无网格伽辽金法的数学基础是移动最小二乘法。
The mathematical basis of EFGM is moving least squares method.
应用无网格伽辽金法对轴对称几何非线性问题进行了分析。
The element free Galerkin method is applied into analysis of axisymmetric geometrical nonlinearities.
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。
Research focused on the application of EFGM considering the existence of CFRP on the crack growth.
采用完全变换法施加本质边界条件,给出求解椭圆型边值问题的无网格伽辽金方法。
The full transformation method is used in element-free Galerkin method for solving the elliptic boundary value problems.
无网格伽辽金法(EFG)由于其近似函数的特殊性很难处理本质边界条件以及不连续介质边界条件。
Element free Galerkin method (EFG) is hard to handle nature boundary condition and the discontinuous medium boundary condition because of its special approximate function.
数值实例表明,无网格伽辽金法在处理几何非线性问题时,具有较高的计算精度,是一种有效的数值计算方法。
Results of numerical examples in geometrical nonlinearities have shown that element-free Galerkin method, with its high accuracy, is much more efficient to deal with these problems.
通过采用影响域节点控制方法以及边界节点分布密度动态控制方法,实现了塑性成形过程的无网格伽辽金方法的自适应分析。
The influence domain control method and adaptive boundary points setting method were developed and the large metal forming meshless analyses were realized.
通过采用影响域节点控制方法以及边界节点分布密度动态控制方法,实现了塑性成形过程的无网格伽辽金方法的自适应分析。
The influence domain control method and adaptive boundary points setting method were developed and the large metal forming meshless analyses were realized.
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