Controllability of nonlinear stochastic neutral impulsive systems

The impulsive differential equations provide a natural description of observed evolutionary processes, which are subject to short term perturbations acting instantaneously in the form of impulses. Uncertainty can be incorporated either as an expression of our lack of precise knowledge or as a true driving force. In the latter case it is useful to model the system by a stochastic or noise driven model which leads to the study of stochastic impulsive differential systems. In this paper, the notion of complete controllability for nonlinear stochastic neutral impulsive systems in finite dimensional spaces is introduced. Sufficient conditions ensuring the complete controllability of the nonlinear stochastic impulsive system are established. The results are obtained by using the Banach fixed point theorem. Several forms of integrodifferential impulsive systems are indicated. Two examples are discussed to illustrate the efficiency of the obtained results.

[1]  Jerzy Klamka Schauder's fixed-point theorem in nonlinear controllability problems , 2000 .

[2]  S. Sivasundaram,et al.  Controllability of impulsive hybrid integro-differential systems , 2008 .

[3]  Aristotle Arapostathis,et al.  A Note on Controllability of Impulsive Systems , 2000 .

[4]  Shouming Zhong,et al.  Mean square stability analysis of impulsive stochastic differential equations with delays , 2008 .

[5]  Nazim I. Mahmudov,et al.  Controllability of non-linear stochastic systems , 2003 .

[6]  Daoyi Xu,et al.  Mean square exponential stability of impulsive control stochastic systems with time-varying delay , 2009 .

[7]  Xinghuo Yu,et al.  On controllability and observability for a class of impulsive systems , 2002, Syst. Control. Lett..

[8]  Krishnan Balachandran,et al.  Controllability of stochastic systems with distributed delays in control , 2009, Int. J. Control.

[9]  Krishnan Balachandran,et al.  COMPLETE CONTROLLABILITY OF STOCHASTIC INTEGRODIFFERENTIAL SYSTEMS , 2008 .

[10]  Jerzy Zabczyk,et al.  Controllability of stochastic linear systems , 1981 .

[11]  Nazim I. Mahmudov Controllability of linear stochastic systems , 2001, IEEE Trans. Autom. Control..

[12]  Zhiguo Yang,et al.  Exponential p-stability of impulsive stochastic differential equations with delays , 2006 .

[13]  Yang Tao,et al.  Impulsive stabilization for control and synchronization of chaotic systems: theory and application to secure communication , 1997 .

[14]  Daoyi Xu,et al.  Exponential stability of nonlinear impulsive neutral integro-differential equations , 2008 .

[15]  Xinghuo Yu,et al.  Controllability and observability of linear time-varying impulsive systems , 2002 .

[17]  Krishnan Balachandran,et al.  Controllability of semilinear stochastic integrodifferential systems , 2007, Kybernetika.

[18]  Daoyi Xu,et al.  Exponential stability of nonlinear impulsive neutral differential equations with delays , 2007 .

[19]  Arkadiĭ Khaĭmovich Gelig,et al.  Stability and Oscillations of Nonlinear Pulse-Modulated Systems , 1998 .

[20]  Krishnan Balachandran,et al.  Controllability of nonlinear Itô type stochastic integrodifferential systems , 2008, J. Frankl. Inst..

[21]  K. Balachandran,et al.  Controllability of nonlinear systems via fixed-point theorems , 1987 .

[22]  T. A. Burton,et al.  Volterra integral and differential equations , 1983 .

[23]  Jitao Sun,et al.  p-Moment stability of stochastic differential equations with impulsive jump and Markovian switching , 2006, Autom..

[24]  Jerzy Klamka,et al.  Stochastic Controllability of Linear Systems With State Delays , 2007, Int. J. Appl. Math. Comput. Sci..

[25]  Krishnan Balachandran,et al.  Controllability of stochastic integrodifferential systems , 2007, Int. J. Control.

[26]  V. Lakshmikantham,et al.  Method of Variation of Parameters for Dynamic Systems , 1998 .

[27]  Nazim I. Mahmudov,et al.  On controllability of nonlinear stochastic systems , 2006 .

[28]  Allan R. Willms,et al.  Impulsive controllability of linear dynamical systems with applications to maneuvers of spacecraft , 1996 .

[29]  V. Lakshmikantham,et al.  Theory of Impulsive Differential Equations , 1989, Series in Modern Applied Mathematics.