| 对称矩阵与Bezout矩阵之间关系的探讨 |
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| 引用本文: | 王金凤,孙彬. 对称矩阵与Bezout矩阵之间关系的探讨[J]. 重庆工商大学学报(自然科学版), 2011, 28(5): 467-469478 |
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| 作者姓名: | 王金凤 孙彬 |
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| 作者单位: | 安徽大学数学科学学院,合肥,230039 |
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| 摘 要: | Bezout矩阵是关于多项式对的一种特殊二次型.首先给出几种特殊情形,随后归纳证明在标准基下,满足条件rank△↓A≤2或rankΔA≤2的任意对称矩阵也是Bezout矩阵.在一般基下,任一对称矩阵均可找到由两个多项式生成的Bezou矩阵与之对应.
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| 关 键 词: | 对称矩阵 Bezout矩阵 对角化 |
On Ralation between Symmetric Matrix and Beout Matrix |
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| WANG Jin-feng,SUN Bin. On Ralation between Symmetric Matrix and Beout Matrix[J]. Journal of Chongqing Technology and Business University:Natural Science Edition, 2011, 28(5): 467-469478 |
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| Authors: | WANG Jin-feng SUN Bin |
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| Abstract: | Bezout matrix is a special quadratic type about a polynomial. This paper firstly gives several special cases and then concludes and proves that,under the standard condition,a discretionary symmetric matrix with rank △↓ A ≤2 or rank ΔA ≤2 is also Bezout matrix and that,under general basis,every symmetric matrix is corresponding to a Bezout matrix with two polynomials. |
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| Keywords: | symmetric matrix Bezout matrix diagonalization |
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