Least-squares method and matching collocation method are two frequently used ideas which are applied to virtual boundary element method.
等额配点法和最小二乘积分法是两种最常用的虚边界元法构造思路。
参考来源 - 解热弹性问题和正交各向异性弹性问题的多域组合虚边界元法This method is fit for solving the elasticity mechanics with large degree of freedoms, accelerate the solving of equations, so it extend the adapt area of Virtual Boundary Element Method.
这种算法适合于求解较大规模的弹性力学问题,提高了方程求解的速度,从而扩大了虚边界元法的适应范围。
参考来源 - 多层框架结构多域组合虚边界元法求解和快速多极单域虚边界元法理论探讨·2,447,543篇论文数据,部分数据来源于NoteExpress
Solving the composite structures of different mediums with virtual boundary element method;
依据虚边界元法思想 ,提出了一种求解薄板自由振动问题的新算法 。
The primal research work about virtual boundary element method is on the problems of single domain.
等额配点法和最小二乘积分法是两种最常用的虚边界元法构造思路。
Numerical results show that the calculation efficiency of the fast algorithm proposed in the paper is 20-80 times higher than the virtual boundary element method.
文中给出的数值算例表明了这种快速算法的计算效率是虚拟边界元法的2 0—80倍。
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