共查询到20条相似文献,搜索用时 84 毫秒
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《数学的实践与认识》2013,(23)
基于现有文献大多研究线性脉冲动力系统,对具非线性脉冲影响的研究较少的情况,主要利用拓扑度理论,M-矩阵理论,Liapunov泛函方法,研究了具有界时滞和分布时滞的一类细胞神经网络动力系统的非线性脉冲影响,获得了其平衡点全局指数稳定性的充分条件. 相似文献
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探讨了一类非线性随机积分微分动力系统,并通过Banach不动点方法,给出了该系统零解均方渐近稳定的充要条件,形成了中立多变时滞Volterra型随机积分微分动力系统零解均方渐近稳定性定理。与前人的研究方法不同,该文根据多变时滞随机动力系统各时滞的特点,灵活构造算子,相比以往文献的方法更加灵活实用。文章的结论一定程度上改进和发展了相关研究论文的结果。另外,文章所得结论补充并推广了不动点方法在研究非线性中立多变时滞Volterra型随机积分微分动力系统零解稳定性方面的成果。 相似文献
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利用 Banach空间 BC (而不是容许空间 )中的稳定性判别准则 ,作者得到一类具有无穷时滞的积分微分方程平衡解的渐近稳定性的充分条件 .这些方程都是血液学中细胞或生态学中虫口动力系统的数学模型 . 相似文献
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对于同时具有时滞耦合和非时滞耦合的复杂动态网络,以时滞动力系统的稳定性理论为基础,设计了全新的自适应控制器,同时给出了一些简单而又一般的网络同步化准则.对由三个节点组成的动态网络的同步化进行了数值模拟,使得理论分析与数值模拟得到了相互验证. 相似文献
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本文研究了泛区间动力系统的稳定性,并由此给出了区间矩阵稳定的充要条件和离散区间动力系统稳定的充要条件.本文的分析方法具有普遍意义,适于一大类区间分析问题,包括区间时滞系统,灰色控制系统,区间分布参数系统等. 相似文献
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一类带有时滞的动力系统的几个定量与应用 总被引:7,自引:0,他引:7
本文通过李雅普诺夫泛函方法获得了一类带有时滞的动力系统的运动稳定性、有界性、周期运动存在性和平稳振荡存在性的几个定量,并给出了时滞范围的简明表达式。最后,应用获得的定理解决了几个实际问题。 相似文献
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一类具无穷时滞的积分微分方程解的渐近稳定性 总被引:2,自引:0,他引:2
利用Banach空间BC(而不是容许空间)中的稳定性判别准则,作者得到一类具有无穷时滞的积分微分方程平衡解的渐近稳定性的充分条件。这些方程都是血液学中细胞或生态学中虫口动力系统的数学模型。 相似文献
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狄成宽 《数学的实践与认识》2011,41(23)
Lambert W函数具有的一些性质以及现今成熟的数学软件Maple等使得它能很好地应用于时滞微分方程的稳定性判别中.通过应用Lambert W函数对一阶复系数时滞微分方程渐近稳定性的判别命题,分析了一类参数反馈控制复系数时滞微分方程的稳定性,得到了更加精细的结果.相比已往的方法,新方法更简单、计算更方便并能快速有效的给出判定结果. 相似文献
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运用变异Liapunov方法,讨论了时滞微分方程依照两种测度的稳定性。借助于中间测度h*(t,x),在未扰动系统为常微分方程的情形下,得到了关于时滞微分方程非一致和一致稳定性的判定定理。 相似文献
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Toshiyuki Koto 《Frontiers of Mathematics in China》2009,4(1):113-129
Stability properties of implicit-explicit (IMEX) linear multistep methods for ordinary and delay differential equations are
analyzed on the basis of stability regions defined by using scalar test equations. The analysis is closely related to the
stability analysis of the standard linear multistep methods for delay differential equations. A new second-order IMEX method
which has approximately the same stability region as that of the IMEX Euler method, the simplest IMEX method of order 1, is
proposed. Some numerical results are also presented which show superiority of the new method.
相似文献
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This paper establishes the Razumikhin-type theorem on stability for neutral stochastic functional differential equations with unbounded delay. To overcome difficulties from unbounded delay, we develop several different techniques to investigate stability. To show our idea clearly, we examine neutral stochastic delay differential equations with unbounded delay and linear neutral stochastic Volterra unbounded-delay-integro-differential equations. 相似文献
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A constructive method is presented for obtaining differential equation approximations to general functional delay differential equations. It is shown that the approximating differential equation systems can be used to determine the stability of the functional differential equations 相似文献
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For the past few decades, the stability criteria for the stochastic differential delay equations (SDDEs) have been studied intensively. Most of these criteria can only be applied to delay equations where their coefficients are either linear or nonlinear but bounded by linear functions. Recently, the stability criterion for highly nonlinear hybrid stochastic differential equations is investigated in Fei et al. (2017). In this paper, we investigate a class of highly nonlinear hybrid stochastic integro-differential delay equations (SIDDEs). First, we establish the stability and boundedness of hybrid stochastic integro-differential delay equations. Then the delay-dependent criteria of the stability and boundedness of solutions to SIDDEs are studied. Finally, an illustrative example is provided. 相似文献
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We study stability of antisymmetric periodic solutions to delay differential equations. We introduce a one-parameter family of periodic solutions to a special system of ordinary differential equations with a variable period. Conditions for stability of an antisymmetric periodic solution to a delay differential equation are stated in terms of this period function. 相似文献
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The asymptotic stability of multistep multiderivative methods for systems of delay differential equations 总被引:1,自引:0,他引:1
Chengming HUANG Qianshun CHANG Institute of Applied Mathematics Chinese Academy of Sciences P. O. Box Beijing China 《Communications in Nonlinear Science & Numerical Simulation》2000,5(1)
IntroductionFor many years, many papers investigated the linear stabilit}' of delay differential equation(DDE) solvers and a significant number of important results have already been found for bothRunge-Kutta methods and linear multistep methods (see, for example, [l--8]). In this paper,we firstly consider stability of numerical methods with derivative for DDEs. It is shown thatA-stability of multistep multiderivative methods for ordinary differential equations (ODEs) isequit,alent to p-s… 相似文献
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Stability analysis of highly nonlinear hybrid multiple-delay stochastic differential equations 
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下载免费PDF全文 Chen Fei Weiyin Fei Xuerong Mao Mingxuan Shen Litan Yan 《Journal of Applied Analysis & Computation》2019,9(3):1053-1070
Stability criteria for stochastic differential delay equations (SDDEs) have been studied intensively for the past few decades. However, most of these criteria can only be applied to delay equations where their coefficients are either linear or nonlinear but bounded by linear functions. Recently, the stability of highly nonlinear hybrid stochastic differential equations with a single delay is investigated in [Fei, Hu, Mao and Shen, Automatica, 2017], whose work, in this paper, is extended to highly nonlinear hybrid stochastic differential equations with variable multiple delays. In other words, this paper establishes the stability criteria of highly nonlinear hybrid variable multiple-delay stochastic differential equations. We also discuss an example to illustrate our results. 相似文献