A brief survey on the decomposable numerical range of matrices
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Publication:4015391
DOI10.1080/03081089208818161zbMath0764.15013OpenAlexW2059334008MaRDI QIDQ4015391
Publication date: 12 January 1993
Published in: Linear and Multilinear Algebra (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1080/03081089208818161
elementary symmetric functions\(m\)-th decomposable numerical radius\(m\)-th decomposable numerical range
Related Items (7)
Linear operators preserving the \((p,q)\) numerical radius ⋮ On the decomposable numerical range of λI-N ⋮ Some geometrical properties of the decomposable numerical range ⋮ On the Hu-Hurley-Tam conjecture concerning the generalized numerical range ⋮ Induced operators on symmetry classes of tensors ⋮ Invertible preservers and algebraic groups III: preservers of unitary similarity (congruence) invariants and overgroups of some unitary subgroups∗ ⋮ Nonconvexity of the permanental numerical range
Cites Work
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- On the numerical range of a bounded operator
- The decomposable numerical radius and numerical radius of a compound matrix
- Linear operators preserving the (p,q)-numerical range
- The numerical range of derivations
- Weyl's inequality and quadratic forms on the Grassmannian
- The numerical radius of exterior powers
- Linear operators on matrices: The invariance of the decomposable numerical radius
- Convexity properties of a generalized numerical range
- On certain finite dimensional numerical ranges and numerical radii†
- Some Inequalities on the Decomposable Numerical Radii of Matrices
- Singular values and numerical radii
- Nondifferentiabie points of ∂Wc(A)
- Vertex points in the numerical range of a derivation
- Inequalities relating unitarily invariant norms and the numerical radius
- On the Marcus-Wang conjecture
- On the numerical range of an induced power
- Linear operators preserving the decomposable numerical radius
- Some variations on the numerical range†
- The numerical range and decomposable numerical range of matrices
- An Affine Representation for Transversal Geometries
- Linear operators preserving the decomposable numerical range
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