Journal of Applied Nonlinear Dynamics
Controllability of Nonlinear Neutral Fractional Integrodifferential Systems with Infinite Delay
Journal of Applied Nonlinear Dynamics 6(3) (2017) 333--344 | DOI:10.5890/JAND.2017.09.002
K. Balachandran; S. Divya
Department of Mathematics, Bharathiar University, Coimbatore-641046, India
Download Full Text PDF
Abstract
In this paper, we establish sufficient conditions for the controllability of neutral fractional integrodifferential systems with infinite delay and infinite neutral fractional systems with implicit derivative. Fixed point approaches are employed for achieving the required results. Examples are provided to illustrate the efficiency of the results.
References
-
| [1] | Hilfer, R. (2000), Applications of Fractional Calculus in Physics, World Scientific Publishing: River Edge. |
-
| [2] | Oldham, K. and Spanier, J. (1974), The Fractional Calculus, Academic Press: London. |
-
| [3] | Debnath, L. (2003), Recent applications of fractional calculus to science and engineering, International Jour- nal of Mathematics and Mathematical Science, 54, 3413-3442. |
-
| [4] | French, M. and Rogers, J. (2001), A survey of fractional calculus for structural dynamics applications, In IMAX-IX: A Conference on Structural Dynamics, 5-8. |
-
| [5] | Engheta, N. (1996), On fractional calculus and fractionalmulti poles in electromagnetism, IEEE Transactions, 44, (1996) 554-566. |
-
| [6] | Bagley, R.L. and Torvik, P.J. (1983), A theoretical basis for the application of fractional calculus to viscoelasticity, Journal of Rheology, 27, 201-210. |
-
| [7] | Bagley, R.L. and Torvik, P.J. (1986), On the fractional calculus model of viscoelastic behavior, Journal of Rheology, 30, 133-155. |
-
| [8] | Koeller, R.C. (1984), Applications of fractional calculus to the theory of viscoelasticity, Journal of Applied Mechanics, 51, 299-307. |
-
| [9] | Bencholira, M., Henderson, J., Natouyas, S.K., and Ouahab, A. (2008), Existence results for fractional order functional differential equations with infinite delay, Journal of Mathematical Analysis and Applications, 338, 1340-1350. |
-
| [10] | Ladaci, S., Loiseau, J.L., and Charef, A. (2008), Fractional order adaptive high-gain controllers for a class of linear systems , Communication in Nonlinear Science and Numerical Simulation, 13, 707-714. |
-
| [11] | Rida, S.Z., El-sherbiny, H.M., and Arafa, A.A.M. (2008), On the solution of the fractional nonlinear Schrödinger equation, Physics Letter-A, 372, 553-558. |
-
| [12] | Su, X. and Zhang, S. (2009), Solutions to boundary-value problems for nonlinear differential equations of fractional order, Electronic Journal of Differential Equations, 26, 1-15. |
-
| [13] | Klamka, J. (1993), Controllability of Dynamical Systems, Kluwer Academic: Dordrecht. |
-
| [14] | Balachandran, K., Park, J.Y., and Trujillo, J.J. (2012), Controllability of nonlinear fractional dynamical systems, Nonlinear Analysis: Theory, Methods and Applications, 75, 1919-1926. |
-
| [15] | Balachandran, K. and Dauer, J.P. (1987), Controllability of nonlinear systems via fixed point theorems, Journal of Optimization Theory and Applications, 53, 345-352. |
-
| [16] | Granas, A. and Dugundji, J. (2003), Fixed Point Theroy, Springer: New York. |
-
| [17] | Klamka, J. (2000), Schauder’s fixed-point theorem in nonlinear controllability problems, Control and Cyber- netics, 29, 153-165. |
-
| [18] | Balachandran, K. and Kokila, J. (2012), On the controllability of fractional dynamical systems, International Journal of Applied Mathematics and Computer Science, 22, 523-531. |
-
| [19] | Balachandran, K. and Kokila, J. (2013), Constrained controllability of fractional dynamical systems, Numer- ical Functional Analysis and Optimization, 34, 1187-1205. |
-
| [20] | Balachandran, K. and Divya, S. (2014), Controllability of nonlinear implicit fractional integro-differential systems, International Journal of Applied Mathematics and Computer Science, 24, 713-722 . |
-
| [21] | Balachandran, K., Divya, S., Rivero M., and Trujillo, J.J. (2015), Controllability of nonlinear implicit neutral fractional Volterra integrodifferential systems, Journal of Vibration and Control, 22, 2165-2172. |
-
| [22] | Balachandran, K. (1992), Controllability of neutral Volterra integrodifferential systems, Journal of Australian Mathematical Society, Ser. B, 34, 18-25. |
-
| [23] | Balachandran, K., Divya, S., Rodrígrez-Germá, L., and Trujillo, J.J. (2016), Relative controllability of nonlinear neutral fractional integro-differential systems with distributed delays in control, Mathematical Methods in the Applied Sciences, 39, 214-224. |
-
| [24] | Balachandran, K. and Divya, S. (2015), Relative controllability of nonlinear neutral Volterra fractional integro-differential systems with multiple delays in control, Journal of Applied Nonlinear Dynamics, in press. |
-
| [25] | Kexue, L. and Jigen, P. (2011), Laplace transform and fractional differential equations, Applied Mathematics Letters, 2,4 2019-2023. |
-
| [26] | Kilbas, A.A., Srivastava, H.M., and Trujillo, J.J. (2006), Theory and Applications of Fractional Differential Equations, Elsevier: Amsterdam. |
-
| [27] | Podlubny, I. (1999), Fractional Differential Equations, Academic Press: New York. |
-
| [28] | Do, V.N. (1990), Controllability of semilinear systems, Journal of Optimization Theory and Applications, 65, 41-52. |
-
| [29] | Dacka, C. (1980), On the controllability of a class of nonlinear systems, IEEE Transaction on Automatic Control, 25, 263-266. |
