[Bose, N.K. (1982). Applied Multidimensional System Theory, Van Nostrand Reinhold Co, New York, NY.]Search in Google Scholar
[Bose, N. K, Buchberger, B. and Guiver, J.P. (2003). Multidimensional Systems Theory and Applications, Kluwer Academic Publishers, Dordrecht.]Search in Google Scholar
[Busłowicz, M. (2006), Stability of positive linear discrete-time systems with unit delay with canonical forms of state matrices, Proceedings of 12-th IEEE International Conference on Methods and Models in Automation and Robotics, Międzyzdroje, Poland.]Search in Google Scholar
[Farina, L. and Rinaldi, S. (2000). Positive Linear Systems Theory and Applications, Wiley, New York, NY.10.1002/9781118033029]Search in Google Scholar
[Fornasini, E. and Marchesini, G. (1976) State-space realization theory of two-dimensional filters, IEEE Transactions on Automatic Control 21(4): 481-491.10.1109/TAC.1976.1101305]Search in Google Scholar
[Fornasini, E. and Marchesini, G. (1978). Double indexed dynamical systems, Mathematical Systems Theory 12: 59-72.10.1007/BF01776566]Search in Google Scholar
[Gałkowski, K. (2001). State Space Realizations of Linear 2D Systems with Extensions to the General nD (n > 2) Case, Springer, London.]Search in Google Scholar
[Kaczorek, T. (1985). Two-Dimensional Linear Systems, Springer, Berlin.10.1007/BFb0005617]Search in Google Scholar
[Kaczorek, T. (1996). Reachability and controllability of non-negative 2D Roesser type models, Bulletin of the Polish Academy of Sciences: Technical Sciences 44(4): 405-410.]Search in Google Scholar
[Kaczorek, T. (1998). Vectors and Matrices in Automation and Electrotechnics, Wydawnictwo Naukowo-Techniczne, Warsaw (in Polish).]Search in Google Scholar
[Kaczorek, T. (2001). Positive 1D and 2D Systems, Springer-Verlag, London.10.1007/978-1-4471-0221-2]Search in Google Scholar
[Kaczorek, T. (2003). Realizations problem for positive discretetime systems with delays, Systems Science 29(1): 15-29.]Search in Google Scholar
[Kaczorek, T. (2004). Realization problem for positive 2D systems with delays, Machine Intelligence and Robotic Control 6(2): 61-68.]Search in Google Scholar
[Kaczorek, T. (2005). Reachability and minimum energy control of positive 2D systems with delays, Control and Cybernetics 34(2): 411-423.]Search in Google Scholar
[Kaczorek, T. (2006a). Minimal positive realizations for discretetime systems with state time-delays, The International Journal for Computation and Mathematics in Electrical and Electronic Engineering, COMPEL 25(4): 812-826.10.1108/03321640610684015]Search in Google Scholar
[Kaczorek, T. (2007b). Positive 2D systems with delays, Proceedings of the 12-th IEEE\IFAC International Conference on Methods in Automation and Robotics, Międzyzdroje, Poland.]Search in Google Scholar
[Kaczorek, T. (2007). Positive discrete-time linear Lyapunov systems, Proceedings of the 15-th Mediterranean Conference of Control and Automation, MED, Athens, Greece.]Search in Google Scholar
[Kaczorek, T. (2008a). Asymptotic stability of positive 2D linear systems, Proceedings of the 13-th Scientific Conference on Computer Applications in Electrical Engineering, Poznań, Poland.]Search in Google Scholar
[Kaczorek, T. (2008b). LMI approach to stability of 2D positive systems, Multidimensional Systems and Signal Processing, (in press).10.1007/s11045-008-0050-7]Search in Google Scholar
[Kaczorek, T. (2008c). Asymptotic stability of positive 2D linear systems with delays, Lecture Notes in Electrical Engineering: Numerical Linear Algebra in Signals, Systems and Control, Springer-Verlag.10.1109/NDS.2009.5196162]Search in Google Scholar
[Kaczorek, T. and Przyborowski, P. (2007a). Positive continuoustime linear Lyapunov systems, Proceedings of the International Conference on Computer as a Tool, EUROCON 2007, Warsaw, Poland, pp. 731-737.10.1109/EURCON.2007.4400242]Search in Google Scholar
[Kaczorek, T. and Przyborowski, P. (2007b). Positive continuoustime linear time-varying Lyapunov systems, Proceedings of the 16-th International Conference on Systems Science, Wrocław, Poland, Vol. I, pp. 140-149.10.1109/EURCON.2007.4400242]Search in Google Scholar
[Kaczorek, T. and Przyborowski, P. (2007c). Continuoustime linear Lyapunov cone-systems, Proceedings of the 13-th IEEE IFAC International Conference on Methods and Models in Automation and Robotics, Szczecin, Poland, pp. 225-229.10.5772/6103]Search in Google Scholar
[Kaczorek, T. and Przyborowski, P. (2007d). Positive discretetime linear Lyapunov systems with delays, Przegląd Elektrotechniczny (2): 12-15.10.1109/EURCON.2007.4400242]Search in Google Scholar
[Kaczorek, T. and Przyborowski, P. (2007e). Positive linear Lyapunov systems, FNA-ANS International Journal—Problems of Nonlinear Analysis in Engineering Systems 13(2): 35-60.]Search in Google Scholar
[Kaczorek, T. and Przyborowski, P. (2008). Reachability, controllability to zero and observability of the positive discretetime Lyapunov systems, Control and Cybernetics Journal, (submitted).]Search in Google Scholar
[Klamka, J. (1991). Controllability of Dynamical Systems, Kluwer, Dordrecht.]Search in Google Scholar
[Klamka, J. (1996a). Controllability of 2-D systems, Proceedings of the 3-rd Conference on Methods and Models in Automation and Robotics, Międzyzdroje, Poland, pp. 207-212.]Search in Google Scholar
[Klamka, J. (1996b). Controllability and minimum energy control of 2-D linear systems, Proceedings of the International Conference on Circuits Systems and Computers, Athens, Greece, Vol. 1, pp. 45-50.]Search in Google Scholar
[Klamka, J. (1997a). Controllability of infinite-dimensional 2-D linear systems, Advances in Systems Science and Applications 1(1): 537-543.]Search in Google Scholar
[Klamka, J. (1997b). Controllability of nonlinear 2-D systems, Nonlinear Analysis, Theory, Methods and Applications 30(5): 2963-2968.10.1016/S0362-546X(97)00465-3]Search in Google Scholar
[Klamka, J. (1997c). Controllability of 2-D systems systems: A survey, Applied Mathematics and Computer Science 7(4): 101-120.]Search in Google Scholar
[Klamka, J. (1997d). Controllability and minimum energy control of 2-D linear systems, Proceedings of the American Control Conference ACC'97, Albuquerque, NM, USA, Vol. 5, pp. 3141-3143.10.1109/ACC.1997.612037]Search in Google Scholar
[Klamka, J. (1998a). Constrained controllability of positive 2-D systems, Bulletin of the Polish Academy of Sciences: Technical Sciences 46(1): 95-104.]Search in Google Scholar
[Klamka, J. (1998b). Constrained controllability of 2-D systems, Proceedings of the Symposium on Modelling Analysis and Control, Hammamet, Tunisia.]Search in Google Scholar
[Klamka, J. (1998c). Constrained controllability of linear positive 2-D systems, Proceedings of the 9-th Symposium on Systems, Modelling, Control, SMC-9, Zakopane, Poland.]Search in Google Scholar
[Klamka, J. (1999a). Local controllability of 2-D nonlinear systems, Bulletin of the Polish Academy of Sciences: Technical Sciences 47(2): 153-161.]Search in Google Scholar
[Klamka, J. (1999b). Controllability of 2-D linear systems, in P.M. Frank (Ed.), Advances in Control. Highlights of ECC'99, Springer, Berlin, pp. 319-326.10.1007/978-1-4471-0853-5_15]Search in Google Scholar
[Klamka, J. (1999c). Controllability of 2-D nonlinear systems, Proceedings of the European Control Conference, Karlsruhe, Germany, pp. 1121-1127.10.23919/ECC.1999.7100091]Search in Google Scholar
[Klamka, J. (2002). Positive controllability of positive dynamical systems, Proceedings of the American Control Conference, Anchorage, AK, USA, (on CD-ROM).10.1109/ACC.2002.1025385]Search in Google Scholar
[Klamka, J. (2005). Approximate constrained controllability of mechanical systems, Journal of Theoretical and Applied Mechanics 43(3): 539-554.]Search in Google Scholar
[Kurek, J. (1985). The general state-space model for a two-dimensional linear digital systems, IEEE Transactions on Automatic Control 30(6): 600-602.10.1109/TAC.1985.1103998]Search in Google Scholar
[Murty, M.S.N. and Apparao, B.V. (2005). Controllability and observability of Lyapunov systems, Ranchi University Mathematical Journal 32: 55-65.]Search in Google Scholar
[Przyborowski, P. (2008a). Positive fractional discrete-time Lyapunov systems, Archives of Control Sciences 18(LIV)(1): 5-18.]Search in Google Scholar
[Przyborowski, P. (2008b). Fractional discrete-time Lyapunov cone-systems, Przegląd Elektrotechniczny (5): 47-52.10.5772/6103]Search in Google Scholar
[Przyborowski, P. and Kaczorek, T. (2008). Linear Lyapunov cone-systems, in J.M. Ramos Arreguin (Ed.), Automation and Robotics—New Challenges, I-Tech Education and Publishing, Vienna, (in press).10.5772/6103]Search in Google Scholar
[Roesser, R.P. (1975). A discrete state-space model for linear image processing, IEEE Transactions on Automatic Control 20(1): 1-10.10.1109/TAC.1975.1100844]Search in Google Scholar
[Twardy, M. (2007). An LMI approach to checking stability of 2D positive system, Bulletin of the Polish Academy of Sciences: Technical Sciences 54(4): 385-395]Search in Google Scholar
[Valcher, M.E. (1997). On the internal stability and asymptotic behavior of 2D positive systems, IEEE Transactions On Circuits and Systems—I 44(7): 602-613.10.1109/81.596941]Search in Google Scholar
