Palindromic companion forms for matrix polynomials of odd degree
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Publication:654764
DOI10.1016/j.cam.2011.09.010zbMath1239.15010OpenAlexW2149913762MaRDI QIDQ654764
Fernando De Terán, D. Steven Mackey, Froilán M. Dopico
Publication date: 21 December 2011
Published in: Journal of Computational and Applied Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.cam.2011.09.010
minimal indicesmatrix polynomialmatrix pencilpolynomial eigenvalue problemcompanion formelementary divisorsstructured linearizationFiedler pencilspalindromic
Eigenvalues, singular values, and eigenvectors (15A18) Matrices over function rings in one or more variables (15A54) Matrix pencils (15A22)
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Uses Software
Cites Work
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- Trimmed linearizations for structured matrix polynomials
- Implicit QR algorithms for palindromic and even eigenvalue problems
- General theory of regular matrix polynomials and band Toeplitz operators
- Fast projection methods for minimal design problems in linear system theory
- Numerical methods for palindromic eigenvalue problems: Computing the anti-triangular Schur form
- Fiedler Companion Linearizations and the Recovery of Minimal Indices
- Smith forms of palindromic matrix polynomials
- Recovery of Eigenvectors and Minimal Bases of Matrix Polynomials from Generalized Fiedler Linearizations
- Minimal Bases of Rational Vector Spaces, with Applications to Multivariable Linear Systems
- Sharp lower bounds for the dimension of linearizations of matrix polynomials
- Structure-Preserving Algorithms for Palindromic Quadratic Eigenvalue Problems Arising from Vibration of Fast Trains
- A new family of companion forms of polynomial matrices
- Vector Spaces of Linearizations for Matrix Polynomials
- Structured Polynomial Eigenvalue Problems: Good Vibrations from Good Linearizations
- Canonical structures for palindromic matrix polynomials
- Symmetric Linearizations for Matrix Polynomials
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