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Li, Chunxiang; Sun, Jitao

Stability analysis of nonlinear stochastic differential delay systems under impulsive control. (English) Zbl 1248.90030

Phys. Lett., A 374, No. 9, 1154-1158 (2010).
Summary: In this Letter, we study the stability of nonlinear stochastic differential delay systems under impulsive control. First, we construct an impulsive control for a nonlinear stochastic differential delay system. Then, the equivalent relation between the stability of the nonlinear stochastic differential delay system under impulsive control and that of a corresponding nonlinear stochastic differential delay system without impulses is established. Third, some sufficient conditions ensuring various stabilities of the nonlinear stochastic differential delay systems under impulsive control are obtained. Finally, an example is also discussed to illustrate the effectiveness of the obtained results.

Cited in 21 Documents

MSC:

90B15 Stochastic network models in operations research
49N25 Impulsive optimal control problems
37H10 Generation, random and stochastic difference and differential equations
35B35 Stability in context of PDEs

Keywords:

stability; stochastic system; delay; impulsive control
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\textit{C. Li} and \textit{J. Sun}, Phys. Lett., A 374, No. 9, 1154--1158 (2010; Zbl 1248.90030)
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References:

[1] Prussing, J.E.; Wellnitz, L.J., J. guidance control dynam., 12, 487, (1989)
[2] Liu, X.Z.; Rohlf, K., IMA J. math. control inform., 15, 269, (1998)
[3] Lakshmikantham, V.; Bainov, D.D.; Simeonov, P.S., Theory of impulsive differential equations, (1989), World Scientific Singapore · Zbl 0719.34002
[4] Shen, J.H., Nonlinear anal., 36, 119, (1999)
[5] Sun, J.T.; Zhang, Y.P., Phys. lett. A, 304, 130, (2002)
[6] Luo, Z.G.; Nieto, J.J., Nonlinear anal., 70, 2248, (2009)
[7] Li, W.T.; Huo, H.F., Nonlinear anal., 59, 857, (2004)
[8] Chen, Z.; Ruan, J., Phys. lett. A, 345, 101, (2005)
[9] Zhang, Y.; Sun, J.T., Nonlinear anal., 68, 3665, (2008)
[10] Luo, Z.G.; Shen, J.H., Appl. math. lett., 22, 163, (2009)
[11] Ding, W.; Han, M.A.; Li, M.L., Phys. lett. A, 373, 832, (2009)
[12] Ding, W., Commun. nonlinear sci. numer. simulat., 14, 3945, (2009)
[13] Bahar, A.; Mao, X.R., J. math. anal. appl., 292, 364, (2004)
[14] Luo, J.W., J. comput. appl. math., 198, 143, (2007)
[15] Mao, X., IET control theory appl., 6, 1551, (2007)
[16] Rakkiyappan, R.; Balasubramaniam, R.; Lakshmanan, S., Phys. lett. A, 372, 5290, (2008)
[17] Liu, Y.R.; Wang, Z.D.; Liu, X.H., Neurocomputing, 71, 823, (2008)
[18] Wu, Z.G.; Su, H.Y.; Chu, J.; Zhou, W.N., Phys. lett. A, 373, 1546, (2009)
[19] Yang, Z.G.; Xu, D.Y.; Xiang, L., Phys. lett. A, 359, 129, (2006)
[20] Yang, J.; Zhong, S.M.; Luo, W.P., J. comput. appl. math., 216, 474, (2008)
[21] Zhang, H.; Guan, Z.H., Phys. lett. A, 372, 6053, (2008)
[22] Liu, Y.R.; Wang, Z.D.; Liu, X.H., Phys. lett. A, 372, 3986, (2008)
[23] Zhao, S.W.; Sun, J.T.; Wu, H.J., IET control theory appl., 3, 1547, (2009)
[24] Sakthivel, R.; Luo, J., J. math. anal. appl., 356, 1, (2009)
This reference list is based on information provided by the publisher or from digital mathematics libraries. Its items are heuristically matched to zbMATH identifiers and may contain data conversion errors. It attempts to reflect the references listed in the original paper as accurately as possible without claiming the completeness or perfect precision of the matching.