Controllability of Neutral Impulsive Stochastic Integrodifferential Equations Driven by a Rosenblatt Process and Unbounded Delay

K. Ramkumar; K. Ravikumar

Discontinuity, Nonlinearity, and Complexity

Dimitry Volchenkov (editor), Dumitru Baleanu (editor)

Controllability of Neutral Impulsive Stochastic Integrodifferential Equations Driven by a Rosenblatt Process and Unbounded Delay

Discontinuity, Nonlinearity, and Complexity 10(2) (2021) 311--321 | DOI:10.5890/DNC.2021.06.010

K. Ramkumar , K. Ravikumar

Department of Mathematics, PSG College of Arts and Science, Coimbatore, 641014, India

Download Full Text PDF

Abstract

In this manuscript, we establish the controllability of neutral impulsive stochastic integrodifferential equations driven by a Rosenblatt process with infinite delay in separable Hilbert space. The controllability results is obtained by using fixed-point technique and via resolvent operator.

References

[1] Klamka, J. (2007), Stochastic controllability of linear systems with delay in control, Bull. Pol. Acad. Sci. Tech. Sci, 55, 23-29.
[2] Klamka, J. (2013), Controllability of dynamical systems, A survey. Bull. Pol. Acad. Sci. Tech. Sci, 61, 221-229.
[3] Anguraj, A. and Ramkumar, K. (2018), Approximate controllability of semilinear stochastic integrodifferential system with nonlocal conditions, fractal Fract, 2(4), 29.

[4]	Ren, Y., Cheng, X., and Sakthivel, R. (2013), On time dependent stochastic evolution equations driven by fractional Brownian motion in Hilbert space with finite delay, Mathematical Methods in the Applied Sciences, 37, 2177-2184.

[5] Sakthivel, R., Ganesh, R., Ren, Y., and Anthoni, S.M. (2013), Approximate controllability of nonlinear fractional dynamical systems, Commun. Nonlinear Sci. Numer. Simul, 18, 3498-3508.
[6] Tudor, C.A. (2018), Analysis of the Rosenblatt process. ESAIM: Probability and Statistics, 12, 230-257.

[7]	Park, J.Y., Balachandran, K., and Arthi, G. (2009), Controllability of impulsive neutral integrodifferential systems with infinite delay in Banach spaces, Nonlinear Analysis: Hybrid Systems, 3, 184-194.

[8]	Arthi, G., Park, J.H., and Jung, H.Y. (2016), Existence and exponential stability for neutral stochastic integrodifferential equations with impulses driven by a fractional Brownian motion, Communication in nonlinear Science and Numerical similation, 32, 145-157.

[9]	Diop, M.A., Sakthivel, R., and Ndiaye, A.A. (2016), Neutral stochastic integrodifferential equations driven by a fractional Brownian motion with impulsive effects and time varying delays, Mediterr. J. Math, 13(5), 2425-2442.

[10] Chen, M. (2015), Approximate controllability of stochastic equations in a Hilbert space with fractional Brownian motion, Stoch. Dyn, 15, 1-16.
[11] Lakhel, E. (2016), Controllability of neutral stochastic functional integrodifferential equations driven by fractional Brownian motion, Stoch. Anal. Appl, 34(3), 427-440.

[12]	Lakhel, E. and Hajji, S. (2015), Existence and uniqueness of mild solutions to neutral stochastic functional differential equations driven by a fractional Brownian motion with non-Lipschitz coefficients, J. Numerical Mathematics and Stochastic, 7(1), 14-29.

[13] Saravanakumar, S. and Balasubramaniam, P. (2019), On impulsive hilfer fractional stochastic differential system driven by Rosenblatt process, Stoch. Anal. Appl., 37(6), 955-976.
[14] Grimmer, R.C. (1982), Resolvent operators for integral equations in a Banach space, Transactions of the American Mathematical Society, 273, 333-349.
[15] Li, Y. and Liu, B. (2007), Existence of solution of nonlinear neutral functional differential inclusion with infinite delay, Stoc. Anal. Appl, 25, 397-415.
[16] Pazy, A. (1983), Semigroups of linear operators and applications to partial differential equations, Applied Mathematical Sciences, Springer-Verlag: New York, 44.