在有限条法中,采用幂级数作基函数,运算较为简单、方便。
When the power series is used as the basic functions in the finite strip method, the computation becomes simple and convenient.
文摘:研究了十分一般的随机幂级数,并证明了有限级的随机幂级数几乎必然没有亏函数。
Abstract: the paper studies the random power series of general enough and proves that the random power series of finite order do not have almost surely deficient function.
并重点放在选用幂级数作为分部形态函数时对系统计算精度的影响方面。
And emphasis is laid on the effect upon the system computation accuracy by choosing power series as component shape functions.
也是函数的极值、幂级数理论等众多数学理论的基础。
Is also a function of extreme value theory, and many other mathematical theory of power series basis.
采用复变函数及摄动方法,最后以幂级数形式给出应力强度因子的计算公式。
Stress intensity factors at the craek tips are computed by complex variable functions and perturbation method and formulas are given in power series forms.
基于模态展开和幂级数展开原理,提出了一种频响函数灵敏度分析的模态展开法。
Based on the theory of modal superposition and power series expansion, a modal superposition method for the sensitivity analysis of FRF is proposed in this paper.
摘要利用由三角级数和幂级数复合构成的函数项级数的有关性质,得到了一类变系数非齐次调和方程边值问题的级数解。
In this paper by using the property of Fourier series a compound series consisting of trigonometric series and power series is established.
本文目的在综合叙述及推导复合指数函数的幂级数之系数间相关不等式。
In this paper, we describe some inequalities for the Taylor coefficients of a composite exponential function.
当指定Z为复数变元时,就有了形式幂级数的“变换”函数,即闭合形式的问题。
When Z is assigned the meaning of a complex variable, problem of "closed form" of formal power series emerges.
就此讨论一类等比级数在求幂级数的和函数以及将函数展开成幂级数时的应用。
In this paper, we discuss how to use the geometric series to find the sums of power series and to represent functions by power series.
将推广的高等代数理论融入复变函数是复变函数展成幂级数的一种新方法。
That advanced algebra theory is melt into plurality transform function is a new method by which plurality transform function is expanded into power series.
研究了复合迭代函数方程所代表的一类不变曲线的解析解,通过构造辅助方程的幂级数解,从而获得原方程的解析解。
This paper is concerned with an analytic invariant curves on a planar mapping of the iterative functional equation.
结果在拉格朗日的视野中,微积分是关于函数的一种代数形式演算,而函数是由一个解析表达式给出并且均可展成幂级数。
Results in perspective of Lagrange, the calculus was a kind of algebraic calculation of the function given by an analytical expression, which could be developed into power series.
函数的解析环域在幂级数展式中起着非常重要的作用,文章给出了确定函数解析环域的具体方法。
The analytic ring field plays an important role in the power expansion of analytic functions. In this paper the author presents a method for identifying the analytic ring field of analytic functions.
用比较直接的方法证明幂级数的和函数在收敛域内可以逐项微分的公式;并得到了计算傅立叶系数的一种简便方法。
A relatively direct method is expounded in this paper to prove the termwise differentiation of power series, and a simple method is expressed to calculate the Fourier coefficient.
第三种方法是把待求级数用基本初等函数的幂级数展开式表示出来;
The third one is to let series be expressed by basic elementary function's power series expansion;
文摘:研究了十分一般的随机幂级数,并证明了有限级的随机幂级数几乎必然没有亏函数。
Abstract: the paper studies the random power series of general enough, and proves that the random power series of finite order do not have almost surely deficient function.
文摘:研究了十分一般的随机幂级数,并证明了有限级的随机幂级数几乎必然没有亏函数。
Abstract: the paper studies the random power series of general enough, and proves that the random power series of finite order do not have almost surely deficient function.
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