It enriches the NMM dynamic analysis methods.
这丰富了数值流形方法的动力计算方法。
Usually the numerical manifold method (NMM) is based on meshes of three - or four-node element.
数值流形方法常基于有限元法三结点或四结点单元。
In each iteration of VBIM, a numerical mode-matching method (NMM) is applied to solve forward solve.
正演数据则利用高效的数值模式匹配方法获得。
So we should implement the method of weighted residuals to derive the governing equations of the NMM.
本文研究了如何从加权残数法出发建立拉普拉斯方程数值流形方法的求解方程。
A new type of numerical mode-matching (NMM) theory is applied into numerical simulation of common resistivity logs.
应用一种新型的数值模式匹配(nmm)理论快速完成了普通电阻率测井的数值模拟。
The improved NMM method, avoiding complicated matrix inverse, is easy to understand and has concise physical meaning.
这一方法避免了原NMM中复杂的求逆运算,思路简单,其物理意义也更明确。
The Numerical Manifold Method (NMM) is one of important numerical methods to model rock mechanics problems at present.
数值流形方法是目前岩石力学分析的主要方法之一。
Convergence rates are also studied with examples and they are approximately equal in the NMM and the conventional FEM analyses for both material cases.
利用算例分析了用这种方法计算的两套覆盖函数的收敛率。
The numerical manifold method of Laplace equation was presented, it was also more general than the minimum potential energy principle to obtain the governing equations of the NMM.
本文研究了如何从加权残数法出发建立拉普拉斯方程数值流形方法的求解方程。
By the experiments for two-layer and three-layer homogeneous media, this method is verified to be highly precise and effective comparing with FEM method and the previous NMM method.
用此方法对均匀介质、两层介质、三层介质进行了实验,并将其结果与解析法、原nmm方法和有限元方法进行了对比,验证了此方法的有效性。
In this paper the numerical solution of Green's function of potential in 2-d arbitrary inhomogeneous media with axial symmetry has been given by using the numerical mode matching (NMM) theory.
利用数值模式匹配理论,对具有轴对称的任意二维非均匀介质中位场的格林函数给出数值解。
In this paper the numerical solution of Green's function of potential in 2-d arbitrary inhomogeneous media with axial symmetry has been given by using the numerical mode matching (NMM) theory.
利用数值模式匹配理论,对具有轴对称的任意二维非均匀介质中位场的格林函数给出数值解。
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