References
- Anderson, B.D.O., & Jury, E.I. (1976). Generalized Bezoutian and Sylvester matrices in multivariable linear control. IEEE Transactions on Automatic Control, AC-21, 551–556.
- Bart, H., Gohberg I., Kaashoek, M.A., & Ran, A.C.M. (2005). Schur complements and state space realizations. Linear Algebra and its Applications, 399, 203–224.
- Bitmead, R.R., & Kung, S.Y. (1978). Greatest common divisors via generalized Sylvester and Bezout matrices. IEEE Transactions on Automatic Control, AC-23, 1043–1047.
- Chen, C.T. (1970). Introduction to linear system theory. New York, NY: Holt, Rinehart and Winston.
- Gohberg, I., Lancaster, P., & Rodman, L. (1978). Spectral analysis of families of operator polynomials and generalized Vandermode matrix i. The case of finite dimension. Topics in functional analysis. New York, NY: Academic Press.
- Gohberg, I., Lancaster, P., & Rodman, L. (2006). Invariant subspaces of matrices with applications. New York, NY: Society for Industrial and Applied Mathematics.
- Karl, W.C., & Verghese, G.C. (1993). A sufficient condition for the stability of interval matrix polynomials. IEEE Transaction on Automatic Control, 38, 1139–1143.
- Lerer, L., & Tismenetsky, M. (1982). The Bezoutian and the eigenvalue-separation problem for matrix polynomials. Integral Equations and Operator Theory, 5, 386–445.
- Olshevsky, A., & Olshevsky, V. (2005). Kharitonov’s theorem and Bezoutians. Linear Algebra and its Applications, 399, 285–297.
- Vidyasagar, M. (1985). Control system synthesis: A factorization approach. Cambridge (MA): The MIT Press.
- Yang, Z., & Hu, Y. (2004). A generalized Bezoutian matrix with respect to a polynomial sequence of interpolatory type. IEEE Transaction on Automatic Control, 49, 1783–1789.
- Zhou, K., Doyle, J.C., & Glover, K. (1996). Robust and optimal control. Upper Saddle River, NJ: Prentice Hall.