齐次,略厚,但光滑而富有弹性。
边界条件,齐次性,求解技巧。
城市年用水量是一个齐次马尔可夫链。
A city's yearly water consumption is a homogeneous Markov chain.
在每个价格水平下,需求服从非齐次泊松分布。
Demand follows a non-homogeneous Poisson process at each price level.
一种重要的情形是常系数二阶线性齐次微分方程。
An important case is the linear homogeneous second-order differential equation with constant coefficients.
采用齐次马尔可夫链分析法确定教学效果的好坏。
The paper appraises the effect of teaching using Homogeneous Markov chains analysis method.
通过讨论齐次群上的一些性质,从而得到本文的结果。
Through discussing some natures of homogeneous group, we obtained the results of this thesis.
在第三章中,给出了非齐次抽象时滞方程的一些结果。
In the third chapter, some results of inhomogeneous abstract delay equations are given.
主要是证明了仿齐次函数为亚齐次函数的一个充分条件。
Mainly, it proves that a sufficient condition of a parahomogeneous function is a subhomogeneous function.
最后,利用齐次坐标讨论了NURBS曲线的延伸算法。
Finally, extension algorithms for NURBS curves are discussed by means of homogeneous coordinates.
常数变易法是求解非齐次线性微分方程的一种有效方法。
Methods of constant variation are an efficient solution to all nonlinear differential equations.
有强迫函数作用于上的,则系统必须作为非齐次的来考虑。
With forcing functions acting, a nonhomogeneous system must be considered.
给出了一个判定齐次线性方程组存在全非零解的充分必要条件。
We present a necessary and sufficient conditions of homogeneous linearity equations existing all-nonzero solution.
本文考虑可数状态离散时间齐次马氏链平稳分布的存在与唯一性。
Existence and uniqueness of the stationary distribution of countable discrete time homogeneous Markov chains is discussed in this paper.
借助于辅助变量,或辅助平面,提出了齐次线性方程组的图解法。
With the help of auxiliary variables or plane, a graphical solution for homogeneous linear equations is presented.
采用增广矩阵的方法将非齐次的模型方程化为齐次的形式再求解。
Using the method of augmented matrix, the model equations are changed from nonhomogeneous form to homogeneous form, to be solved.
给出了常系数非齐次线性微分方程特解的一种新的公式化求解方法。
This paper given the formula of solution for nonhomogeneous linear differential equation with constant coefficients.
同时考虑了齐次泊松过程与复合泊松过程在保险业风险管理中的应用。
At the same time, we investigated some applications of the homogeneous Poisson process and the compound Poisson process in insurance.
由于叠加原理的破坏,主张将非线性生产函数替代传统线性齐次函数。
The traditional linear function should be displaced by nonlinear function because of the breakage of superposition principle.
讨论了带非负扰动的临界非齐次多重调和方程多解存在性和非存在性。
This paper deals with the existence and nonexistence of solutions for a critical semilinear polyharmonic equation with a non-negative perturbation.
本文对这一几何问题利用齐次线性方程组给予了代数方法的又一种证明。
This article given another kind of proof using algebra method by system of homogeneous linear equations to the geometry question.
给出了求齐次线性方程组正交的基础解系的一个简便方法和一个应用实例。
A simple method for the orthogonal fundamental solution of homogeneous linear equation system and the example in its application are given.
利用齐次离散时间马尔可夫链模型描述了大地震沿一条活动断裂带的迁移过程。
A homogeneous discrete-time Markov chains model is used to characterize migration of large earthquakes along an active fault zone.
并通过变量代换,将原问题的非齐次边界条件转化为齐次边界条件的边值问题。
Through the change of variables, the original problem with inhomogeneous boundary condition is reduced to the boundary value problem of homogeneous boundary condition.
运用并矢代数方法,直接求解时谐电磁场的非齐次波动方程,并给出应用实例。
Using dyadic method, non-homogeneous wave equations of time-harmonic electromagnetic field are solved directly, several examples are calculated.
并且给出了主要结果在特殊的序贯次序统计量模型以及非齐次纯生过程中的应用。
Applications in some special models of sequential order statistics and in the NHPB process are also presented.
本文利用物理学中常见的热传导理论,形象地阐释了二阶齐次线性偏微分方程的本质。
With the ordinary theory of Heat Exchange in physics this essay visualizes the essence of second-order homogenous linear partial differential equations.
这样,轴对称正交异性圆环壳的齐次解第一次有了达到薄壳理论精度的完全的渐近展开。
Thus, the fully asymptotic expansion of the homogeneous solution within the accuracy of theory of thin shells is obtained.
在二次损失函数下,研究了增长曲线模型误差方差的非齐次二次型估计的可容许性问题。
The admissibility of non-homogeneous quadratic form estimate of variance on the growth curve model was studied under quadratic loss function.
在二次损失函数下,研究了增长曲线模型误差方差的非齐次二次型估计的可容许性问题。
The admissibility of non-homogeneous quadratic form estimate of variance on the growth curve model was studied under quadratic loss function.
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