| 任意非亏损矩阵特征灵敏度分析的模态展开法 |
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| 引用本文: | 张振宇,张慧生.任意非亏损矩阵特征灵敏度分析的模态展开法[J].上海力学,2003,24(3):351-357. |
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| 作者姓名: | 张振宇 张慧生 |
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| 作者单位: | 复旦大学力学与工程科学系,复旦大学力学与工程科学系 上海 200433,上海 200433 |
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| 摘 要: | 把特征向量的各阶导数表示成所有模态的线性组合,并利用左模态与右模态间的双正交性,首先导出了任意非亏损矩阵的重特征值的一阶导数所满足的特征值问题,然后根据此特征值问题无、看重根的情况,再导出了异导重特征值和等导重特征值对应的可微特征向量、特征值和特征向量各阶导数的一般计算公式。算例显示了方法的正确性。
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| 关 键 词: | 非亏损矩阵 特征灵敏度分析 模态展开法 重特征值 |
| 修稿时间: | 2002年12月31 |
Modal Expansion Method for Eigensensitivity Analysis of Arbitrary Non-Defective Matrices |
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| ZHANG Zhen-yu,ZHANG Hui-sheng.Modal Expansion Method for Eigensensitivity Analysis of Arbitrary Non-Defective Matrices[J].Chinese Quarterly Mechanics,2003,24(3):351-357. |
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| Authors: | ZHANG Zhen-yu ZHANG Hui-sheng |
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| Abstract: | By expressing the eigenvector derivatives as linear combinations of all of the modes and using the bi-orthogonality of the left modes with the right modes, the eigenvalue problem for first-order derivatives of repeated eigenvalues was derived first and then, according to the eigenvalue problem without or with multiple roots, the general formulas for calculating the differentiable eigenvectors and any order of derivatives of eigenvalues and eigenvectors of an arbitrary non-defective matrix with distinct or repeated first-order eigenvalue derivatives were derived. Numerical example shows the correctness of the method. |
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| Keywords: | non-defective matrix eigensensitivity analysis modal expansion method repeated eigenvalues |
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