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88.04 More on solving non-linear matrix equations

Published online by Cambridge University Press:  01 August 2016

Douglas W. Mitchell
Douglas W. Mitchell*
Affiliation:
303 Greentree Road, Rolla, MO 65401, USA
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Information
The Mathematical Gazette , Volume 88 , Issue 511 , March 2004 , pp. 87 - 90
Copyright
Copyright © The Mathematical Association 2004

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References

1. Ward, A. J. B. The attractor property and matrix equations: an empirical approach, Math. Gaz. 86 (March 2002) pp. 114119.CrossRefGoogle Scholar
2. Amman, H. M. and Neudecker, H. Numerical solutions of the algebraic matrix Riccati equation, Journal of Economic Dynamics and Control 21 (1997) pp. 363369.Google Scholar
3. Bittani, , Laub, , and Willems, (eds.), The Riccati equation, Springer Verlag, New York (1991).Google Scholar
4. Lancaster, P. and Rodman, L. Algebraic Riccati equations, Clarendon Press, Oxford (1995).Google Scholar
5. Martin, C. F. and Ammar, G. The geometry of the matrix Riccati equation and associated eigenvalue method, in [3].Google Scholar
6. Vaughan, D. R. A non-recursive algebraic solution for the discrete Riccati equation, IEEE Transactions on Automatic Control 15 (1970) pp. 597599.Google Scholar