摘要
将U变换法推广应用于Reissner矩形板的有限元分析中.对原结构进行等效变换,形成周期循环的板单元,使刚度矩阵成为循环矩阵,应用双重U变换解耦了有限元的矩阵方程,使有限元计算只须在一个板单元上进行,并且仍能方便分析整个板的一般分布载荷.所发展的U变换-有限元法不仅提高了计算效率,很快收敛于精确解,对于简支板还给出了精确分析的有限元解、准确的误差估计表达式和收敛速度,可以直接掌控计算精度,这是其它方法难以得到的.对简支和固支矩形板的数值算例及与其它方法的对比说明了U变换-有限元法的优点和重要的工程实用价值.
The U-transformation method was applied to the Reissner rectangular plates. The actual plate was extended to make up an equivalent cyclic periodicity system and the plate elements become cyclic periodic elements, whereby the stiffness matrix become a cyclic matrix and the finite element matrix equation was uncoupled by using double U-transformation. This method can easily analyze the plate with arbitrarily distributed loads and the calculation is only performed for one element. The method has high computational efficiency and can quickly converge to exact solutions. The exact analytical finite element solution, the exact error expression and exact convergence rate are derived. These results can be not obtained if other methods are used instead. Numerical examples of rectangular plates with simply supported or clamped edges and a comparison with other methods show the advantages and practical importance of the U-transformation finite element method in engineering analysis.
出处
《北京航空航天大学学报》
EI
CAS
CSCD
北大核心
2008年第11期1303-1306,共4页
Journal of Beijing University of Aeronautics and Astronautics
基金
国家自然科学基金资助项目(10672008)
关键词
Reissner矩形板
U变换
有限元法
误差分析
Reissner rectangular plates
U-transformation
finite element method
error analysis
