[Antoniou, E., Vardulakis, A. and Karampetakis, N. (1998). A spectral characterization of the behavior of discrete time AR-representations over a finite time interval, Kybernetika34(5): 555–564.10.23919/ECC.1997.7082163]Search in Google Scholar
[Antoulas, A. and Willems, J. (1993). A behavioral approach to linear exact modeling., IEEE Transactions on Automatic Control38(12): 1776–1802.]Search in Google Scholar
[Antsaklis, P.J. and Michel, A.N. (2006). Linear Systems, 2nd Edn., Birkhäuser, Boston, MA.]Search in Google Scholar
[Bernstein, D.S. (2009). Matrix Mathematics. Theory, Facts, and Formulas, 2nd Edn., Princeton University Press, Princeton, NJ.10.1515/9781400833344]Search in Google Scholar
[Campbell, S. (1980). Singular Systems of Differential Equations, Vol. 1, Research Notes in Mathematics, Pitman, London.]Search in Google Scholar
[Gantmacher, F.R. (1959). The Theory of Matrices, Vols. 1, 2, Chelsea Publishing Co., New York, NY.]Search in Google Scholar
[Gohberg, I., Lancaster, P. and Rodman, L. (2009). Matrix Polynomials, Reprint, SIAM, Philadelphia, PA.10.1137/1.9780898719024]Search in Google Scholar
[Hayton, G., Pugh, A. and Fretwell, P. (1988). Infinite elementary divisors of a matrix polynomial and implications, International Journal of Control47(1): 53–64.10.1080/00207178808905995]Search in Google Scholar
[Kaczorek, T. (2007). Polynomial and Rational Matrices. Applications in Dynamical Systems Theory, Springer, Dordrecht.10.1007/978-1-84628-605-6]Search in Google Scholar
[Kaczorek, T. (2014). Minimum energy control of fractional descriptor positive discrete-time linear systems, International Journal of Applied Mathematics and Computer Science24(4): 735–743, DOI: 10.2478/amcs-2014-0054.10.2478/amcs-2014-0054]Search in Google Scholar
[Kaczorek, T. (2015). Analysis of the descriptor Roesser model with the use of the Drazin inverse, International Journal of Applied Mathematics and Computer Science25(3): 539–546, DOI: 10.1515/amcs-2015-0040.10.1515/amcs-2015-0040]Search in Google Scholar
[Karampetakis, N.P. (2004). On the solution space of discrete time AR-representations over a finite time horizon, Linear Algebra and Its Applications382: 83–116.10.1016/j.laa.2003.11.026]Search in Google Scholar
[Karampetakis, N.P. (2015). Construction of algebraic-differential equations with given smooth and impulsive behaviour, IMA Journal of Mathematical Control and Information32(1): 195–224.10.1093/imamci/dnt041]Search in Google Scholar
[Karampetakis, N.P. and Vologiannidis, S. (2003). Infinite elementary divisor structure-preserving transformations for polynomial matrices, International Journal of Applied Mathematics and Computer Science13(4): 493–503.]Search in Google Scholar
[Karampetakis, N., Vologiannidis, S. and Vardulakis, A. (2004). A new notion of equivalence for discrete time AR representations, International Journal of Control77(6): 584–597.10.1080/002071709410001703223]Search in Google Scholar
[Markovsky, I., Willems, J.C., Van Huffel, S. and De Moor, B. (2006). Exact and Approximate Modeling of Linear Systems. A Behavioral Approach, SIAM, Philadelphia, PA.10.1137/1.9780898718263]Search in Google Scholar
[Praagman, C. (1991). Invariants of polynomial matrices, Proceedings of the 1st European Control Conference, Grenoble, France, pp. 1274–1277.]Search in Google Scholar
[Vardulakis, A. (1991). Linear Multivariable Control. Algebraic Analysis and Synthesis Methods, John Wiley & Sons, Chichester.]Search in Google Scholar
[Vardulakis, A., Limebeer, D. and Karcanias, N. (1982). Structure and Smith–MacMillan form of a rational matrix at infinity, International Journal of Control35(4): 701–725.10.1080/00207178208922649]Search in Google Scholar
[Willems, J.C. (1986). From time series to linear system, II: Exact modelling, Automatica22(6): 675–694.10.1016/0005-1098(86)90005-1]Search in Google Scholar
[Willems, J.C. (1991). Paradigms and puzzles in the theory of dynamical systems, IEEE Transansactions on Automatic Control36(3): 259–294.10.1109/9.73561]Search in Google Scholar
[Willems, J.C. (2007). Recursive computation of the MPUM, in A. Chiuso et al. (Eds.), Modeling, Estimation and Control, Springer, Berlin, pp. 329–344.10.1007/978-3-540-73570-0_25]Search in Google Scholar
[Zaballa, I. and Tisseur, F. (2012). Finite and infinite elementary divisors of matrix polynomials: A global approach, MIMS EPrint 2012.78, Manchester Institute for Mathematical Sciences, University of Manchester, Manchester.]Search in Google Scholar
[Zerz, E. (2008a). Behavioral systems theory: A survey, International Journal of Applied Mathematics and Computer Science18(3): 265–270, DOI: 10.2478/v10006-008-0024-9.10.2478/v10006-008-0024-9]Search in Google Scholar
[Zerz, E. (2008b). The discrete multidimensional MPUM, Multidimensional System Signal Processing19(3–4): 307–321.10.1007/s11045-007-0043-y]Search in Google Scholar
[Zerz, E., Levandovskyy, V. and Schindelar, K. (2011). Exact linear modeling with polynomial coefficients, Multidimensional System Signal Processing22(1–3): 55–65.10.1007/s11045-010-0125-0]Search in Google Scholar