References
- Al-Baiyat , S. A. and Bettayeb , M. A new model reduction scheme for K-power bilinear systems . Proceedings of the 32nd Conferences on Decision and Control . December 15–17 , San Antonio , TX . pp. 22 – 27 .
- Aliev , F. A. 1993 . Generalized Lyapunov equation and factorization of matrix polynomials . Syst. Control Lett. , 21 : 485 – 491 .
- Barraud , A. Y. 1977 . A numerical algorithm to solve . IEEE Trans. Autom. Control , 22 ( 5 ) : 883 – 885 .
- Bartels , H. and Stewart , G. W. 1972 . Algorithm 432, Solution of the matrix equation AX+XB=C . Commun. ACM , 15 ( 9 ) : 820 – 826 .
- Bender , D. J. 1979 . Lyapunov-like equations and reachability/observability Gramians for descriptor systems . IEEE Trans. Automatic Control , 32 ( 4 ) : 343 – 348 .
- Benner , P. and Quintana-Orti , E. S. 1999 . Solving stable generalized Lyapunov equations with the matrix sign function . Numer. Algorithms , 20 : 75 – 100 .
- Betser , A. , Cohen , N. and Zeheb , E. 1995 . On solving the Lyapunov and Stein equations for a companion matrix . Syst. Control Lett. , 25 ( 3 ) : 211 – 221 .
- Bhattacharyya , S. P. and de Souza , E. 1982 . Pole assignment via Sylvester's equation . Syst. Control Lett. , 1 ( 4 ) : 261 – 263 .
- Bitmead , R. R. 1981 . Explicit solutions of the discrete-time Lyapunov matrix equation and Kalman–Yakubovich equations . IEEE Trans. Autom. Control , 26 ( 6 ) : 1291 – 1294 .
- Chen , J. L. and Chen , X. H. 2002 . Special Matrices , Beijing : Tsinghua University Press . (in Chinese)
- Chu , D. , Chan , H. C. and Ho , D. W.C. 1998 . Regularization of singular systems by derivative and proportional output feedback . SIAM J. Matrix Anal. Appl. , 19 ( 1 ) : 21 – 38 .
- Chu , D. , Mehrmann , V. and Nichols , N. K. 1999 . Minimum norm regularization of descriptor systems by mixed output feedback . Linear Algebra Appl. , 296 ( 1–3 ) : 39 – 77 .
- Dehghan , M. 2006 . Solution of a partial integro-differential equation arising from viscoelasticity . Int. J. Comput. Math. , 83 ( 1 ) : 123 – 129 .
- Dehghan , M. and Hajarian , M. 2009 . Finite iterative algorithms for the reflexive and anti-reflexive solutions of the matrix equation . Math. Comput. Model. , 49 ( 9–10 ) : 1937 – 1959 .
- Dehghan , M. and Hajarian , M. 2010 . Matrix equations over (R, S)-symmetric and (R, S)-skew symmetric matrices . Comput. Math. Appl. , 59 ( 11 ) : 3583 – 3594 .
- Dehghan , M. and Hajarian , M. 2010 . The general coupled matrix equations over generalized bisymmetric matrices . Linear Algebra Appl. , 432 ( 1 ) : 1531 – 1552 .
- Desouza , E. and Bhattacharyya , S. P. 1981 . Controllability, observability and the solution of AX−XB=C . Linear Algebra Appl. , 39 : 167 – 188 .
- Ding , F. and Chen , T. 2005 . Gradient based iterative algorithms for solving a class of matrix equations . IEEE Trans. Autom. Control , 50 ( 8 ) : 1216 – 1221 .
- Ding , F. and Chen , T. 2005 . Iterative least-squares solutions of coupled Sylvester matrix equations . Syst. Control Lett. , 54 ( 2 ) : 95 – 107 .
- Ding , F. and Chen , T. 2006 . On iterative solutions of general coupled matrix equations . SIAM J. Control Optim. , 44 ( 6 ) : 2269 – 2284 .
- Gajic , Z. and Qureshi , M. T.J. 1995 . The Lyapunov Matrix Equation in System Stability and Control , New York : Academic Press .
- Gardiner , J. D. , Laub , A. J. , Amato , J. J. and Moler , C. B. 1992 . Solution of the Sylvester matrix equation . ACM Trans. Math. Softw. Arch. , 18 ( 2 ) : 223 – 231 .
- Gevers , M. and Li , G. 1993 . Parametrizations in Control, Estimation and Filtering Problems , London : Springer .
- Golub , G. H. , Nash , S. and Van Loan , C. F. 1979 . A Hessenberg–Schur method for the matrix problem AX+XB=C . IEEE Trans. Autom. Control , 24 ( 6 ) : 909 – 913 .
- Kelley , C. T. 1995 . Iterative Methods for Linear and Nonlinear Equations , Philadelphia : SIAM .
- Kilicman , A. and Aziz Al Zhour , Z. A. 2007 . Vector least-squares solutions for coupled singular matrix equations . J. Comput. Appl. Math. , 206 : 1051 – 1069 .
- Kim , H. C. and Choi , C. H. 1994 . Closed-form solution of the continuous-time Lyapunov matrix equation . IEE Proc. Control Theory Appl. , 141 ( 5 ) : 350 – 356 .
- Li , Z. and Wang , Y. 2010 . Iterative algorithm for minimal norm least squares solution to general linear matrix equations . Int. J. Comput. Math. , 87 ( 11 ) : 2552 – 2567 .
- Liao , A. P. , Bai , Z. Z. and Lei , Y. 2005 . Best approximate solution of matrix equation AXB+CYD=E . SIAM J. Matrix Anal. Appl. , 27 : 675 – 688 .
- Middleton , R. H. and Goodwin , G. C. 1990 . Digital Control and Estimation , Englewood Cliffs , NJ : Prentice-Hall .
- Pang , Y. , Li , X. and Yuan , Y. 2010 . Robust tensor analysis with L1-norm . IEEE Trans. Circuits Syst. Video Technol. , 20 ( 2 ) : 172 – 178 .
- Pang , Y. , Wang , L. and Yuan , Y. 2010 . Generalized KPCA by adaptive rules in feature space . Int. J. Comput. Math. , 87 ( 5 ) : 956 – 968 .
- Park , J. and Rizzoni , G. 1994 . An eigenstructure assignment algorithm for the design of fault detection filters . IEEE Trans. Autom. Control , 39 ( 7 ) : 1521 – 1524 .
- Peng , Z. Y. 2010 . A matrix LSQR iterative method to solve matrix equation AXB=C . Int. J. Comput. Math. , 87 ( 8 ) : 1820 – 1830 .
- Schmid , R. and Tan , Y. Performance analysis of iterative algorithms for Sylvester equations . The 8th IEEE International Conference on Control and Automation, Asia Gulf Hotel . June 9–11 , Xiamen .
- Suchomski , P. 2002 . Numerically robust delta-domain solutions to discrete-time Lyapunov equations . Syst. Control Lett. , 47 : 319 – 326 .
- Syrmos , V. L. , Misra , P. and Aripirala , R. 1995 . On the discrete generalized Lyapunov equation . Automatica , 31 ( 2 ) : 297 – 301 .
- Verhaegen , M. and Van Dooren , P. 1986 . A reduced order observer for descriptor systems . Syst. Control Lett. , 8 : 29 – 37 .
- Wang , Q. , Lam , J. , Wei , Y. and Chen , T. 2008 . Iterative solutions of coupled discrete Markovian jump Lyapunov equations . Comput. Math. Appl. , 55 ( 4 ) : 843 – 850 .
- Wang , M. , Wei , M. and Feng , Y. 2010 . An iterative algorithm for a least squares solution of a matrix equation . Int. J. Comput. Math. , 87 ( 6 ) : 1289 – 1298 .
- Wei , M. and Wang , Q. 2007 . On rank-constrained Hermitian nonnegative-definite least squares solutions to the matrix equation . Int. J. Comput. Math. , 84 ( 6 ) : 945 – 952 .
- Yan , B. , Tan , S. X.D. , Liu , P. and McGaughy , B. Passive interconnect macromodeling via balanced truncation of linear systems in descriptor form . Design Automation Conference, Asia and South Pacific . January 23–26 . pp. 355 – 360 .
- Yuan , Y. X. and Sun , W. Y. 2003 . Optimization Theory and Methods , Beijing : Science Press . (in Chinese).
- Zhang , L. Q. , Lam , J. and Zhang , Q. L. 1999 . Lyapunov and Riccati equations of discrete-time descriptor systems . IEEE Trans. Autom. Control , 44 ( 11 ) : 2134 – 2139 .
- Zhou , B. and Duan , G. R. 2008 . On the generalized Sylvester mapping and matrix equations . Syst. Control Lett. , 57 ( 3 ) : 200 – 208 .
- Zhou , B. and Lin , Z. 2011 . Parametric Lyapunov equation approach to stabilization of discrete-time systems with input delay and saturation . IEEE Trans. Circuits Syst. I, Regul. Pap. , 58 ( 11 ) : 2741 – 2754 .
- Zhou , K. , Doyle , J. and Glover , K. 1996 . Robust and Optimal Control , Englewood Cliffs , NJ : Prentice-Hall .
- Zhou , B. , Duan , G. and Lin , Z. 2008 . A parametric Lyapunov equation approach to the design of low gain feedback . IEEE Trans. Autom. Control , 53 ( 6 ) : 1548 – 1554 .
- Zhou , B. , Lin , Z. and Duan , G. 2009 . A parametric Lyapunov equation approach to low gain feedback design for discrete-time systems . Automatica , 45 ( 1 ) : 238 – 244 .
- Zhou , B. , Lin , Z. and Duan , G. 2009 . Properties of the parametric Lyapunov equation based low-gain design with applications in stabilization of time-delay systems . IEEE Trans. Autom. Control , 54 ( 7 ) : 1698 – 1704 .
- Zhou , B. , Lin , Z. and Duan , G. 2010 . Stabilization of linear systems with input delay and saturation – A parametric Lyapunov equation approach . Int. J. Robust Nonlinear Control , 20 ( 13 ) : 1502 – 1519 .