This paper establishes a delay differential inequality with varying coefficient and varying delay.
本文首先建立一个变系数变时滞微分不等式。
This article by seeking to prove propositions, set forth the application of differential inequality.
本文从几个命题的证明来阐述微分不等式的应用。
Global exponential stability theorems are given by using a method based on delay differential inequality.
在分析无条件全局指数稳定性时,我们将时滞微分不等式引入到稳定性的研究中。
And the asymptotic behavior of solution for the problem is obtained by using the theory of differential inequality.
利用微分不等式理论得到了问题解的渐近性态。
Among ordinary differential equation equations, differential inequality is a useful tool which helps research on properties of equation-solving.
在常微分方程论中,微分不等式是研究方程解的各种属性的有用工具。
Two-point boundary value problems of second order mixed type integro-differential-difference equation is studied by means of differential inequality theories.
基于时滞微分不等式的方法,提出此网络在平衡点的渐近指数稳定的充分条件。
Two-point boundary value problems of second order Hammerstein type integro-differential-difference equation is studied by means of differential inequality theories.
基于时滞微分不等式的方法,提出此网络在平衡点的渐近指数稳定的充分条件。
This paper proves the existence, uniqueness and periodic problem of the solution about second order singular perturbation system by using the differential inequality.
本文用微分不等式证明了二阶奇摄动系统解的存在性、唯一性和周期性。
By establishing a functional differential inequality, some sufficient conditions are obtained for the oscillation of solutions of certain partial functional differential equations.
通过建立泛函微分不等式,研究了一类高阶中立型偏泛函微分方程解的振动性。
Using the method of boundary layer correction and the differential inequality theory, we prove the existence theorem of solutions and construct the uniformly valid asymptotic expansions of.
我们利用边界层校正法以及微分不等式理论证明了解的存在定理,并构造出其解的一致有效渐近展开式。
Using the fixed point principle and the theory of differential inequality, we prove the existence of the solution and an uniformly valid asymptotic expansions of the solution is given as well.
利用不动点原理及微分不等式理论,我们证明了边值问题解的存在性,并给出了解的一致有效渐近展开式。
The sufficient conditions of exponential stability about this system are obtained by matrix measure and delay differential inequality, the results of the paper [1~3] are extended and improved.
基于文[1]中的微分差分不等式和有关结果,用统一的方法得到了有界性和稳定性的充分条件。
Differential when the vehicle is moving or turning in inequality when the road to drive around to different speed wheels rolling on both sides of drive wheel that is for pure rolling motion.
差速器是当汽车转弯行驶或在不平等路面上行驶时,使左右驱动车轮以不同的转速滚动即保证两侧驱动车轮作纯滚动运动。
In this paper, a delay integral in quality are established. Applying this inequality to study the stability of large scale neutral differential systems, some simple stability criterion are obtained.
本文首先建立起一个时滞积分不等式,然后,用这一不等式研究中立型微分大系统的稳定性,获得了简洁的稳定性充分准则。
The stable degree of linear neutral differential systems is studied. Using the method of inequality analysis, some criteria for stable degree are obtained.
研究线性中立型系统的稳定度问题。通过不等式分析的手段,建立起线性中立型系统的稳定度的充分准则。
In the article, a simple and elementary proof of monotonicity is given for the so-called extended mean values using Tchebycheff s integral inequality and the mean-value theorem for differential.
本文利用切比雪夫积分不等式和微分中值定理,对所谓的双参数拓广平均的单调递增性给出一种简单的证明。
This paper introduces some methods for proving the function inequality, integral inequality and differential middle value inequality which are frequently seen in the higher mathematics.
本文就高等数学中常见的函数不等式,积分不等式以及微分中值不等式给出了若干种证明方法。
Firstly, the differential equations for describing the energy equilibrium of growing deformable body and the entropy inequality were discussed briefly.
首先列出了描述生长变形体能量平衡的微分方程以及熵不等式;
This differential inclusion system is described by a non-affine system with uncertainty. Based on the dissipation inequality, the robust control for such a non-affine uncertain system is analysed.
首先用一非仿射不确定系统来描述这一微分包含系统,基于耗散理论分析了这一类非仿射不确定系统的鲁棒控制问题。
This differential inclusion system is described by a non-affine system with uncertainty. Based on the dissipation inequality, the robust control for such a non-affine uncertain system is analysed.
首先用一非仿射不确定系统来描述这一微分包含系统,基于耗散理论分析了这一类非仿射不确定系统的鲁棒控制问题。
应用推荐