EFGM has been successfully used to solve elastic problems.
无单元伽辽金法现已成功地应用于弹性力学问题。
The mathematical basis of EFGM is moving least squares method.
无网格伽辽金法的数学基础是移动最小二乘法。
In EFGM, only nodal data are necessary compared with FEM which need elements.
该法只需要节点信息,无需网格单元。
The element-free Galerkin method(EFGM) is improved with partition of unity quadrature(PUQ).
使用单位分解积分,对传统的无单元伽辽金方法进行改进。
Research focused on the application of EFGM considering the existence of CFRP on the crack growth.
着重研究了考虑CFRP存在的无网格伽辽金法在斜置裂纹扩展中的应用。
The element-free Galerkin (EFGM) method is extended to solving the geometrically nonlinear problem.
无单元伽辽金法(EFGM)求解几何非线性问题。
The examples show that the EFGM can solve some special problems that are difficult for the finite element method.
用计算实例说明了无网格伽辽金方法在解决结构大变形问题上的优势。
In this paper the boundary singular kernel method is used in EFGM to impose the essential boundary conditions exactly.
本文将边界奇异权方法运用于EFGM中,实现了本质边界条件在节点处的精确施加。
This is of disadvantage in EFGM for it complicates the imposition of essential boundary conditions and the application of point loads.
因此,本质边界条件的施加和集中载荷的处理变的复杂。
From the energy standpoint, the amended EFGM equations has been got on the basis of have deduced the deformation energy include the CFRP.
从能量的角度出发,推导了考虑碳纤维布(CFRP)存在的修正变形能,整理得到修正后的EFGM控制方程。
This is a disadvantage of EFGM as it suffers from problems in the imposition of essential boundary conditions and the application of point loads.
由于移动最小二乘法的近似函数不一定精确地通过计算点,从而使本质边界条件的施加和集中载荷的处理变得复杂。
The stability of a rock-salt roadbed with two circular cavities is analyzed as a planar strain stress problem with the element-free Galerkin method(EFGM).
数值结果表明,EFGM对于解决含两个孔洞的应力集中问题是有效且灵活的。
The full transformation method is used to impose the essential boundary conditions, which realizes explicit implementation of the essential boundary conditions in EFGM.
采用完全变换法处理本质边界条件,实现了本质边界条件在节点处的精确施加;
By this method, it is easy to construct the EFGM matrix formulation of consolidation equations and to deal with different boundary conditions in calculation and analysis.
在计算分析中,此法容易构造固结方程的EFGM刚度矩阵和处理不同边界条件。
As a new numerical method, element free Galerkin method (EFGM) has more advantage in the solution to consolidation equation as it only needs the information of nodes rather than element.
EFGM作为一种新的数值计算方法,具有只需节点信息而无须单元的特性,故在解固结方程方面有很大的优势。
As a new numerical method, element free Galerkin method (EFGM) has more advantage in the solution to consolidation equation as it only needs the information of nodes rather than element.
EFGM作为一种新的数值计算方法,具有只需节点信息而无须单元的特性,故在解固结方程方面有很大的优势。
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