1) irreducible and weakly diagonally dominant matrix
拟不可约对角占优阵
1.
The paper researches the irreducible and weakly diagonally dominant matrix,using the definition and features of irreducible and weakly diagonally dominant matrix and the simplest mathematics method,and then gets the several significant features of irreducible and weakly diagonally dominant matrix.
本文研究了拟不可约对角占优阵,利用不可约对角占优矩阵的定义与性质和较为简单的数学方法,得到了拟不可约对角占优阵的几个重要性质。
2) Quasi irreducible diagonally dominant matrix
拟不可约对角占优矩阵
3) irreducibly and weakly diagonally dominant matrix
不可约弱对角占优矩阵
1.
Based on the other earlier works as shown in reference and the characteristics of the elements of an irreducibly and weakly diagonally dominant matrix, the row elements of the complex matrix A are divided into three parts, then the module of the elements of each and every part are summed up to obtain the three values α_i, β_i, and γ_i.
根据不可约弱对角占优矩阵元素的特点,将复矩阵A的行元素划分为三个部分,并对每一部分元素的模求和得到三个值αi,βi,γi,通过比较由这三个值所构造出的hik和Hjk的大小给出了判断不可约矩阵A是广义严格对角占优矩阵的判别条件,并将其结果应用到非奇M 矩阵的判定上,推广了高益明等的主要结果
4) irreducible diagonally dominant matrix
不可约对角占优矩阵
5) dominant and irreducible matrix
对角占优与不可约化矩阵
6) quasi-diagonally dominant matrix
拟对角占优矩阵
1.
In this paper, we inquire into the fact that coef fi cient matrix is the convergence of iteration methods for solving the system of e quations with quasi-diagonally dominant matrix, and set the convergent condition s for Jacobi iteration method, G-S iteration method and SOR method for solving t he system of equations with quasi-diagonally dominant matrix.
讨论了系数矩阵为拟对角占优矩阵的方程组迭代解法的收敛性,给出了解拟对角占优矩阵方程组Jacobi迭代法,G-S迭代法和SOR方法的收敛条件。
补充资料:不可约簇
不可约簇
irreducible variety
不可约簇【jm汕叻以ev赴让勺;uenpHBO脚oe袖oroo6pa-3He} 在z助的目石拓扑(乙山ski topo10gy)下是一个不可约拓扑空间(沂司ucjble topo10gical space)的代数簇(algebmic峨币ety).换句话说,一个代数簇称为不可约的,如果它不能表示成两个真闭代数子簇的并.概形的不可约性可类似地定义,对于光滑(甚至正规)簇,不可约的概念与连通的概念是相同的.每个不可约簇有唯一的一般点(见一般位置点(pointin罗ne份1 posi-tion)). 与一个拓扑空间到不可约分支的分解相类似,任何一个代数簇是有限多个不可约闭子簇的并.这种表示法(可以用更精确的方式表达出来)的代数基础是交换NDe廿祀r环的准素分解(pnn飞lryd绷1llP戊ition). 在代数闭域上不可约簇的积亦是不可约的.对于任意基域,这不再正确.关于不可约簇的概念的另一种说法也是有用的:域k上的簇X称为几何不可约的(g印metricaUy ir代月ucible),如果对于k的任何域扩张k‘,通过换基(base cllange)从X得到的簇X⑧*灯仍为不可约.B.H.从a~oB撰
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