| 解矩形薄板弯曲问题的二元B样条有限元法 |
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| 引用本文: | 刘焕文,何登旭. 解矩形薄板弯曲问题的二元B样条有限元法[J]. 广西民族大学学报, 1998, 0(1) |
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| 作者姓名: | 刘焕文 何登旭 |
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| 作者单位: | 广西民族学院数学与计算机科学系 |
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| 摘 要: | 本文提出了一种解薄板弯曲问题的二元B样条有限元法.该方法相应的系数总矩阵十分简单,不需叠加而一次成型,其半带宽以块计仅为2,子块半带宽至多为2.由于二元二次样条在三角形单元上仅有6个系数,使得总体自由度数目大大小于其它各种有限元法,其计算量自然随之下降,而所得的解还是C1协调的.
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| 关 键 词: | 薄板弯曲问题 二元B样条有限元法 边界条件 |
Finite Element Method with Bivariate B Splines in Solving A Bending Problem of Rectangular Boards |
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| Liu Huanwen,He Dengxu. Finite Element Method with Bivariate B Splines in Solving A Bending Problem of Rectangular Boards[J]. Journal of Guangxi University For Nationalities, 1998, 0(1) |
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| Authors: | Liu Huanwen He Dengxu |
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| Abstract: | In this paper, we give a finite element method with bivariate B splines. The coefficient matrix in the method is very simple, it turns out that semi belt width is 2. The sub block semi be lt width is 2 at the most. since bivariate quadratic spline on triangle unit have only 6 coefficientes, total number of degrees of freedom is less than other finite element method, the computational amount is reduced at ease, the solution obtained is C 1 coordinate at the same time. |
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| Keywords: | Bending problem of boards Finite element method with bivariate B splines Boundary condition |
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