四种群捕食——被捕食的Lotka—Volterra周期系统的全局渐近稳定性

本文考虑四种群捕食－被捕食Ｌｏｔｋａ－Ｖｏｌｔｅｒｒａ周期模型,得到了一组容易检验保证存在全局渐近稳定的正周期解的充分条件。     

一类病毒自身发生变异的传染病模型的全局分析

针对病毒变异前和变异后传染病患者具有不同的传染率情形,建立了一类分阶段传播的SIS模型,通过构造Liapunov函数和定性分析,得到病毒变异前和变异后传染病患者平衡点的存在条件以及它们的全局渐近稳定性。     

一个具非单调传染率的SEIR传染病模型的全局稳定性

本文研究一类描述某种严重疾病的传染数目变大时在心理上产生影响的非单调传染率的SEIR传染病模型.研究表明模型的动力行为和疾病的爆发完全由基本再生数R0决定.当R0≤1时,无病平衡点是全局稳定的,疾病消亡;当R0〉1时,地方病平衡点是全局稳定的,疾病持续且发展成地方病.     

一类潜伏期和染病期均传染的流行病模型

本文讨论了一类含潜伏期传染的SEIRS模型,确定了各类平衡点存在的条件阀值,利用线形化和李亚普诺夫－拉塞尔不变集的方法,得到了各类平衡点的稳定性结论,揭示了潜伏期传染和染病期传染对疾病发展趋势的共同影响。     

具有扩散的非自治两种群Lotka-Volterra模型的概周期问题

研究非自治两种群竞争系统,其中一种群可以在两个斑块之间扩散。而另一种群在一个斑块中,不能扩散。本文结合运用Liapunov函数,得到该系统唯一存在全局渐近稳定的正概周期解的条件．     

几个具有隔离项的传染病模型的局部稳定性和全局稳定性

首先建立了一类具常恢复率,有效接触率依赖于总人数的SIQS传染病模型,并得到了阈值参数σ的表达式.如果σ≤1,则疾病消除平衡点全局稳定;如果σ>1,则存在唯一的传染病平衡点且是局部渐近稳定的。对于带有双线性传染率和标准传染率的两个相应模型,我们进一步证明了当σ>1时传染病平衡点的全局稳定性。其次对于带隔离项修正的传染率的相应模型,我们同样证明了传染病平衡点只要存在唯一就一定全局稳定的结论。上述结果均推广和改进了Hethcote et al.(2002)的相应工作。     

一类具有垂直传染和预防接种的传染病模型的稳定性

考虑了垂直传染和预防接种因素对传染病流行影响的SEIRS模型,主要研究了系统的平衡点及其稳定性,得出当预防接种水平超过某一个阈值时疾病可以根除,若接种水平低于阈值时疾病将流行.     

具有反馈控制的两种群竞争系统的概周期解

讨论了具有反馈控制的两种群概周期竞争系统,利用微分不等式和构造适当的Lyapunov函数,获得存在全局渐近稳定的概周期解的充分条件.     

具有非线性传染率的SEIQR流行病模型的全局稳定性

研究了一类具有非线性传染率的SEIQR流行病数学模型,得到了疾病灭绝与否的基本再生数R_O,当R_O≤1时,无病平衡点全局渐近稳定,且疾病最终消亡;当R_O>1时,惟一地方病平衡点全局渐近稳定.     

具有时滞的Hopfield人工神经网络动力系统模型的全局渐近稳定性

Hopfield人工神经网络动力系统模型平衡点的全局渐近稳定性在网络记忆以及最优化等领域具有广泛的应用。本文中,作者研究了一类具有时滞的Hopfield人工神经网络动力系统,通过构造Liapunov泛函的方法,获得了其平衡点全局渐近稳定和局部渐近稳定的充分判定条件。所给出的判定条件只依赖于系统本身的拳数参数和传递函数以及系统中出现的部分时滞。同时,当系统的自身反馈项为负时,此自身反馈项对于系统的稳定性起到稳定化的作用。此外,数值模拟表明时滞的变化对于系统的稳定性具有重要的影响。可破坏系统的稳定性。进而产生周期振动或更为复杂的非线性现象。     

食饵有病的生态-流行病模型的稳定性研究

在考虑捕食者捕食染病的食饵对自身的不利作用的基础上建立了食饵有病的生态-流行病模型,得到了系统平衡点局部渐近稳定的充分条件;讨论了系统的非负不变性、解的有界性,并在此基础上研究了边界平衡点的全局稳定性,得到了平衡点全局稳定的充分条件。     

Malaria model with periodic mosquito birth and death rates

In this paper, we introduce a model of malaria, a disease that involves a complex life cycle of parasites, requiring both human and mosquito hosts. The novelty of the model is the introduction of periodic coefficients into the system of one-dimensional equations, which account for the seasonal variations (wet and dry seasons) in the mosquito birth and death rates. We define a basic reproduction number R ₀ that depends on the periodic coefficients and prove that if R ₀<1 then the disease becomes extinct, whereas if R ₀>1 then the disease is endemic and may even be periodic.     

具反馈控制的两种群竞争系统的持续生存性与周期解

讨论了一类具反馈控制的两种群竞争模型,获得了其存在唯一,全局渐近稳定周期解的充分条件。     

多时滞三种群捕食模型的持久性和全局渐近性

研究了一类多时滞非自治三种群捕食模型的持久性和全局渐近稳定性,分别利用比较原理和构造Lyapunov函数方法得到了模型持久生存与全局渐近稳定性的充分条件,并举例说明定理的可行性且利用Matlab绘出图像.     

The role of transmissible diseases in the Holling-Tanner predator-prey model

Transmissible diseases are known to induce remarkable major behavioral changes in predator-prey systems. However, little attention has been paid to model such situations. The latter would allow to predict useful applications in both dynamics and control. Here the Holling-Tanner model is revisited to account for the influence of a transmissible disease, under the assumption that it spreads among the prey species only. We have found the equilibria and analyzed the behavior of the system around each one of them. A threshold result determining when the disease dies out has been identified. We also investigated the parametric space under which the system enters into Hopf and transcritical bifurcations, around the disease free equilibrium. The system is shown to experience neither saddle-node nor pitch-fork bifurcation. Global stability results are obtained by constructing suitable Lyapunov functions.     

On the global stability of a generalized cholera epidemiological model

In this paper, we conduct a careful global stability analysis for a generalized cholera epidemiological model originally proposed in [J. Wang and S. Liao, A generalized cholera model and epidemic/endemic analysis, J. Biol. Dyn. 6 (2012), pp. 568–589]. Cholera is a water- and food-borne infectious disease whose dynamics are complicated by the multiple interactions between the human host, the pathogen, and the environment. Using the geometric approach, we rigorously prove the endemic global stability for the cholera model in three-dimensional (when the pathogen component is a scalar) and four-dimensional (when the pathogen component is a vector) systems. This work unifies the study of global dynamics for several existing deterministic cholera models. The analytical predictions are verified by numerical simulation results.     

具有边疆时滞和扩散的非自治Holling捕食系统的持续生存

本文给出了在具有连续时滞和Ⅱ类功能性反应及扩散的非自治捕食系统中，种群持续自下而上，周期解存在及全局渐近稳定的充分条件。     

Stable periodic solutions for two species,density dependent coevolution

This paper studies a four dimensional system of time-autonomous ordinary differential equations which models the interaction of two diploid, diallelic populations with overlapping generations. The variables are two population densities and an allele frequency in each of the populations. For single species models, the existence of periodic solutions requires that the genotype fitness functions be both frequency and density dependent. But, for two species exhibiting a predator-prey interaction, two examples are presented where there exists asymptotically stable cycles with fitness functions only density dependent. In the first example, the Hopf bifurcation theorem is used on a two parameter, polynomial vector field. The second example has a Michaelis-Menten or Holling term for the interaction between predator and prey; and, for this example, the existence and uniqueness of limit cycles for a wide range of parameter values has been established in the literature.     

Almost periodic solution of non-autonomous Lotka-Volterra predator-prey dispersal system with delays

This paper studies a non-autonomous Lotka-Volterra almost periodic predator-prey dispersal system with discrete and continuous time delays which consists of n-patches, the prey species can disperse among n-patches, but the predator species is confined to one patch and cannot disperse. By using comparison theorem and delay differential equation basic theory, we prove the system is uniformly persistent under some appropriate conditions. Further, by constructing suitable Lyapunov functional, we show that the system is globally asymptotically stable under some appropriate conditions. By using almost periodic functional hull theory, we show that the almost periodic system has a unique globally asymptotical stable strictly positive almost periodic solution. The conditions for the permanence, global stability of system and the existence, uniqueness of positive almost periodic solution depend on delays, so, time delays are "profitless". Finally, conclusions and two particular cases are given. These results are basically an extension of the known results for non-autonomous Lotka-Volterra systems.     

具有三个年龄阶段的单种群自食模型

建立并研究了两个具有三个年龄阶段的单种群自食模型．这篇文章的主要目的是研究时滞对种群生长的作用,对于没有时滞的的模型,我们利用Liapunov函数,得到了系统平衡点全局渐近稳定的充分条件;而具有时滞的的模型,我们得到,随着时滞T增加,当系数满足一定条件时,正平衡点的稳定性可以改变有限次,最后变成不稳定;否则,时滞模型的正平衡点的稳定性不改变。