一类具有两个非线性项的四阶非线性系统的稳定性

利用"类比法"构造了一类四阶非线性系统的Lyapunov函数,给出了该系统零解稳定性的充分条件.     

非线性非自治系统的等度渐近稳定性

研究了非线性非自治系统平凡解的等度渐近稳定性。利用一个或两个Lyapunov函数得到了保证所给系统的平凡解等度渐近稳定性的几个充分判据,最后给出两个例子说明本文结果.     

非线性有限时滞脉冲泛函微分系统的稳定性

研究了一类非线性有限时滞脉冲泛函微分系统,利用比较原理和Lyapunov函数,得到了系统零解一致最终稳定性及一致最终渐近稳定性的充分条件.     

一类捕食者具有阶段结构的捕食模型平衡解的稳定性分析（英文）

本文研究一类捕食者具有阶段结构的捕食模型在齐次Neumann边界条件下平衡态解的局部稳定性与全局稳定性.首先利用比较原理得到系统解的有界性;其次利用特征值理论证明系统非负解的局部稳定性;最后,当成熟捕食者的数量达到一定量时,通过构造Lyapunov函数给出系统正解全局稳定的条件.     

一类疾病在食饵中传播的生态-传染病模型分析

分析并建立疾病在食饵中传播的生态-传染病模型,且考虑易感食饵具有常数输入,捕食者种群以Logistic模型增长,讨论了系统解的有界性和各平衡点的存在性,以及局部渐近稳定性,通过构造适当的Lyapunov函数分析了各平衡点的全局渐近稳定性,并运用比较定理证明了系统的持久性.     

一类三阶非线性系统的全局渐近稳定性

在运用Lyapunov函数第二方法研究非线性系统稳定性的时候,能否做出合适的Lya- punov函数是问题的关键,本文对三阶非线性系统x g(x)x f(x,x) h(x)=0构造出了较好的Lyapunov函数,得到其零解全局渐近稳定的充分性准则,它包含并改进了这一形式非线性系统的大部分结果．     

具滞后超中立型定常线性大系统的指数稳定性

采用具有加权向量范数型Lyapunov函数，对具滞后超中立型线性大系统进行模型集结，得到集结系统；再运用原理与时域中的微分积分不等式，讨论相应集结系统，通过集结系统的稳定性，获得了具滞后超中立型大系统的指数稳定性．     

关于随机Lyapunov函数的存在性

本文对于一类非时齐的Ito型随机微分系统及可分离变量的常微辅助系统,建立了[1]的随机稳定性比较准则中的纯量Lyapunov函数及条件随机稳定性比较准则中的向量Lyapunov函数的存在性定理(这些Lyapunov函数我们就称其为随机Lyapunov函数).作为纯量随机Lyapunov函数存在性定理的一个推论,即为[2]中定理2的推广,并且在推论中所构造的随机Lyapunov函数,即为[4]中的Lyapunov函数.这些存在性定理也是[5]中常微分方程稳定性及条件稳定性比较准则的逆定理,对于随机微分系统的推广.     

无界可变延迟随机神经网络的指数稳定性（英文）

本文用Lyapunov函数方法和半鞅收敛定理研究无界可变延迟随机神经网络的指数稳定性.给出判定零解的均方指数稳定性和几乎必然稳定性的充分条件.本文所用的方法和结果适用于无界延迟系统,涵盖了已有文献中有界延迟系统的结果.     

随机Volterra积分方程相容解的稳定性

本文考虑了随机Volterra积分方程相容解的稳定性.应用Lyapunov第二方法,并以推广的Ito公式为工具,给出了随机Volterra积分方程相容解的几乎确定指数稳定和矩指数稳定的充分性原则.     

Razumikhin type boundedness theorems in terms of two measures for impulsive integro-differential systems

Some new direct criteria of boundedness in terms of two measures for impulsive integro-differential systems with fixed moments of impulse effects are established by Lyapunov functions coupled with Razumikhin techniques.     

ON BOUNDEDNESS OF SOLUTIONS OFIMPULSIVE INTEGRO-DIFFERENTIAL SYSTEMSWITH FIXED MOMENTS OF IMPULSE EFFECTS

1Introduction.ImpulsivesystemshaveagreatdealOfapplicationsinphysics,biology,medecineandotherssciences.Thetheoryforimpulsivedmerentialsystemshasbeendevelopedstronglytforinstancesee[1-3].Butthetheoryoftheimpulsiveintegrthdifferentialsystemsisasyetnotwell-developed.WeonlyisknownthatthecomparisonresultsforstabilityOfthesolutionsofimpulsiveintegro-dmerentialsystemshavebeenobtainedin[4].ConcerningtheboundednessOfimpulsiveintegro-dmerentialsystems,therehasnotappearedtobeanyresultssofar.Theobjective…     

On almost periodic processes in impulsive competitive systems with delay and impulsive perturbations

In the present paper we investigate the existence of almost periodic processes of ecological systems which are presented with the general impulsive nonautonomous Lotka–Volterra system of integro-differential equations with infinite delay. The impulses are at fixed moments of time, and by using the techniques of piecewise continuous Lyapunov’s functions, new sufficient conditions for the global exponential stability of the unique positive almost periodic solutions of these systems are given.     

Control vector Lyapunov functions for large-scale impulsive dynamical systems

Vector Lyapunov theory has been developed to weaken the hypothesis of standard Lyapunov theory in order to enlarge the class of Lyapunov functions that can be used for analyzing system stability. In this paper, we provide generalizations to the recent extensions of vector Lyapunov theory for continuous-time systems to address stability and control design of impulsive dynamical systems via vector Lyapunov functions. Specifically, we provide a generalized comparison principle involving hybrid comparison dynamics that are dependent on the comparison system states as well as the nonlinear impulsive dynamical system states. Furthermore, we develop stability results for impulsive dynamical systems that involve vector Lyapunov functions and hybrid comparison inequalities. Based on these results, we show that partial stability for state-dependent impulsive dynamical systems can be addressed via vector Lyapunov functions. Furthermore, we extend the recently developed notion of control vector Lyapunov functions to impulsive dynamical systems. Using control vector Lyapunov functions, we construct a universal hybrid decentralized feedback stabilizer for a decentralized affine in the control nonlinear impulsive dynamical system that possesses guaranteed gain and sector margins in each decentralized input channel. These results are then used to develop hybrid decentralized controllers for large-scale impulsive dynamical systems with robustness guarantees against full modeling and input uncertainty.     

Stability and boundedness criteria of nonlinear impulsive systems employing perturbing Lyapunov functions

This paper develops a new comparison principle for nonlinear impulsive differential systems, then the stability, practical stability and boundedness of impulsive differential systems are proved by using the method of perturbing Lyapunov functions. The notion of perturbing Lyapunov functions enables us to discuss stability properties of impulsive systems under much weaker assumptions. The reported novel results complement the existing results. It may provide a greater prospect for solving problems which exhibit impulsive effects.     

Stability and boundedness of nonlinear impulsive systems in terms of two measures via perturbing Lyapunov functions

This paper develops the concepts of stability, practical stability and boundedness in terms of two measures for nonlinear impulsive differential systems using the method of perturbing Lyapunov functions. The notion of perturbing Lyapunov functions enables us to discuss stability properties of solutions of nonlinear impulsive differential systems in terms of two measures under much weaker assumptions. The novel results offer a way to unify a variety of stability results found in the relative literature.     

Stability in terms of two measures for perturbed impulsive delay integro-differential equations

In this paper, we study the stability criteria in terms of two measures for perturbed delay integro-differential equations with fixed moments of impulsive effect by using variational Lyapunov method together with a comparison principle.     

Stability and robustness of quasi-linear impulsive hybrid systems

Both hybrid dynamical systems and impulsive dynamical systems are studied extensively in the literature. However, impulsive hybrid systems are not yet well studied. Nonetheless, many physical systems exhibit both system switching and impulsive jump phenomena. This paper investigates stability and robust stability of a class of quasi-linear impulsive hybrid systems by using the methods of Lyapunov functions and Riccati inequalities. Sufficient conditions for stability and robust stability of those systems are established. Some examples are given to illustrate the applicability of our results.     

Finite-time stabilization of nonlinear impulsive dynamical systems

Finite-time stability involves dynamical systems whose trajectories converge to a Lyapunov stable equilibrium state in finite time. For continuous-time dynamical systems finite-time convergence implies nonuniqueness of system solutions in reverse time, and hence, such systems possess non-Lipschitzian dynamics. For impulsive dynamical systems, however, it may be possible to reset the system states to an equilibrium state achieving finite-time convergence without requiring non-Lipschitzian system dynamics. In this paper, we develop sufficient conditions for finite-time stability of impulsive dynamical systems using both scalar and vector Lyapunov functions. Furthermore, we design hybrid finite-time stabilizing controllers for impulsive dynamical systems that are robust against full modelling uncertainty. Finally, we present a numerical example for finite-time stabilization of large-scale impulsive dynamical systems.     

Existence of almost periodic solutions for strong stable impulsive differential equations

Conditions for strong stability and the existence of almostperiodic solutions of systems of impulsive differential equationswith impulsive effect at fixed moments are obtained. The investigationsare carried out by means of piecewise continuous functions whichare analogues of Lyapunov functions.