 1977.
  • 6Gaines R E, Mawhin J L. Coincidence Degree and Nonlinear Differential Equations. Berlin: Springer-Verlag, 1977.
  • 7Del Pino M A, Elgueta M, Manasevich R F. A homotopic deformation along p of a Lerray-Schauder degree result and existence for (|u'|^P-2u')'+ f(t,u) = 0, u(0) = u(T) = 0,p > 1. J. Differential Equations, 1989, 80: 1-13.
  • 8Del Pino M A, Manasevich R F. Multiple solutions for the p-Laplacian under global nonresonance. Proc. Ameri. Math. Soc., 1991, 112: 131-138.
  • 9Fabry C, Fayyad D. Periodic solutions of second order differential equations with a p-Laplacian and asymmetric nonlinearities. Rend. Istit. Univ. Trieste, 1992, 24: 207-227.
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数学的实践与认识
2012年 第2期

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