The asymptotic behavior of linear impulsive differential equations is studied.
研究了非线性脉冲微分方程零解的最终稳定性。
The location of turning point and the asymptotic behavior of solution are studied.
研究了转向点的所处位置,以及问题解的渐近性态。
We investigate how the three factors influence the asymptotic behavior of solutions.
我们分析了这三个因子对解的渐近行为的影响。
The asymptotic behavior for Complex Ginzburg-Landau equation with delay is discussed.
讨论了具有时滞的复金兹堡-朗道方程的渐进性态。
The asymptotic behavior of the drift diffusion model for semiconductor devices is studied.
研究半导体器件的漂移-扩散模型方程解的渐近性。
Under suitable conditions the asymptotic behavior of the generalized solution for the problems are studied.
在适当的条件下,研究了问题广义解的渐近性态。
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。
Study about the first mean value theorem for integrals, which obtain a new results on the mean value asymptotic behavior.
研究积分第一中值定理,获得了其中值 渐近性的一个新结果。
Our results about the stability and long time asymptotic behavior of nonlinear waves are in some sense different from theirs.
只是他们得到的非线性波的稳定性和长时间渐近性结果与本文不一样。
Using the comparison principle, the existence, uniqueness and its asymptotic behavior of solution for the problem are studied.
利用比较原理,研究了问题解的存在性,唯一性及其渐近性态。
We study the asymptotic behavior for price and optimal exercise boundary of American option when the expiry date goes to infinity.
讨论美式期权价格及最佳实施边界在执行日期趋于无穷大时的渐近性态。
Under suitable conditions the existence, uniqueness and asymptotic behavior of the generalized solution for the problems are studied.
在适当的条件下,研究了问题广义解的存在、唯一性及其渐近性态。
The understanding of the asymptotic behavior of dynamical systems is one of the most important problems of modern mathematical physics.
理解动力系统的渐近行为是研究无穷维动力系统的主要内容,也是当代数学物理的重要问题之一。
In the last chapter we study the asymptotic behavior of solutions to the model when the signal function is a nonlinear constant function.
第三章研究信号函数为分段常数非线性函数时模型解的渐近行为。
In this paper, we consider the oscillatory and asymptotic behavior of two kinds of two order impulsive functional differential equations.
本文主要讨论了两类二阶脉冲时滞微分方程的渐近性态及振动性。
The asymptotic behavior theorems of the "midpoint" of remainder in the midpoint formula and their applications are presented in this paper.
给出中点公式余项“中间点”的渐进性定理及其应用。
We studied the asymptotic behavior of solutions to third order Poincaré difference equation whose characteristic equation has multiple roots.
研究了三阶Poincaré差分方程解的渐近性质。这种差分方程对应的常系数线性差分方程的特征方程有重根。
This paper is devoted to the investigation of the asymptotic behavior for a class of nonlinear parabolic partial functional differential equations.
本文研究一类非线性抛物型偏泛函微分方程的渐近行为。
This paper is concerned with of asymptotic behavior for a family of neutral delay nonlinear difference equations, which improves some known results.
本文研究一类非线性中立型时滞差分方程的非振动解的渐进性,改进了相关的结果。
With regard to the theory of impulsivedifferential system, this dissertation focuses on the asymptotic behavior of the impulsivedifferential system.
在脉冲微分系统的理论方面,重点研究了脉冲微分系统的渐近性。
By using the method of multiple scales and the comparison theorem, the asymptotic behavior of solution for the initial boundary value problem is studied.
利用多重尺度法和比较定理,研究了初始边值问题解的渐近性态。
It is shown that for all the angular momentum states the fermion's radial wave functions have the physically reasonable asymptotic behavior at the origin.
结果表明,对所有角动量态,费密子径向波函数具有物理上合理的原点渐近行为。
This paper is concerned with the asymptotic behavior and existence of positive solutions for a class of higher order nonlinear neutral difference equation.
研究了一类高阶非线性中立型差分方程正解的存在性和渐近性。
A asymptotic behavior of the dynamics is given and it indicates that initial, delay and threshold are main sources for the asymptotical behavior of the dynamics.
所获结果表明系统的动力性态取决于初值、时滞及阈值的大小。
Since the analysis and control of asymptotic behavior is main objective to the design project, it is necessity to study the stochastic large-scale system with delay.
在随机时滞大系统的系统分析中,系统的渐近行为分析和控制是工程设计的主要目标。故而,研究时滞随机大系统是很有必要的。
Under suitable conditions, using the theory of differential inequalities, the existence and asymptotic behavior of solution for the boundary value problems are studied.
适当的条件下,利用微分不等式理论,讨论了原边值问题解的存在性和渐近性态。
Under suitable conditions, using the theory of differential inequalities, the existence and asymptotic behavior of solution for the boundary value problems are studied.
适当的条件下,利用微分不等式理论,讨论了原边值问题解的存在性和渐近性态。
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