1) asymptotical region
渐近区域
2) regional asymptotic stability
区域渐近稳定性
1.
The regional asymptotic stability (or attractability) and uniformly persistence are discussed.
研究了一类具有标准传染率的两种群相互竞争的自治类型的S(易感者) I(染病者) S(易感者)传染病模型,讨论了平衡点的区域渐近稳定性(或吸引性)和系统的一致持续生存。
2.
The regional asymptotic stability of the equilibrium points is discussed.
研究了一类两种群相互竞争的自治类型的SIS(易感者 染病者 易感者 )传染病模型 ,讨论了平衡点的区域渐近稳定性 。
3) asymptotic stability region
渐近稳定区域
1.
The authors have established a quantitative stability result of quadratic delay difference systems, in which the delay r >0 is an arbitrary integer, also, for quadratic delay difference systems of simple form they have given the estimates of stability region and asymptotic stability region with the delay r<r * , where r * is the maximum admissible value of delay under certain conditions.
曾建立了二次式时滞差分系统定量的稳定性结果,其中时滞r>0是任意的整数;也曾对形式较为简单的二次式时滞差分系统作出了时滞r<r*时的稳定区域和渐近稳定区域估计,其中r*是在一定条件下的最大可接受的时滞。
2.
That is,under certain conditions one can not only confirm the uniform stability and uniform asymptotic stability of the zero solution,but also estimate the corresponding stability region and asymptotic stability region.
初步建立了二次式时滞差分系统定量的稳定性理论,即在一定的条件下,不仅可以断言零解的一致稳定性和一致渐近稳定性,且可以估计出相应的稳定区域和渐近稳定区域。
3.
This paper discusses discrete_delay singular systems by using Lyapunov s method and estimates the size of the uniformly stable region and asymptotic stability region around zero for discrete_delay singular systems.
利用Lyapunov方法讨论离散滞后广义系统 ,并给出了该类系统的零解一致稳定区域和渐近稳定区域的大小估计 。
4) error-in-responses
渐近置信区域
1.
Aim To study partially linear error-in-responses models.
结果得到了W ilks定理的非参数形式,定理用来构造参数向量的渐近置信区域。
5) asymptotic stabilizable domain
渐近镇定域
1.
<Abstrcat> Discusses the asymptotic stable domain and asymptotic stabilizable domain of quadratic system.
研究了二次系统的渐近稳定域和渐近镇定域。
6) asymptotic stability domains
渐近稳定域
1.
By constructing the appropriate v function,the positive invariance properties and positive precompactness of a kind of nonlinear systems was proved,which is used to research the stability and the attractiveness,the criterion of the estimates of asymptotic stability domains was derived,the result of Liapunov asymptotic stability domains in previous document was improved.
通过构造合适的v函数,证明了一类非线性系统的正不变性质和正准紧性质,利用该系统的正不变性质和正准紧性质研究了系统的稳定性和吸引性,得到了该系统渐近稳定域估计的判别条件,推广并改进了已有文献中Liapunov渐近稳定域的结果。
补充资料:渐近公式
渐近公式
asymptotic formula
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参考词条