On computing of arbitrary positive integer powers for one type of tridiagonal matrices of even order

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DOI10.1016/J.AMC.2004.06.008zbMath1070.65030OpenAlexW2008890263MaRDI QIDQ556118

Jonas Rimas

Publication date: 13 June 2005

Published in: Applied Mathematics and Computation (Search for Journal in Brave)

Full work available at URL: https://doi.org/10.1016/j.amc.2004.06.008

zbMATH Keywords

Chebyshev polynomials numerical examples tridiagonal matrices matrix power Eigenvalues Eigenvectors Jordan's form

Mathematics Subject Classification ID

Computational methods for sparse matrices (65F50) Numerical computation of eigenvalues and eigenvectors of matrices (65F15) Canonical forms, reductions, classification (15A21)

Related Items (9)

A multi-temperature kinetic Ising model and the eigenvalues of some perturbed Jacobi matrices ⋮ On computing of arbitrary positive integer powers for one type of even order tridiagonal matrices with eigenvalues on imaginary axis. I. ⋮ On computing of arbitrary positive integer powers for one type of even order tridiagonal matrices with eigenvalues on imaginary axis. II. ⋮ Positive integer powers of certain tridiagonal matrices and corresponding anti-tridiagonal matrices ⋮ Unnamed Item ⋮ On computing of arbitrary positive integer powers for one type of tridiagonal matrices of even order ⋮ Positive integer powers of certain complex tridiagonal matrices ⋮ On computing of arbitrary positive integer powers for one type of even order symmetric anti-pentadiagonal matrices ⋮ Remarks on the eigenpairs of some Jacobi matrices

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