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On Maps Preserving Unitarily Invariant Norms of the Spectral Geometric Mean
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作者 Hongjie Chen Lei Li +1 位作者 Zheng Shi Liguang Wang 《Journal of Applied Mathematics and Physics》 2021年第4期577-583,共7页
We consider maps on positive definite cones of von Neumann algebras preserving unitarily invariant norms of the spectral geometric means. The main results concern Jordan *-isomorphisms between <em>C</em>*-... We consider maps on positive definite cones of von Neumann algebras preserving unitarily invariant norms of the spectral geometric means. The main results concern Jordan *-isomorphisms between <em>C</em>*-algebras, and show that they are characterized by the preservation of unitarily invariant norms of those operations. 展开更多
关键词 Spectral Geometric Mean Positive Cone Jordan *-Isomorphisms unitarily invariant norm
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ON MATRIX UNITARILY INVARIANT NORM CONDITION NUMBER
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作者 Dao-sheng Zheng (Department of Mathematics, East China Normal University, Shanghai 200062, China) 《Journal of Computational Mathematics》 SCIE EI CSCD 1998年第2期121-128,共8页
In this paper, the unitarily invariant norm \\.\\ on C-mxn is used. We first discuss the problem under what case, a rectangular matrix A has minimum condition number K(A) = \\A\\ \\A(+)\\, where A(+) designates the Mo... In this paper, the unitarily invariant norm \\.\\ on C-mxn is used. We first discuss the problem under what case, a rectangular matrix A has minimum condition number K(A) = \\A\\ \\A(+)\\, where A(+) designates the Moore-Penrose inverse of A; and under what condition, a square matrix A has minimum condition number for its eigenproblem? Then we consider the second problem, i.e., optimum of K(A) = \\A\\ \\A(-1)\\(2) in error estimation. 展开更多
关键词 MATRIX unitarily invariant norm condition number
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Some Properties of the Optimal Preconditioner and the Generalized Superoptimal Preconditioner
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作者 Hong-Kui Pang Xiao-Qing Jin 《Numerical Mathematics(Theory,Methods and Applications)》 SCIE 2010年第4期449-460,共12页
The optimal preconditioner and the superoptimal preconditioner were proposed in 1988 and 1992 respectively. They have been studied widely since then. Recently, Chen and Jin [6] extend the superoptimal preconditioner t... The optimal preconditioner and the superoptimal preconditioner were proposed in 1988 and 1992 respectively. They have been studied widely since then. Recently, Chen and Jin [6] extend the superoptimal preconditioner to a more general case by using the Moore-Penrose inverse. In this paper, we further study some useful properties of the optimal and the generalized superoptimal preconditioners. Several existing results are extended and new properties are developed. 展开更多
关键词 Optimal preconditioner generalized superoptimal preconditione Moore-Penrose inverse unitarily invariant norm semi-stability singular value
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Norm Inequalities for Positive Semidefinite Matrices
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作者 ZOU Limin WU Yanqiu 《Wuhan University Journal of Natural Sciences》 CAS 2012年第5期454-456,共3页
This paper aims to discuss some inequalities involving unitarily invariant norms and positive semidefinite matrices. By using properties of unitarily invariant norms, we obtain two inequities involving unitarily invar... This paper aims to discuss some inequalities involving unitarily invariant norms and positive semidefinite matrices. By using properties of unitarily invariant norms, we obtain two inequities involving unitarily invariant norms and positive semidefinite matrices, which generalize the result obtained by Bhatia and Kittaneh. 展开更多
关键词 unitarily invariant norms positive semidefinite matrices singular values
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Singular Values of Sums of Positive Semidefinite Matrices
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作者 CHEN Dongjun ZHANG Yun 《Wuhan University Journal of Natural Sciences》 CAS CSCD 2020年第4期307-310,共4页
For positive real numbers a,b,a+b≤max{a+b1/2 a1/2,b+a1/2b1/2}.In this note,we generalize this fact to matrices by proving that for positive semidefinite matrices A and B of order n,for any c∈[-1,1]and j=1,2,…,n,sj(... For positive real numbers a,b,a+b≤max{a+b1/2 a1/2,b+a1/2b1/2}.In this note,we generalize this fact to matrices by proving that for positive semidefinite matrices A and B of order n,for any c∈[-1,1]and j=1,2,…,n,sj(A+B)≤sj((A⊕B)+φc(A,B))≤sj(A+|B1/2A1/2|)⊕(B+|A1/2B1/2|),where sj(X)denotes the j-th largest singular value of X andφc(A,B):=1/2((1+c)|B1/2A1/2|(1-c)A1/2B1/2(1-c)B1/2A1/2(1+c)|A1/2B1/2|).This result sharpens some known result.Meanwhile,some related results are established. 展开更多
关键词 singular values positive semidefinite matrices majorization unitarily invariant norms
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