All Questions
Tagged with hermitian matrix-analysis
6 questions
5
votes
1
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175
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Orthogonal projection onto cones in inner product spaces
Let $H_n$ denote the space of $n\times n$ Hermitian matrices. For every $A\in H_n$, using the spectral decompostion of $A$,
$$A=\sum_i \lambda_i x_ix_i^*,$$
one can define the positive and negative ...
-2
votes
1
answer
334
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How to compute the spectral norm of this matrix [closed]
Consider $$\left\|2\sum_{i<j}L_{ij}+4\sum_i \operatorname{diag}e_i \right\|,$$ where
(1) $L_{ij}=\operatorname{diag}e_i+\operatorname{diag}e_j-e_ie_j^T-e_je_i^T$
(2) $e_i$ denotes $n$-by-$1$ vector ...
0
votes
0
answers
61
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An inequality regarding operator concave function
Crossposted from math.SE
Let $\mathbb P_n$ be the space of all $n \times n$ self-adjoint positive definite matrices. Consider the function $\varphi: \mathbb P_n \longrightarrow \mathbb R$ defined by $...
1
vote
1
answer
506
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Dimension (manifold) of matrices with exact $r$ positive and $r$ negative eigenvalues
For the vector space $M_{n,n}(\mathbb{C})$ of $n\times n$ matrices we know that the subset
$$M_{2r}:= \{A\in M_{n,n}(\mathbb{C}) \mid \mbox{rank} (A) = 2r \}$$
is a manifold of dimension $2n(2r)-(...
0
votes
1
answer
343
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Norm bound on eigen-vector change caused by rank-one update
Suppose $A$ is a positive semi-definite, Hermitian matrix with a unit-norm eigen vector $\textbf{v}$ corresponding to its largest eigen value $\lambda$. Let $B = A + \alpha \textbf{z}\textbf{z}^H$, ...
8
votes
0
answers
633
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Can we write unitary matrices as positive linear combinations of Hermitian matrices?
The space $M_n:=M_n(\mathbb{C})$ of complex $n\times n$ matrices has the structure of a finite-dimensional complex vector space.
The space of Hermitian matrices forms a cone in this vector space $M_n$...