| 广义严格对角占优阵的判定程序 |
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| 引用本文: | 陈神灿.广义严格对角占优阵的判定程序[J].高等学校计算数学学报,1997,19(4):324-329. |
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| 作者姓名: | 陈神灿 |
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| 作者单位: | 福建农业大学基础部!福州350002 |
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| 摘 要: | 1 引言和符号 在本文中,均采用下列符号而不再重申.恒用N表示前n个自然数的集合;而用Mn(C)和Mn(R)分别表示所有n阶复矩阵和所有n阶实矩阵的集合. Z_N={A|A=(a_(ij))_(n×n)∈Mn(R),a_(ij)≤0,i,j∈N,i≠j},I恒表示单位矩阵. 如果A∈Mn(R)且A的所有元素都为非负实数,则称A为非负方阵,并记为A≥0;若A的所有元素都为正数,则称A为正矩阵,并记为A>0. 对A=(a_(ij))(n×n)∈Mn(C),令A_i(A)=sum from j=1 j≠i to n (|a_(ij)|(i=1、2…… n)) ;若把A的非零元用1代替 而得到—个n阶(0,1)矩阵。称为A的导出矩阵。记为;而把A的比较矩阵记为 u(A)=(b_(ij))_(n×n))其中b_(ij)=|a_(ij)|,b_(ij)=-|a_(ij)|(i,j∈N i≠j)
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| 关 键 词: | 严格对角占优阵 广义 判定 矩阵 |
A DETERMINANT-PROCEDURE FOR GENERALIZED STRICTLY DIAGONALLY DOMINANT MATRIX |
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| Chen Shencan.A DETERMINANT-PROCEDURE FOR GENERALIZED STRICTLY DIAGONALLY DOMINANT MATRIX[J].Numerical Mathematics A Journal of Chinese Universities,1997,19(4):324-329. |
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| Authors: | Chen Shencan |
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| Institution: | Fujian Agricultural University |
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| Abstract: | The purpose of this note is to provide a practical determinant-procedure for examing whether a complex square matrix is a generalized strictly diagonally dominant matrix. Key words Generalized strictly diagonally dominant matrix, irreducible matrix; reducible matrix . permutation matrix . Schur complement. |
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| Keywords: | Generalized strictly diagonally dominant matrix irreducible matrix reducible matrix permutation matrix Schur complement |
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