Frequency distributed model of Caputo derivatives and robust stability of a class of multi-variable fractional-order neural networks with uncertainties

This paper addresses the problems of the robust stability of a class of multi-variable fractional order neural networks with linear fractional uncertainties. Firstly, a continuous frequency distributed model of Caputo derivatives which extend the continuous frequency distributed model of the fractional integrator to Caputo derivatives is given. Then, a sufficient condition of robust stability for a class of multi-variable fractional order neural networks with linear fractional uncertainties is presented via the Lyapunov direct method and linear matrix inequality approach. Finally, two numerical examples are provided to demonstrate the effectiveness of the result.

[1]  Yongguang Yu,et al.  Mittag-Leffler stability of fractional-order Hopfield neural networks , 2015 .

[2]  Alain Oustaloup,et al.  State variables and transients of fractional order differential systems , 2012, Comput. Math. Appl..

[3]  Changyin Sun,et al.  Delay-dependent robust stability criteria for delay neural networks with linear fractional uncertainties , 2009 .

[4]  Alain Oustaloup,et al.  A Lyapunov approach to the stability of fractional differential equations , 2009, Signal Process..

[5]  Changpin Li,et al.  A survey on the stability of fractional differential equations , 2011 .

[6]  Yangquan Chen,et al.  Necessary and sufficient stability condition of fractional-order interval linear systems , 2008, Autom..

[7]  Yangquan Chen,et al.  Computers and Mathematics with Applications Stability of Fractional-order Nonlinear Dynamic Systems: Lyapunov Direct Method and Generalized Mittag–leffler Stability , 2022 .

[8]  Yangquan Chen,et al.  Robust controllability of interval fractional order linear time invariant systems , 2006, Signal Process..

[9]  Zhenjiang Zhao,et al.  Finite-time stability analysis of fractional-order neural networks with delay , 2015, Neurocomputing.

[10]  P LazarevićMihailo,et al.  Finite-time stability analysis of fractional order time-delay systems , 2009 .

[11]  Mohammad Bagher Menhaj,et al.  Fractional-Order Hopfield Neural Networks , 2008, ICONIP.

[12]  V. Lakshmikantham,et al.  Theory of fractional functional differential equations , 2008 .

[13]  D. Matignon,et al.  Diffusive Realisations of Fractional Integrodifferential Operators: Structural Analysis Under Approximation , 1998 .

[14]  Rathinasamy Sakthivel,et al.  Existence of solutions for nonlinear fractional stochastic differential equations , 2013 .

[15]  Huaguang Zhang,et al.  A Comprehensive Review of Stability Analysis of Continuous-Time Recurrent Neural Networks , 2014, IEEE Transactions on Neural Networks and Learning Systems.

[16]  Mohammad Saleh Tavazoei,et al.  A note on the stability of fractional order systems , 2009, Math. Comput. Simul..

[17]  Aleksandar M. Spasic,et al.  Finite-time stability analysis of fractional order time-delay systems: Gronwall's approach , 2009, Math. Comput. Model..

[18]  E. Yaz Linear Matrix Inequalities In System And Control Theory , 1998, Proceedings of the IEEE.

[19]  Igor Podlubny,et al.  Mittag-Leffler stability of fractional order nonlinear dynamic systems , 2009, Autom..

[20]  Yangquan Chen,et al.  Robust stability test of a class of linear time-invariant interval fractional-order system using Lyapunov inequality , 2007, Appl. Math. Comput..

[21]  Lihua Xie,et al.  Output feedback H∞ control of systems with parameter uncertainty , 1996 .

[22]  X. Liao,et al.  Edge detection of noisy images based on cellular neural networks , 2011 .

[23]  Manuel A. Duarte-Mermoud,et al.  Lyapunov functions for fractional order systems , 2014, Commun. Nonlinear Sci. Numer. Simul..

[24]  Yongguang Yu,et al.  Robust Stability Analysis of Fractional-Order Hopfield Neural Networks with Parameter Uncertainties , 2014 .

[25]  Mathieu Moze,et al.  LMI stability conditions for fractional order systems , 2010, Comput. Math. Appl..

[26]  Neville J. Ford,et al.  Analysis and numerical methods for fractional differential equations with delay , 2013, J. Comput. Appl. Math..

[27]  Yi Chai,et al.  Stability Analysis of a Class of Fractional-order Neural Networks , 2014 .

[28]  I. Podlubny Fractional differential equations : an introduction to fractional derivatives, fractional differential equations, to methods of their solution and some of their applications , 1999 .

[29]  Liping Chen,et al.  Finite-time stability of fractional delayed neural networks , 2015, Neurocomputing.

[30]  N. Ford,et al.  Analysis of Fractional Differential Equations , 2002 .

[31]  Alain Oustaloup,et al.  The infinite state approach: Origin and necessity , 2013, Comput. Math. Appl..

[32]  Stephen P. Boyd,et al.  Linear Matrix Inequalities in Systems and Control Theory , 1994 .

[33]  Shaher Momani,et al.  Generalized differential transform method: Application to differential equations of fractional order , 2008, Appl. Math. Comput..

[34]  D. Matignon Stability results for fractional differential equations with applications to control processing , 1996 .

[35]  Margarita Rivero,et al.  Stability of Fractional Order Systems , 2013 .

[36]  Zidong Wang,et al.  Discrete-time recurrent neural networks with time-varying delays: Exponential stability analysis , 2007 .

[37]  Nusret Tan,et al.  Robust stability analysis of fractional order interval polynomials. , 2009, ISA transactions.

[38]  Yigang He,et al.  New results on stability and stabilization of a class of nonlinear fractional-order systems , 2013, Nonlinear Dynamics.

[39]  Jinde Cao,et al.  Delay-Dependent Stability Criterion of Caputo Fractional Neural Networks with Distributed Delay , 2014 .

[40]  Yangquan Chen,et al.  Robust stability check of fractional order linear time invariant systems with interval uncertainties , 2005, IEEE International Conference Mechatronics and Automation, 2005.

[41]  D. Baleanu,et al.  Stability analysis of Caputo fractional-order nonlinear systems revisited , 2011, Nonlinear Dynamics.

[42]  Ivo Petras,et al.  Stability of Fractional-Order Systems , 2011 .

[43]  Wang Li,et al.  Robust stability analysis for a class of fractional order systems with uncertain parameters , 2011, J. Frankl. Inst..

[44]  I. Petráš Stability of Fractional-Order Systems with Rational Orders , 2008, 0811.4102.

[45]  H. Srivastava,et al.  Theory and Applications of Fractional Differential Equations , 2006 .

[46]  Manuel A. Duarte-Mermoud,et al.  Using general quadratic Lyapunov functions to prove Lyapunov uniform stability for fractional order systems , 2015, Commun. Nonlinear Sci. Numer. Simul..

[47]  M. Nakagawa,et al.  Basic Characteristics of a Fractance Device , 1992 .

[48]  Tiedong Ma,et al.  Dynamic analysis of a class of fractional-order neural networks with delay , 2013, Neurocomputing.

[49]  Jun-Guo Lu,et al.  Robust asymptotical stability of fractional-order linear systems with structured perturbations , 2013, Comput. Math. Appl..

[50]  R. Hilfer Applications Of Fractional Calculus In Physics , 2000 .

[51]  Haijun Jiang,et al.  Α-stability and Α-synchronization for Fractional-order Neural Networks , 2012, Neural Networks.

[52]  Jun-Guo Lu,et al.  Robust Stability and Stabilization of Fractional-Order Interval Systems with the Fractional Order $\alpha$: The $0≪\alpha≪1$ Case , 2010, IEEE Transactions on Automatic Control.