[Engheta, N. (1997). On the role of fractional calculus in electromagnetic theory, IEEE Transactions on Antennas and Propagation 39(4): 35-46.10.1109/74.632994]Search in Google Scholar
[Farina, L. and Rinaldi, S. (2000). Positive Linear Systems: Theory and Applications, J. Wiley, New York, NY.10.1002/9781118033029]Search in Google Scholar
[Ferreira, N.M.F. and Machado, J.A.T. (2003). Fractional-order hybrid control of robotic manipulators, Proceedings of the 11-th International Conference on Advanced Robotics, ICAR'2003, Coimbra, Portugal, pp. 393-398.]Search in Google Scholar
[Gałkowski, K. (2005). Fractional polynomials and nD systems. Proceedings of the IEEE International Symposium on Circuits and Systems, ISCAS'2005, Kobe, Japan, CD-ROM.10.1109/ISCAS.2005.1465018]Search in Google Scholar
[Kaczorek, T. (2002). Positive 1D and 2D Systems, Springer-Verlag, London.10.1007/978-1-4471-0221-2]Search in Google Scholar
[Kaczorek, T. (2006). Computation of realizations of discretetime cone systems, Bulletin of the Polish Academy of Sciences 54(3): 347-350.]Search in Google Scholar
[Kaczorek, T. (2007a). Reachability and controllability to zero tests for standard and positive fractional discrete-time systems, JESA Journal, 2007, (submitted).10.23919/ECC.2007.7068247]Search in Google Scholar
[Kaczorek, T. (2007b). Reachability and controllability to zero of positive fractional discrete-time systems, Machine Intelligence and Robotic Control 6(4): 139-143.10.23919/ECC.2007.7068247]Search in Google Scholar
[Kaczorek, T. (2007c). Cone-realizations for multivariable continuous-me systems with delays, Advances in Systems Science and Applications 8(1): 25-34.]Search in Google Scholar
[Kaczorek, T. (2007d). Reachability and controllability to zero of cone fractional linear systems, Archives of Control Sciences 17(3): 357-367.10.23919/ECC.2007.7068247]Search in Google Scholar
[Kaczorek, T. (2008). Fractional positive continuous-time linear systems and their reachability, International Journal of Applied Mathematics and Computer Science 18(2):223-228.10.2478/v10006-008-0020-0]Search in Google Scholar
[Miller, K.S. and Ross, B. (1993). An Introduction to the Fractional Calculus and Fractional Differential Equations, Wiley, New York, NY.]Search in Google Scholar
[Nishimoto, K. (1984). Fractional Calculus, Decartess Press, Koriama.]Search in Google Scholar
[Oldham, K.B. and Spanier, J. (1974). The Fractional Calculus, Academic Press, New York, NY.]Search in Google Scholar
[Ortigueira, M.D. (1997). Fractional discrete-time linear systems, Proceedings of the IEEE International Conference on Acoustics, Speech, and Signal Processing 97, Munich, Germany, pp. 2241-2244.]Search in Google Scholar
[Ostalczyk, P. (2000). The non-integer difference of the discretetime function and its application to the control system synthesis, International Journal of Systems Science 31(12): 1551-1561.10.1080/00207720050217322]Search in Google Scholar
[Ostalczyk, P. (2004). Fractional-order backward difference equivalent forms. Part I—Horner's form, Proceedings of the 1-st IFAC Workshop on Fractional Differentation and Its Applications, FDA'04, Enseirb, Bordeaux, France, pp. 342-347.]Search in Google Scholar
[Ostalczyk, P. (2004). Fractional-order backward difference equivalent forms. Part II—Polynomial form, Proceedings of the 1-st IFAC Workshop on Fractional Differentation and Its Applications, FDA'04, Enseirb, Bordeaux, France, pp. 348-353.]Search in Google Scholar
[Oustaloup, A. (1993). Commande CRONE, Hermès, Paris.]Search in Google Scholar
[Oustaloup, A. (1995). La dèrivation non entière. Hermès, Paris.]Search in Google Scholar
[Podlubny, I. (1999). Fractional Differential Equations, Academic Press, San Diego, CA.]Search in Google Scholar
[Podlubny, I., Dorcak, L. and Kostial, I. (1997). On fractional derivatives, fractional order systems and PIλDμ- controllers, Proceedings of the 36-th IEEE Conference on Decision and Control, San Diego, CA, USA, pp. 4985-4990.]Search in Google Scholar
[Reyes-Melo, M.E., Martinez-Vega, J.J., Guerrero-Salazar C.A. and Ortiz-Mendez, U. (2004). Modelling and relaxation phenomena in organic dielectric materials. Application of differential and integral operators of fractional order, Journal of Optoelectronics and Advanced Materials 6(3): 1037-1043.]Search in Google Scholar
[Riu, D., Retiére, N. and Ivanes, M. (2001). Turbine generator modeling by non-integer order systems, Proceedings of the IEEE International Conference on Electric Machines and Drives Conference, IEMDC 2001, Cambridge, MA, USA, pp. 185-187.]Search in Google Scholar
[Samko, S.G., Kilbas, A.A. and Martichew, O.I. (1993). Fractional Integrals and Derivative. Theory and Applications, Gordon & Breac, London.]Search in Google Scholar
[Sierociuk, D. and Dzieliński, D. (2006). Fractional Kalman filter algorithm for the states, parameters and order of fractional system estimation, International Journal of Applied Mathematics and Computer Science 16(1): 129-140.]Search in Google Scholar
[Sjöberg, M. and Kari, L. (2002). Non-linear behavior of a rubber isolator system using fractional derivatives, Vehicle System Dynamics 37(3): 217-236.10.1076/vesd.37.3.217.3532]Search in Google Scholar
[Vinagre, B.M., Monje, C.A. and Calderon, A.J. (2002). Fractional order systems and fractional order control actions, Lecture 3 IEEE CDC'02 TW#2: Fractional Calculus Applications in Automatic Control and Robotics.]Search in Google Scholar
[Vinagre, B.M. and Feliu, V. (2002). Modeling and control of dynamic system using fractional calculus: Application to electrochemical processes and flexible structures, Proceedings of the 41-st IEEE Conference on Decision and Control, Las Vegas, NV, USA, pp. 214-239.]Search in Google Scholar
[Zaborowsky, V. and Meylaov, R. (2001). Informational network traffic model based on fractional calculus, Proceedings of International Conference on Info-tech and Info-net, ICII 2001, Beijing, China, Vol. 1, pp. 58-63.]Search in Google Scholar