Generalized Lyapunov equations, matrices with displacement structure, and generalized Bézoutians
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Publication:1318202
DOI10.1016/0024-3795(93)90272-PzbMath0798.15014MaRDI QIDQ1318202
Publication date: 6 November 1994
Published in: Linear Algebra and its Applications (Search for Journal in Brave)
Related Items (4)
Algorithms for finding the minimal polynomials and inverses of resultant matrices ⋮ On the Jordan form of a family of linear mappings ⋮ The group inverse of the transformation \(\mathcal{S}(X)=AX-XB\) ⋮ Asymmetric algebraic Riccati equation: A homeomorphic parametrization of the set of solutions
Cites Work
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- Algebraic methods for Toeplitz-like matrices and operators
- Lyapunov, Bézout, and Hankel
- On the inverses of Toeplitz-plus-Hankel matrices
- Linear matrix equations: The module theoretic approach
- Algebraic method for the study of some linear matrix equations
- Inversion of matrices with displacement structure
- Generalized companion matrices and matrix representations for generalized Bézoutians
- Matrix calculations for Liapunov quadratic forms
- Generalized Bezoutians and families of efficient zero-location procedures
- Linear Matrix Equations Controllability and Observability, and the Rank of Solutions
- Formulae for the solution of Lyapunov matrix equations
- Solution of the Matrix Equations $AX + XB = - Q$ and $S^T X + XS = - Q$
- Resultants and the Solution of $AX - XB = - C$
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