Every Normal Toeplitz Matrix is Either of Type I or of Type II
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Publication:4717304
DOI10.1137/S0895479895293156zbMath0870.15014MaRDI QIDQ4717304
Publication date: 7 January 1997
Published in: SIAM Journal on Matrix Analysis and Applications (Search for Journal in Brave)
Hermitian and normal operators (spectral measures, functional calculus, etc.) (47B15) Hermitian, skew-Hermitian, and related matrices (15B57) Toeplitz operators, Hankel operators, Wiener-Hopf operators (47B35)
Related Items (17)
Circulants and critical points of polynomials ⋮ On some algebraic properties of block Toeplitz matrices with commuting entries ⋮ The structured distance to normality of Toeplitz matrices with application to preconditioning ⋮ On algebras of Toeplitz fuzzy matrices ⋮ On hyponormal Toeplitz operators with polynomial and circulant-type symbols ⋮ Hyponormal Toeplitz operators with matrix-valued circulant symbols ⋮ Multiplicative properties of infinite block Toeplitz and Hankel matrices ⋮ On normal Hankel matrices of low orders ⋮ On a new class of normal Hankel matrices ⋮ A characterization of binormal matrices ⋮ On the banded Toeplitz structured distance to symmetric positive semidefiniteness ⋮ Classifying normal Hankel matrices ⋮ A complete solution of the normal Hankel problem ⋮ Toeplitz and Hankel matrices on \(\mathbb{C}^n\) ⋮ A contribution to the normal Hankel problem ⋮ The conjugate-normal Toeplitz problem ⋮ The structured distance to normality of banded Toeplitz matrices
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