期刊文献+
任意字段
题名或关键词
题名
关键词
文摘
作者
第一作者
机构
刊名
分类号
参考文献
作者简介
基金资助
栏目信息

k-广义Hermite矩阵及其在矩阵方程中的应用 被引量:1

k-Generalized Hermite Matrices and Their Application in Matrix Equation
在线阅读 下载PDF
导出
摘要 给出了k-广义Hermite矩阵的概念,并给出了它的性质及其与酉矩阵、Hermite矩阵、Hamilton矩阵和广义逆矩阵之间的关系及其在解矩阵方程中的应用,取得了一些新结果,推广了酉矩阵、Hermite矩阵及广义次对称矩阵的相应结果,特别地将正交阵的广义Cayley分解推广到了k-广义酉矩阵和k-广义Hermite矩阵上,从而统一了各类Hermite矩阵及广义逆矩阵. The concept of k-generalized Hermite matrix was given,and its properties and relations to unitary matrix,Hermite matrix,Hamilton matrix and generalized inverse matrix,and its matrix equation of application were discussed,with many new results obtained.The corresponding results of unitary matrix,Hermite matrix and generalized symmetric matrix,especially the Cayley decomposition of orthogonal matrix to k-generalized unitary matrix and k-generalized Hermite matrix were extended,unifying various kinds of Hermite matrix and generalized inverse matrix.
作者 袁晖坪 王行荣
机构地区 重庆工商大学数学与统计学院
出处 《吉林大学学报(理学版)》 CAS CSCD 北大核心 2012年第1期59-62,共4页 Journal of Jilin University:Science Edition
基金 重庆市自然科学基金(批准号:CSTS2005BB0243) 重庆市教委科技项目基金(批准号:KJ0707023)
关键词 k-广义Hermite矩阵 酉矩阵 广义逆矩阵 辛矩阵 矩阵方程 k-generalized Hermite matrix unitary matrix generalized inverse matrix symplectic matrix matrix equation
分类号 O151.21 [理学—基础数学]
  • 相关文献

参考文献10

  • 1Hill R D, Waters S R. On k-Real and k-Hermitian Matrices [J]. Linear Algebra and Its Applications, 1992, 169: 17-29.
  • 2Pressman S. Matrices with Multiple Symmetry Properties: Applications of Centrohermitian and Perhermitian Matrices [ J]. Linear Algebra and Its Applications, 1998, 284: 239-258.
  • 3WAN Zhe-xian. Geometry of Hamilton Matrices and Its Applications 1I [J]. Algebra Colloquium, 1996, 3(2): 107-116.
  • 4DAI Hua. On the Symmetric Solutions of Linear Matrix Equations [ J ]. Linear Algebra and Its Applications, 1990, 131 : 1-7.
  • 5XU Gui-ping, WEI Mu-sheng, ZHENG Dao-sheng. On Solutions of Matrix Equation AXB + CYD = F [ J ]. Linear Algebra and Its Applications, 1998, 279: 93-109.
  • 6Jameson A, Kxeindler E, Laneaster P. Symmetric, Positive Semidefinite, and Positive Real Solutions of AX = XAT and AX= YB [J]. Linear Algebra and Its Applications, 1992, 160: 159-215.
  • 7李范良,胡锡炎,张磊.广义次对称矩阵的左右逆特征对问题[J].计算数学,2007,29(4):337-344. 被引量:6
  • 8袁晖坪.广义酉矩阵与广义Hermite矩阵[J].数学杂志,2003,23(3):375-380. 被引量:31
  • 9袁晖坪.广义次正定矩阵的行列式不等式[J].吉林大学学报(理学版),2004,42(3):346-350. 被引量:8
  • 10杨昌兰,王龙波.Hermite矩阵方程[J].Journal of Mathematical Research and Exposition,2004,24(3):500-502. 被引量:21

二级参考文献27

  • 1张磊,谢冬秀.一类逆特征值问题[J].数学物理学报(A辑),1993,13(1):94-99. 被引量:45
  • 2杨昌兰.一个二次矩阵方程的解[J].工科数学,1997,13(1):129-130. 被引量:12
  • 3杨虎.矩阵的泛正定与广义逆偏序[J].系统科学与数学,1993,13(3):270-275. 被引量:22
  • 4佟文廷.广义正定矩阵[J].数学学报,1984,27(6):801-801.
  • 5[1]Johnson C R.Positive definite matrices [J].Amer Math Monthly,1970,77:259-264.
  • 6[9]Johnson H R.An inequality for matrices whose symmetric part is positive definite [J].Lin Alg Appl,1973,(6):87-92.
  • 7Hom R A, Johnson C R. Matrix Anaiysis [M] Cambridge: Cambridge university Press, 1985.
  • 8Lin Wenwei, Volker Mehrmann. Canonical forms for Hamiltonian and symplectic matrices and pencils [J].Linear Algebra and its Appilcatons, 1999, 302-303. 469-533.
  • 9Wanzhexian. Geometry of Hamilton matrices and its applications H[J] Algebra colloquium. 1996, 3(2): 107-116.
  • 10Tam Bitshum, Yang Shangjun. On matrices whose numerical ragnes have circular or weak circular symmetry [J]Linear Algebra its Applications, 199, 302-303. 139-221.

共引文献55

同被引文献8

  • 1Horn R A,Johnson C R. Matrix Analysis[ M]. London:cambridge University Press ,1985.
  • 2Jain s K,Gunawardena A D. Linear Algebra[ M]. Beijing:china Machine Press,2003.
  • 3Wang G, Wei Y, Qiao S. Generalized Inverses :Theory and Computation[ M ]. Beijing: Science Press,2004.
  • 4Drazin M P. Natural structures on semigroups with involution[J]. Bull Amer Math Soc, 1978,84:139 ~ 141.
  • 5Mitra S K. Noncore square matrices miscellany[ J]. Linear Algebra Appl, 1996,249:249 -260.
  • 6Hartwig R E,Spindelbck K. Matrices for which A and A commute[J]. Linear Muhilinear Algebra,1984,14:241 - 256.
  • 7Baksalary O M, Styan G P H, Trenkler G. On a matrix decomposition of Hartwing and Spindelbtiek[J]. Linear Algebra Appl, 2009,430(10) :2798 ~2812.
  • 8袁晖坪.广义酉矩阵与广义Hermite矩阵[J].数学杂志,2003,23(3):375-380. 被引量:31

引证文献1

吉林大学学报(理学版)
2012年 第1期

相关作者

内容加载中请稍等...

相关机构

内容加载中请稍等...

相关主题

内容加载中请稍等...

浏览历史

内容加载中请稍等...
;
使用帮助 返回顶部