本文给出了延迟微分方程数值解的稳定性分析。
This paper deals with the stability analysis of numerical methods for the solution of delay differential equations.
本文旨在对非线性系统解的稳定性态进行分析和研究。
This thesis aims to analyze the stability properties of solutions of nonlinear systems.
主要讨论超松弛迭代法反演震源破裂过程解的稳定性。
This article discusses the stability of source rupture process inversion by successive over-relaxation iteration method.
利用中心流形约化方法证明了霍普夫分歧解的稳定性。
By using the method of centre manifold, the stability of the Hopf bifurcations is also proven.
叙述了输入信号与L_1模反褶积解的稳定性的关系。
The. Relationship between input signal and stability of L1 norm deconvolution is described.
本文从理论上分析了二维能量平衡气候模式解的稳定性。
The stability of the climatic solution in two-dimensional energy balance model is theoretically analysed.
本文讨论了具有两个非线性项的四阶方程零解的稳定性问题。
In this paper, the problem about the stability of the zero solution of a set of four-order equations with two nonlinear terms is discussed.
并讨论了当决策者调整愿望偏好时,灰线性规划解的稳定性。
The stability of the solution of grey linear programming is discussed.
本文研究了具有时滞的细胞神经网络周期解存在性和平凡解的稳定性问题。
In this paper, the problem of periodic solutions and stability of Cellular Neural Networks with delay is studied.
采用谐波平衡原理进行系统的基波稳态响应求解,并讨论解的稳定性条件。
HBM is used to obtain the fundamental resonance response, and the stability conditions of the steady state solution are determined.
用行波变换方法和分叉理论研究里非线性薛定谔方程的定常解和定常解的稳定性。
The steady solution and its stability of Nonlinear Schrdinger Equation (NLSE) are studied by means of traveling wave transformation and bifurcation theory.
以流体流速作为变化参数,运用稳定性理论分析了平衡点附近定常解的稳定性问题;
Taking the fluid velocity as changing parameter, the stability of steady-state solution near the equilibrium points is analyzed by using Theory of Stability.
利用泛函分析的技巧讨论了一类对具有连续时滞非线性积分微分方程周期解的稳定性。
The stability of periodic solutions of a kind of nonlinear integral-differential equations with continuous delay is discussed in this paper mainly by the method of functional analysis.
在广义延迟系统渐近稳定的前提下,分析了用块方法求解广义延迟系统数值解的稳定性。
On the basis of the asymptotic stability of generalized delay differential equations(GDDEs), the numerical solutions of one block methods for GDDEs were analysed.
为了讨论这些解的稳定性,必须在这些解的基础上叠加一个小扰动,并分析小扰动的演化。
In order to discuss the stability of these solutions, a perturbation must be add to these solutions, and the evolution of the perturbation should be analysed.
然后运用线性算子的扰动理论和分歧解的稳定性理论证明出共存解在适当条件下是稳定的;
Second, some results of local stability for the coexistence solutions are obtained by the perturbation theorem for linear operators and the stability theorem for bifurcation solutions.
利用李雅普诺夫函数和微分不等式探讨带扩散Schoner模型的概周期解的稳定性问题。
The almost periodic solution of non-autonomous diffusion Schoner models is discussed through Liapunov function and differential inequalities.
方法运用极值原理、上下解方法、分歧理论、线性算子的扰动理论和分歧解的稳定性理论进行研究。
Methods the maximum principle, monotone method, bifurcation theory, the perturbation theorem for linear operators and the stability theorem for bifurcation solutions were used.
本文导出的熵变量形式QPNS方程具有对称性和自动满足热力学第二定律,这将提高解的稳定性。
The QPNS equations in entropy variables derived in the present paper have the symmetrization and satisfy the second law of thermodynamics automatically that can improve the stability of the solution.
在工程技术中,最优化问题的解通常都是用数值计算方法求得,因此,解的稳定性研究就显得非常重要。
The solution of optimization on engineering technique is usually obtained through numerical Calculation. Therefore, the study of the solution stability is highly important.
研究表明:基于灰色规划原理构建的最佳配置模型在解的稳定性、模型的适应性上要优于同类线性规划模型。
The study shows the optimal collocation model based on the gray layout theory excels in answer's stability and model's adaptability by compared with the similar linear programming models.
本文主要研究一类多步长非线性采样控制系统,探讨系统进行采样过程中产生量化误差的情况下其解的稳定性质。
In this paper, we mainly study a kind of multirate nonlinear sampled-data control systems, and discuss the stability properties of its solution while its sampler produces quantization during sampling.
用速率方程的方法研究了双光子激光器和双光子激光放大器,得到了双光子激光器的基本方程,同时研究了稳态解的稳定性问题。
Two-photon lasers and laser amplifiers are studied by using the rate equations. The steady solution is obtained and its stability is analysed.
在分析与探讨脉动轴向力作用下梁的参数共振问题时,本文取四种边界条件来分析第二阶次谐波参数共振的稳定区域,确定了零解与非零解的稳定性。
This paper investigates the subharmonic parametric resonance problems of a symmetric orthotropic laminated rectangular plate with simply supported edges by the use of the singularity theory.
并利用最小势能原理讨论了空穴分岔方程的解在各个参数区域内的稳定性,解释了空穴生成的突变现象。
Stability of solutions of the cavitated bifurcation equation is discussed in each region by using the minimal potential principle, and the catastrophic phenomenon of cavity formation is explained.
重新解释界定的合作解,本质上是具有内外稳定性质的一种纳什均衡。
The cooperative solution newly explained and defined is in fact a Nash Equilibrium in nature, which is stable both internally and externally.
模拟实验表明此方法能比较快速的找到最优解,且具有良好的稳定性和收敛性。
Imitate experiment expresses this method can find out the superior solution quickly, and have a good stability and the astringency.
模拟实验表明此方法能比较快速的找到最优解,且具有良好的稳定性和收敛性。
Imitate experiment expresses this method can find out the superior solution quickly, and have a good stability and the astringency.
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