Closed-form solutions for a class of optimal quadratic tracking problems
- 1 December 1985
- journal article
- Published by Springer Nature in Journal of Optimization Theory and Applications
- Vol. 47 (4) , 465-481
- https://doi.org/10.1007/bf00942192
Abstract
No abstract availableKeywords
This publication has 13 references indexed in Scilit:
- Closed-form solutions for feedback control with terminal constraintsJournal of Guidance, Control, and Dynamics, 1985
- Optimal feedback slewing of flexible spacecraftJournal of Guidance and Control, 1981
- A time-stepping procedure for Ẋ=A1X+XA2+D, X(0)=CIEEE Transactions on Automatic Control, 1980
- A Hessenberg-Schur method for the problem AX + XB= CIEEE Transactions on Automatic Control, 1979
- The numerical solution ofX = A_{1}X + XA_{2} + D, X(0) = CIEEE Transactions on Automatic Control, 1975
- Algorithm 432 [C2]: Solution of the matrix equation AX + XB = C [F4]Communications of the ACM, 1972
- A simplified method for solving the matrix Riccati equation†International Journal of Control, 1972
- Comparison of numerical methods for solving Liapunov matrix equations†International Journal of Control, 1972
- On the matrix riccati equationInformation Sciences, 1971
- Optimum mixing of gyroscope and star tracker data.Journal of Spacecraft and Rockets, 1968