Delay-Dependent Stability of Cellular Neural Networks with Multiple Delays

Back propagation (BP) neural network is used to approximate the dynamic character of nonlinear discrete-time system. Considering the unmodeling dynamics of the system, the weights of neural network are updated by using a dead-zone algorithm and a robust adaptive controller based on the BP neural network is proposed. For the situation that jumping change parameters exist, multiple neural networks with multiple weights are built to cover the uncertainty of parameters, and multiple controllers based on these models are set up. At every sample time, a performance index function based on the identification error will be used to choose the optimal model and the corresponding controller. Different kinds of combinations of fixed model and adaptive model will be used for robust multiple models adaptive control (MMAC). The proof of stability and convergence of MMAC are given, and the significant efficacy of the proposed methods is tested by simulation. This paper deals with the problem of delay-dependent stability criterion of delay-difference system with multiple delays of cellular neural networks. Based on quadratic Lyapunov functional approach and free-weighting matrix approach, some linear matrix inequality criteria are found to guarantee delay-dependent asymptotical stability of these systems. And one example illustrates the exactness of the proposed criteria.

[2]  Kumpati S. Narendra,et al.  Adaptive control using multiple models , 1997, IEEE Trans. Autom. Control..

[3]  Zidong Wang,et al.  Asymptotic stability for neural networks with mixed time-delays: The discrete-time case , 2009, Neural Networks.

[4]  Graham C. Goodwin,et al.  Adaptive filtering prediction and control , 1984 .

[5]  Kreangkri Ratchagit,et al.  Asymptotic Stability of Delay-Difference System of Hopfield Neural Networks via Matrix Inequalities and Application , 2007, Int. J. Neural Syst..

[6]  Tianyou Chai,et al.  Nonlinear multivariable adaptive control using multiple models and neural networks , 2007, Autom..

[7]  Grienggrai Rajchakit,et al.  Mean Square Exponential Stability of Stochastic Switched System with Interval Time-Varying Delays , 2012 .

[8]  J. Liang,et al.  Robust Synchronization of an Array of Coupled Stochastic Discrete-Time Delayed Neural Networks , 2008, IEEE Transactions on Neural Networks.

[9]  V. Phat,et al.  Stability and stabilization of switched linear discrete-time systems with interval time-varying delay , 2011 .

[10]  Chien-Yu Lu,et al.  A Delay-Dependent Approach to Passivity Analysis for Uncertain Neural Networks with Time-varying Delay , 2008, Neural Processing Letters.

[11]  Vu Ngoc Phat,et al.  LMI approach to exponential stability of linear systems with interval time-varying delays , 2012 .

[12]  K. Ratchagit,et al.  ASYMPTOTIC STABILITY OF NONLINEAR DELAY-DIFFERENCE SYSTEM VIA MATRIX INEQUALITIES AND APPLICATION , 2009 .

[13]  M. Rajchakit,et al.  A switching rule for exponential stability of switched recurrent neural networks with interval time-varying delay , 2013 .

[14]  M. Rajchakit,et al.  LMI approach to robust stability and stabilization of nonlinear uncertain discrete-time systems with convex polytopic uncertainties , 2012 .

[15]  Jun Li,et al.  Delay-Dependent Stability Criterion of Arbitrary Switched Linear Systems with Time-Varying Delay , 2010 .