对于某些服务器来说,找出展开式目录中触发了热重部署的确切文件是很有意义的。
With some servers it makes sense to find out exactly what triggers the hot redeploy in the exploded directory.
它可以用于宏模式和展开式中。
It can be used both in the macro pattern and in the expansion.
此方程可用泰勒展开式导出。
它的展开式将给出图g的全部有向树。
利用重力场的泰勒级数展开式,可求出重力异常的四次导数。
The forth derivative of gravity anomaly can be obtained by Taylor series expansion of gravity field.
重正化群方法已成为获得这类问题精确解的一致有效渐近展开式的有用工具。
Renormalization group method is an effective tool to obtain the uniformly valid asymptotic expansion exact solutions of this kind of problems.
此法提供了推导正交坐标系下电并矢格林函数的完备展开式的一种有效途径。
This method offers an effective way to derive the complete expansions of the electrical dyadic Green 's functions in orthogonal coordinates.
这不过是二项展开式。
结果表明,对于部分有限差分方程,在用启示性方法分析其计算稳定性的过程中最好采用从差分方程推导来的展开式以期得到较合理的结果。
It shows that for some difference equations, we'd better adopt the expansion equations in the process of the heuristic method being applied to these difference equations.
得到了问题解的一致有效的渐近展开式。
The uniformly valid asymptotic expansion of solution for the problem is obtained.
首先讨论了隐差分解与显差分解的关系,并利用差分解的渐近展开式构造差分校正解来提高精度。
The relation between the explicit difference solution and the implicit one is established. A correction difference solution with higher accuracy is constructed by the use of asymptotic expansion.
降低漏源极直流母线电压影响干扰信号按傅立叶展开式的全部频带。
The decrease of the drain-source voltage or bus voltage affects the entire spectrum evenly according to Fourier theory.
新方程推导中对数展开式的误差较小,新方程计算出的优化萃取比精度较高。
With new equation the error rate of the expansion approximation equation of logarithm is small, the calculated optimized extraction factors are more precise.
本文给出单调布尔函数的一类范式——单调积之和展开式以及构造它的算法,该算法的实现是很直观的。
The monotone sum of product expansions of monotone Boolean functions and its constructive algorithm are presented in this paper. The implementation of the algorithm is very intuitive.
首先,设计基于带符号阶乘展开式的椭圆曲线标量乘和多标量乘算法。
Firstly, based on the signed factorial expansions,. The fast algorithms for scalar multiplication and multi-scalar multiplication on elliptic curves are presented.
对地图投影学中经常遇到的等量纬度正反解展开式进行了新的研究。
The expansions of conformal latitude in map projection are studied in this paper.
在此基础上提出了基于K图的逻辑函数oc展开式在固定极性下化简的新方法。
Based on it, a graphic method simplifying the OR-Coincidence (OC) expansions of a logic function under fixed polarity by using K-map is presented.
在适当条件下,获得了配置解的导数在结点集上成立的精细误差展开式。
It is shown that the first derivative of the corresponding collocation solution admits, under suitable assumptions, a precise error expansion at the knots.
基于展开镜结构工作原理,运用有限元方法分析了展开式反射镜单元的裸镜及其支撑方案。
Based on the deployable structure of a mirror and the operation principle, the finite element method was used to analyze the unit naked mirror and some different mirror support schemes.
第一种推广为,将方程解的展开式扩展到负指数,可以求得方程的负指数的椭圆函数解。
The first generalization is that the expansion of solutions of equations is generalized to negative exponent, and negative exponential elliptic function solutions are obtained.
给出了一种不含导数的函数展开方法,在函数的连续区间内构造一个无穷级数作为函数的展开式。
To construct a progression at infinity as an expansion of function in the continuous interval, a good result was achieved.
本文讨论了序参量是多变数情况下相变过程中自由能展开式应保留的项数。
The term numbers of free energy expansion are studied during the phase transition process when the order parameter is more than one variable.
但将它的分母作泰勒展开,经过重新整理,将那些大小不一致的项消去后,得到的新微扰展开式是逐项大小一致的。
However, when its denominator was expanded in a Taylor series, a size consistent perturbation expansion was obtained, for the size inconsistent terms turned out to be cancelled out.
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 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.
地球扰动位的球谐展开式表示是地球重力场模型应用最广泛的一种表示方法。
The harmonic series formula of the Earths disturbing potential is the most extensive applicable expression for the Earths gravity field model.
提出一种通过二项展开式设计任意阶模拟分抗电路的新方法。
A new method in design of arbitrary order analog fractance circuit based on binomial expansion is presented.
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。
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.
网壳结构折叠展开式提升过程涉及机构运动分析,动力效应十分明显。
The dynamic lifting process of deployable reticulated shell structures was a mechanism motion process, which has noticeable dynamic effect.
在估计过程中交直流方程交替求解,并对直流方程采用保留泰勒级数展开式中所有高阶项的方法。
In the process of state estimation, AC and DC equations are solved in turn, keeping all high order derivatives of Taylor series for the DC equation.
在估计过程中交直流方程交替求解,并对直流方程采用保留泰勒级数展开式中所有高阶项的方法。
In the process of state estimation, AC and DC equations are solved in turn, keeping all high order derivatives of Taylor series for the DC equation.
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