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1)  strictly diagonally dominaut matrix
严格对角占优阵
2)  strictly diagonally dominant matrix
严格对角占优矩阵
1.
In particular,for a strictly diagonally dominant matrix,we improve some related results.
设A为严格双对角占优矩阵,给出了‖A-1‖∞的上界估计,特别地,当A为严格对角占优矩阵,改进了现有的相关结果。
2.
Generalized strictly diagonally dominant matrix play an important role in matrix theory and real applications.
广义严格对角占优矩阵在矩阵理论和实际应用中具有重要的作用和意义。
3)  generalized strictly diagonally dominant matrix
广义严格对角占优矩阵
1.
α-diagonally dominant matrices andcriteria for generalized strictly diagonally dominant matrix;
α-对角占优矩阵与广义严格对角占优矩阵的判定
2.
A is a generalized strictly diagonally dominant matrix,both Jacobi and Gauss-Seidel iterative methods of Equation Ax=b converge.
对广义严格对角占优矩阵A给出了解线性方程组Ax=b的Jacobi迭代法及Gauss-Seidel迭代法均收敛的证明。
3.
We present some simple practical criteria for verifying whether a locally diagonally dominant matrix is a generalized strictly diagonally dominant matrix.
引进局部对角占优矩阵的概念,得到这类矩阵的一些性质,给出了局部对角占优矩阵为广义严格对角占优矩阵的简单而实用的判定准则。
4)  strictly diagonally dominant matrices
严格对角占优矩阵
1.
Generalized strictly diagonally dominant matrices and nonsingular M-matrices are two kinds of important matrices.
广义严格对角占优矩阵与非奇 M矩阵是非常重要的两类矩阵。
2.
In this note,based on the estimation of the inverse elements of strictly diagonally dominant matrices,some new upper and lower bounds on determinants for H-matrices are further investigated,which improves some classical ones.
基于对严格对角占优矩阵类逆元素的估计,对有着广泛应用前景的H-矩阵类的行列式的估计问题,作了进一步的研究,所得结果推广和改进了一些经典结论。
5)  generalized strictly diagonally dominant matrices
广义严格对角占优矩阵
1.
A simple and practicable method of judging generalized strictly diagonally dominant matrices and nonsingular M-matrices is introduced.
广义严格对角占优矩阵与非奇 M矩阵是非常重要的两类矩阵。
2.
In this paper, we adopt the definition of generalized Nekrasov matrices and give two equivalent conditions for generalized strictly diagonally dominant matrices, obtain some new practical criteria for generalized strictly diagonally dominant matrices, which include and extend some relevant results.
广义严格对角占优矩阵在数值分析和矩阵理论的研究中非常重要。
3.
<Abstrcat>By using the properties of Ostrowski diagonally dominant matrix,some sufficient conditions for weak α-double diagonally dominant matrix to be generalized strictly diagonally dominant matrices and comparative matrices to be nonsingular M-matrices.
 利用Ostrowski对角占优矩阵的性质,给出了弱α连对角占优矩阵为广义严格对角占优矩阵及其比较阵为非奇异M矩阵的若干充分条件,作为应用给出了相应的特征值分布定理,拓广了广义严格对角占优矩阵的判定准则。
6)  weakly strictly diagonally dominant matrix
弱严格对角占优矩阵
1.
Several critical theorems for the nonsingularity of diagonally dominant matrix are derived by investigating a kind of familiar and comprehensive diagonally dominant matrix—weakly strictly diagonally dominant matrix.
本文通过对一类常见的对角占优矩阵—弱严格对角占优矩阵的研究,得到了对角占优矩阵非奇异的几个易于验证的判定条件。
补充资料:占优策略均衡
占优策略:
无论其他参与者采取什么策略,某参与者的唯一的最优策略就是他的占优策略。

占优策略均衡:
由博弈中的所有参与者的占优策略组合所构成的均衡就是占优策略均衡。
说明:补充资料仅用于学习参考,请勿用于其它任何用途。
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