1) Global attractivity
全局吸引性
1.
The global attractivity of zero solutions for a class of functional differential equations;
一次时滞微分方程零解的全局吸引性
2.
Global Attractivity of a Nonautonomous Difference Equation with Delay;
一类非自治时滞差分方程的全局吸引性
3.
Permanence and global attractivity to a ratio-dependant mixed system with time delay;
比率型时滞混合模型的持久性和全局吸引性
2) global attractiveness
全局吸引性
1.
The sufficient conditions for the global attractiveness are obtained by use of Lyapunov functional.
研究了一类多时滞线性反馈控制Logistic模型正平衡点的全局吸引性,利用Lyapunov泛函方法得到了该模型全局吸引性的充分条件。
2.
In this paper , uniform persistence and global attractiveness of a class of three dimensional LV system with diffusion are discussed by establishing suitable Liapunov functionals,By using the differential inequlity ,we obtain the existence and uniqueness of a periodic solutio
本文通过建立适当的 L iapunov泛函 ,讨论了一类具有扩散的三维 L V系统的一致持久性和全局吸引性 ,从而获得了该系统周期解的存在唯一性。
3.
By means of exponential dichotomy,the Schauder fixed point theorem,the Grownwall inequality,it proves the existence uniqueness and the global attractiveness of the almost periodic solution.
利用指数二分性,Schauder不动点定理和Grownwall不等式,证明了一类概周期系数微分方程的概周期解的存在惟一性及概周期解的全局吸引性。
3) attractivity
全局吸引性
1.
Existence and Attractivity of Almost Periodic Solutions for a Class of Cellular Neural Networks;
一类细胞神经网络概周期解的存在性与全局吸引性
2.
Global Attractivity and Multiplity of Periodic Solution for Some Biological Mathematics Models;
几类生物数学模型正周期解的存在性及全局吸引性
3.
By constructing Liapunov functional, the existence and attractivity of almost periodic solutions of a neural network is studied as follows dxdt=-x(t)+atanh[y(t)-by(t-τ)]+I 1(t) dydt=-y(t)+atanh[x(t)-bx(t-τ)]+I 2(t) and some sufficient conditions are obtained to ensure the network has a unique almost periodic solution, and all its solutions converge to such an almost periodic solution are obtained.
通过构造Liapunov泛函 ,研究如下二元神经网络dxdt=-x(t) +atanh[y(t) -by(t-τ) ]+I1(t)dydt=-y(t) +atanh[x(t) -bx(t-τ) ]+I2 (t) 概周期解的存在性和全局吸引性 ,获得了该网络存在唯一概周期解的充分条件和所有解收敛于此概周期解的充分条件 。
4) global weak attractivity
全局弱吸引性
1.
Using Mawhin s theroy and Liapunov funtional we discuss the existence and global weak attractivity of periodic solutions for a class of functional differential equation.
利用Mawhin的迭合度理论和Liapunov泛函 ,讨论了一类泛函微分方程的周期解的存在性和全局弱吸引性。
5) global attraction
全局吸引
1.
We demonstrate that the disease-free periodic solution is a global attraction if the reproductive number of infective is less than one.
证明了当传染病再生数小于1时,无病周期解是全局吸引的。
2.
By using comparative theorem of impulsive differential equation and delay differential equation basic theory,sufficient conditions which guarantee the global attraction of pest-extinction periodic solution and permanence of the system are obtained.
研究了与害虫管理相关的一类捕食者具脉冲扰动与Ivlev功能性反应的时滞捕食-食饵模型;运用脉冲微分方程的比较定理及时滞泛函微分方程的基本理论,证明了该系统在一定条件下害虫灭绝周期解是全局吸引的,同时也证明了系统持久的充分条件和所有解的一致完全有界性。
6) globally attractive
全局吸引
1.
In this paper,we consider the following difference equation x(n+1)=α(n)x(n)1+β(n)x(n) and obtained the sufficient condition for the existence of globally attractive positive asymptotic almost periodic solutions.
得到了下列离散系统x(n+1)=α(n)x(n)1+β(n)x(n)全局吸引的正的渐近概周期解的存在性的充分条件。
2.
It was proved that the system can have a unique positive globally attractive almost periodic solution.
在本文中,我们考虑具时滞的扩散概周期捕食系统,其中被捕食者可在两个缀块间迁移,而捕食者被限制在其中一个缀块内,并证明了该系统存在唯一的全局吸引的正概周期解。
补充资料:连续性与非连续性(见间断性与不间断性)
连续性与非连续性(见间断性与不间断性)
continuity and discontinuity
11an父ux泊g四f“山。麻以角g、.连续性与非连续性(c。nt,n琳t:nuity一)_见间断性与不间断性。and diseo红ti-
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参考词条