1) symmetric bi-edge diagonal matrix
对称双边对角矩阵
1.
The properties and gemeralized linverses of a symmetric bi-edge diagonal matrix;
对称双边对角矩阵的性质及广义逆
2) anti-bidiagonal symmetric matrix
斜对称双对角矩阵
3) doubly symmetric five-diagonal matrix
双对称五对角矩阵
1.
In this paper,a kind of inverse eigenvalue problem is proposed, which is the reconstruction of doubly symmetric five-diagonal matrix by two eigenvalues and corresponding symmetric eigenvectors or anti-symmetric eigenvectors.
主要研究双对称五对角矩阵逆特征问题的可解性。
4) bisymmetric matrix
双对称矩阵
1.
In this paper,the inversable matrix solution of a kind of real matrix equation X~△AX=A is considered,where A is a inversable bisymmetric matrix,X~△is bisymmetric transposed matrix of X,and their general solution forms are derived; the bisymmetric solution of a kind of real matrix equation XAX=A is considered,and their general solution forms are derived too.
本文讨论了实矩阵方程X~△AX=A(A为非退化实双对称矩阵,X~△为X的双转置矩阵)的非退化解问题,并给出一般解的形式;同时讨论了实矩阵方程XAX=A的双对称解问题,并给出了一般解的形式。
2.
By this iterative method,the least squares bisymmetric solution can be obtained within finite iterative steps in the absence of round off errors,and the solution with least norm can be got by choosing a special initial bisymmetric matrix.
同时,也能够给出指定矩阵的最佳逼近双对称矩阵。
3.
This paper has discussed the generalized inverse eigenvalue problem of centrosymmetric matrix,anti-centrosymmetric matrix and bisymmetric matrix.
本文讨论了在谱约束条件下中心对称矩阵、反中心对称矩阵和双对称矩阵的一般化逆特征值问
5) bisymmetric matrices
双对称矩阵
1.
Least-square solutions of inverse problems for bisymmetric matrices;
一类双对称矩阵反问题的最小二乘解
2.
Least-squares solution for the inverse problem of real matrices、symmetric matrices and bisymmetric matrices are studied in this thesis.
本文研究了子阵约束下实矩阵、实对称矩阵和双对称矩阵反问题的最小二乘解,全文主要包括以下内容。
3.
thesis and mainly discuss the following problems:What we mainly discussed in the second chapter as follows:(1) S1,S2 are sets of symmetric orth-symmetric matrices;(2) S1,S2 are sets of bisymmetric matrices;(3) S1,S2 are sets of anti-.
S_1,S_2为双对称矩阵; 3。
6) symmetric tridiagonal matrix
对称三对角矩阵
1.
This paper provides two FORTRAN subroutines for the two computational problems of the symmetric tridiagonal matrix (solution of the system of liner algebraic equations, and computation of the generalized eigenvalues and eigenvectors).
提供两个高效而实用的FORTRAN程序(例行子程序形式),用于对称三对角矩阵的两个计算问题(其一是线性代数方程组的求解,其二是广义特征值问题的计算)。
2.
First, an unsymmetric tridiagonal matrix T is transformed into a symmetric tridiagonal matrix T *.
首先将非对称三对角矩阵T化为对称三对角矩阵T ,对于对称三对角矩阵T 和位移σ ,给出由T 求其简化矩阵 ^T的算法。
3.
The convergence of QL algorithm with shifts for symmetric tridiagonal matrix is discussed and a sufficient condition is given by which shifts are to be chosen to make sure that the top-left diagonal elements converges to an eigenvalue of the matrix.
主要讨论了对称三对角矩阵带位移的 QL方法的收敛性问题。
补充资料:对角矩阵
对角矩阵
diagonal matrix
对角矩阵[血,司比.七妞;八.arooa二‘ua,MaTp“职] 一个方阵,其中除主对角线上的元素可能不是零以外,其余元素都是零.0.A.”般H。股撰【补注】域K上的(陀xn)对角矩阵具有下列形式: ra.o……O、 10几·…认01 LO···……a,)其中a‘是K的元素.张鸿林译
说明:补充资料仅用于学习参考,请勿用于其它任何用途。
参考词条