The Riccati Equation 1991
DOI: 10.1007/978-3-642-58223-3_7
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Invariant Subspace Methods for the Numerical Solution of Riccati Equations

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Cited by 96 publications
(75 citation statements)
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“…A special case of this decomposition is an appropriately ordered Jordan decomposition of M as was used by Vaughan (1970) in developing an invariant subspace algorithm for computing P y . Laub (1991) traces this solution strategy back to the 19th century and credits MacFarlane (1963) and Potter (1966) with introducing it to the control literature. As emphasized by Laub (1991), it is preferable to build algorithms based on other upper triangular decompositions that are more stable numerically.…”
Section: Nonsingular a Yymentioning
confidence: 99%
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“…A special case of this decomposition is an appropriately ordered Jordan decomposition of M as was used by Vaughan (1970) in developing an invariant subspace algorithm for computing P y . Laub (1991) traces this solution strategy back to the 19th century and credits MacFarlane (1963) and Potter (1966) with introducing it to the control literature. As emphasized by Laub (1991), it is preferable to build algorithms based on other upper triangular decompositions that are more stable numerically.…”
Section: Nonsingular a Yymentioning
confidence: 99%
“…Laub (1991) traces this solution strategy back to the 19th century and credits MacFarlane (1963) and Potter (1966) with introducing it to the control literature. As emphasized by Laub (1991), it is preferable to build algorithms based on other upper triangular decompositions that are more stable numerically. The Jordan decomposition is particularly problematic when the symplectic matrix M has eigenvalues with multiplicities greater than one (see also Golub and Wilkinson 1976).…”
Section: Nonsingular a Yymentioning
confidence: 99%
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“…Concerning the numerical stability of Algorithm 5 we notice that various suggestions have been made in the literature to calculate solutions of Riccati equations in a numerically reliable way (see e.g. Laub (1979Laub ( , 1991, Paige and van Loan (1981), van Dooren (1981), Mehrmann (1991) and Abou-Kandil and Bertrand (1986) for a more general survey on various types of Riccati equations). These methods can also be used to improve the numerical stability of Algorithm 5.…”
Section: Algorithmmentioning
confidence: 99%
“…The computation of eigenvalues and eigenvectors of such matrices is an important task in applications like the discrete linearquadratic regulator problem, discrete Kalman filtering, the solution of discrete-time algebraic Riccati equations and certain large, sparse quadratic eigenvalue problems. See, e.g., [82,84,94,96] for applications and further references. Symplectic matrices also occur when solving linear Hamiltonian difference systems [14].…”
Section: Symplectic Matricesmentioning
confidence: 99%