Year 2022,
Volume: 10 Issue: 1, 171 - 181, 15.04.2022
Radhakrishnan Bheeman
,
Sathya Thangavel
References
- [1] K. Balachandran and J.P. Dauer, Controllability of nonlinear systems in Banach spaces a survey, J. Optim. Theory. Appl., 115(2002), 7-28.
- [2] D. Bugajewski and G.M. Guerekata, On the topological structure of almost automorphic and asymptoticcally almost automorphic solutions of differential
and integral equations in abstract spaces, Nonlinear. Anal., 59(2004), 1333-1345.
- [3] D. Bugajewski and T. Diagana, Almost automorphy of the convolution operator and applications to differential and functional-differential equations,
Nonlinear Stud., 13(2006), 129-140.
- [4] H. Bohr, Zur theorie der fastperiodischen funktionen, Acta. Math., 45(1925), 29-127.
- [5] J.Cao, Z.Hang and G.M. Guerekata, Existence of asymtotically almost automorphic mild solutions for nonautonomous semilinear evolution equations,
Elec.J. Diff.Equs., 37(2018), 1-16.
- [6] H.S.Ding and S.M.Wan, Asymptotically almost automorphic solutions of differential equations with piecewise constant argument, Open Math.,
15(2017), 595-610.
- [7] T. Diagana, E. Hernande and J.P.C. Dos Santos, Existence of asymptotically almost automorphic solutions to some abstract partial neutral integrodifferential
equations, Nonlinear Anal., 71(2009), 248-257.
- [8] T. Diagana and G.M. Guerekata, Almost automorphic solutions to some classes of partial evolution equations, Appl. Math. Lett., 20(2007), 462-466.
- [9] J.P.C. Dos Santos and S.M. Guzzo, Solutions in several types of periodicity for partial neutral integrodifferential equations, Electronic. J. Diff. Equs.,
31(2013), 1-18.
- [10] N. Drisi , B. Essbbar and K.Ezzinbi, Compact almost automorphic solutions for some nonlinear dissipative differential equations in Banach spaces,
Numeri. Fun. Anal. Optimi., 39(2018), 825-841.
- [11] J. Francois M.I.Ouchouron, M. Kamenski and S.Ponomarev, Almost periodic solutions of evolution equations, Topol. Methods Nonlinear. Anal.,
50(2017), 65-87.
- [12] G.M. Guerekata, Almost automorphic functions and almost periodic functions in abstract spaces, Springer science and Business media New York,
London, Moscow, 2001.
- [13] J.K. Hale and S.M.Lunel, Introduction to Functional-differential Equations, Appl. Math. Sci, Springer-Verlag. New York, 1993.
- [14] H.R.Henriquez, E. Hernandez and J.P.C Dos Santos, Asymptotically almost periodic and almost periodic solutions for partial neutral integrodifferential
equations, Z. Anal. Anwend., 26(2007), 261-375.
- [15] E. Hernandez and J.P.C Dos Santos, Asymptotically almost periodic and almost periodic solutions for a class of partial integrodifferential equations,
Electronic. J. Diff. Equs., 38 (2006), 1-8.
- [16] E. Hernandez and J.P.C Dos Santos, Existence results for partial neutral integro-differential equations with unbounded delay, Applicable Anal.,
86(2007), 223-237.
- [17] M. Kosti, On generlized Cn almost periodic solutions of abstract volterra integrodifferential differential equations, Novi Sad J. Math., 48(2018), 73-91.
- [18] A. Lunardi, On the linear heat equation with fading memory. SIAM J. Math. Anal. 21(1990), 1213-1224.
- [19] A. Pazy, Semigroups of Linear Operators and Applications to Partial Differential Equations, Springer, New York, 1983.
- [20] B. Radhakrishnan and K. Balachandran, Controlllability of nonlocal impulsive functional integrodifferential evolution systems, J. Nonlinear Sci. Appl.,
4(2011), 281-291
- [21] B. Radhakrishnan and K. Balachandran, Controllability of neutral evolution integrodifferential systems with state dependent delay, J. Optim. Theory
Appl., 153(2012), 85-97.
- [22] B. Radhakrishnan and K. Balachandran, Controllability of impulsive neutral functional evolution integrodifferential systems with infinite delay,
Nonlinear Anal.: Hybrid Systems., 5 (2011), 655-670.
- [23] B. Radhakrishnan and T. Sathya, Controllability and Periodicity Results for Neutral Impulsive Evolution System in Banach spaces, Dyn. Conti. Disc.
Impul. Systems. Series A: Math. Analy., 26(2019), 261-277.
- [24] B. Radhakrishnan, P. Anukokila and T. Sathya,Controllability results for nonlinear impulsive fuzzy neutral integrodifferential evolution systems,
International J. Pure Appl. Math., 114 (2017), 61-76.
- [25] P. Raynaud de Fitte. Almost Periodicity and Periodicity for Non-autonomous Random Dynamical Systems. HAL-02444923, 2019.
- [26] B.E.Sebbar, K. Ezzinbi and K. Khalil, Compact almost automorphic solutions for semilinear parabolic evolution equations, Applicable Anal., 1(2020),
1-27.
- [27] L.Wang and Z.Wang, Controllability of abstract neutral functional differential systems with infinite delay, Dyn. Contin. Discrete Impuls. Syst., 9
(2002), 59-70.
- [28] S. Zaidman, Almost-periodic Functions in Abstract Spaces, Research Notes in Mathematics. Pitman publishing., Londan, 126, 1985.
A Study on Controllability and Periodicity Solutions for Nonlinear Neutral Integrodifferential System
Year 2022,
Volume: 10 Issue: 1, 171 - 181, 15.04.2022
Radhakrishnan Bheeman
,
Sathya Thangavel
Abstract
The objective of this paper is to present sufficient conditions for controllability and periodicity solutions of an integrodifferential system in Banach space. The main results are obtained by using resolvent operators and a fixed point approach. Further, the mild solution of the integrodifferential system has been shown to be compact asymptotically almost automorphic . Then uniqueness of the asymptotically almost automorphic solution has been shown by the Banach contraction principle. Finally, an example is provided to show the effectiveness of the obtained theoretical result.
Supporting Institution
Nil
References
- [1] K. Balachandran and J.P. Dauer, Controllability of nonlinear systems in Banach spaces a survey, J. Optim. Theory. Appl., 115(2002), 7-28.
- [2] D. Bugajewski and G.M. Guerekata, On the topological structure of almost automorphic and asymptoticcally almost automorphic solutions of differential
and integral equations in abstract spaces, Nonlinear. Anal., 59(2004), 1333-1345.
- [3] D. Bugajewski and T. Diagana, Almost automorphy of the convolution operator and applications to differential and functional-differential equations,
Nonlinear Stud., 13(2006), 129-140.
- [4] H. Bohr, Zur theorie der fastperiodischen funktionen, Acta. Math., 45(1925), 29-127.
- [5] J.Cao, Z.Hang and G.M. Guerekata, Existence of asymtotically almost automorphic mild solutions for nonautonomous semilinear evolution equations,
Elec.J. Diff.Equs., 37(2018), 1-16.
- [6] H.S.Ding and S.M.Wan, Asymptotically almost automorphic solutions of differential equations with piecewise constant argument, Open Math.,
15(2017), 595-610.
- [7] T. Diagana, E. Hernande and J.P.C. Dos Santos, Existence of asymptotically almost automorphic solutions to some abstract partial neutral integrodifferential
equations, Nonlinear Anal., 71(2009), 248-257.
- [8] T. Diagana and G.M. Guerekata, Almost automorphic solutions to some classes of partial evolution equations, Appl. Math. Lett., 20(2007), 462-466.
- [9] J.P.C. Dos Santos and S.M. Guzzo, Solutions in several types of periodicity for partial neutral integrodifferential equations, Electronic. J. Diff. Equs.,
31(2013), 1-18.
- [10] N. Drisi , B. Essbbar and K.Ezzinbi, Compact almost automorphic solutions for some nonlinear dissipative differential equations in Banach spaces,
Numeri. Fun. Anal. Optimi., 39(2018), 825-841.
- [11] J. Francois M.I.Ouchouron, M. Kamenski and S.Ponomarev, Almost periodic solutions of evolution equations, Topol. Methods Nonlinear. Anal.,
50(2017), 65-87.
- [12] G.M. Guerekata, Almost automorphic functions and almost periodic functions in abstract spaces, Springer science and Business media New York,
London, Moscow, 2001.
- [13] J.K. Hale and S.M.Lunel, Introduction to Functional-differential Equations, Appl. Math. Sci, Springer-Verlag. New York, 1993.
- [14] H.R.Henriquez, E. Hernandez and J.P.C Dos Santos, Asymptotically almost periodic and almost periodic solutions for partial neutral integrodifferential
equations, Z. Anal. Anwend., 26(2007), 261-375.
- [15] E. Hernandez and J.P.C Dos Santos, Asymptotically almost periodic and almost periodic solutions for a class of partial integrodifferential equations,
Electronic. J. Diff. Equs., 38 (2006), 1-8.
- [16] E. Hernandez and J.P.C Dos Santos, Existence results for partial neutral integro-differential equations with unbounded delay, Applicable Anal.,
86(2007), 223-237.
- [17] M. Kosti, On generlized Cn almost periodic solutions of abstract volterra integrodifferential differential equations, Novi Sad J. Math., 48(2018), 73-91.
- [18] A. Lunardi, On the linear heat equation with fading memory. SIAM J. Math. Anal. 21(1990), 1213-1224.
- [19] A. Pazy, Semigroups of Linear Operators and Applications to Partial Differential Equations, Springer, New York, 1983.
- [20] B. Radhakrishnan and K. Balachandran, Controlllability of nonlocal impulsive functional integrodifferential evolution systems, J. Nonlinear Sci. Appl.,
4(2011), 281-291
- [21] B. Radhakrishnan and K. Balachandran, Controllability of neutral evolution integrodifferential systems with state dependent delay, J. Optim. Theory
Appl., 153(2012), 85-97.
- [22] B. Radhakrishnan and K. Balachandran, Controllability of impulsive neutral functional evolution integrodifferential systems with infinite delay,
Nonlinear Anal.: Hybrid Systems., 5 (2011), 655-670.
- [23] B. Radhakrishnan and T. Sathya, Controllability and Periodicity Results for Neutral Impulsive Evolution System in Banach spaces, Dyn. Conti. Disc.
Impul. Systems. Series A: Math. Analy., 26(2019), 261-277.
- [24] B. Radhakrishnan, P. Anukokila and T. Sathya,Controllability results for nonlinear impulsive fuzzy neutral integrodifferential evolution systems,
International J. Pure Appl. Math., 114 (2017), 61-76.
- [25] P. Raynaud de Fitte. Almost Periodicity and Periodicity for Non-autonomous Random Dynamical Systems. HAL-02444923, 2019.
- [26] B.E.Sebbar, K. Ezzinbi and K. Khalil, Compact almost automorphic solutions for semilinear parabolic evolution equations, Applicable Anal., 1(2020),
1-27.
- [27] L.Wang and Z.Wang, Controllability of abstract neutral functional differential systems with infinite delay, Dyn. Contin. Discrete Impuls. Syst., 9
(2002), 59-70.
- [28] S. Zaidman, Almost-periodic Functions in Abstract Spaces, Research Notes in Mathematics. Pitman publishing., Londan, 126, 1985.