Stability Analysis of Neural Networks with Leakage, Discrete and Distributed Delays
This paper deals with the problem of stability of
neural networks with leakage, discrete and distributed delays. A
new Lyapunov functional which contains some new double integral
terms are introduced. By using appropriate model transformation
that shifts the considered systems into the neutral-type time-delay
system, and by making use of some inequality techniques,
delay-dependent criteria are developed to guarantee the stability of
the considered system. Finally, numerical examples are provided to
illustrate the usefulness of the proposed main results.
[1] Q.K. Song, Z.J. Zhao, Y.M. Li, Global exponential stability of BAM
neural networks with distributed delays and reaction diffusion terms,
Phys. Lett.A 335(2005) 213-225.
[2] F.Long,S.Fei,Z.Fu,H∞ control and quadratic stabilization of switched
linear systems with linear fractional uncertainties via output
feedback,Nonlinear Anal:Hybrid Syst.2(2008) 18-27.
[3] O.M.Kwon, J.H.Park, Improved delay-dependent stability criterion for
networks with time-varying, Phys Lett. A 373(2009) 529-535.
[4] D. Lin, X. Wang, Self-organizing adaptive fuzzy neural control for the
synchronization of uncertain chaotic systems with random-varying parameters,
Neurocomputing 74 (12C13) (2011) 2241C2249.
[5] J.L. Wang, H.N. Wu, Robust stability and robust passivity of parabolic
complex networks with parametric uncertainties and time-varying
delays, Neurocomputing 87 (2012) 26C32.
[6] J. K. Tain, S.M. Zhong, New delay-dependent exponential stability
criteria for neural networks with discrete and distributed time-varying
delays, Neurocomputing 74 (2011) 3365-3375.
[7] S. Cui, T. Zhao, J. Guo, Global robust exponential stability for interval
neural networks with delay, Chaos Solitons Fractals 42 (3) (2009)
1567C1576.
[8] O.M.Kwon,Ju H.Park,Exponential stability analysis for uncertain neural
networks with interval time-varying delays.Applied Mathematics and
Computation 212(2009) 530-541.
[9] P.G.Park, J.W.Ko, C.Jeong, Reciprocally convex approach to stability of
systems with time-varying delays, Automatica, 47(2011)235-238.
[10] D.Yue, C. Peng, G. Y. Tang, Guaranteed cost control of linear systems
over networks with state and input quantizations, IEE Proc. Control
Theory Appl. 153 (6) (2006) 658-664.
[11] T.Li,Q.Luo,C.Y.Sun,B.Y.Zhang,Exponential stability of recurrent neural
networks with time-varying discrete and distributed delays,Nonlinear
Anal.Real World Appl.10 (2009)2581-2589.
[12] X.Zhu, Y.Wang,Delay-dependent exponential stability for neural
networks with discrete and distributed time-varying delays,Phys.Lett.A
373(2009) 4066-4072.
[13] L.Shi,H.Zhu,S.M.Zhong,L.Y.Hou,Globally exponential stability for
neural networks with time-varying delays,Applied Mathematics and
Computation 219(2013) 10487-10498.
[14] S.M. Lee, O.M. Kwon, J.H. Park, A novel delay-dependent criterion
for delayed neural networks of neutral type, Phys. Lett. A 374(2010)
1843-1848.
[15] J.H. Park, O.M. Kwon, Synchronization of neural networks of neutral
type with stochastic perurbation, Mod. Phys. Lett. B 23(2009) 1743-
1751.
[16] Q. Song, Z. Wang,Neural networks with discrete and distributed
time-varying delays:a general stability analysis, Chaos Solitons Fract.
37(2008) 1538-1547.
[17] C.Lien,L.Chung, Global asymptotic stability for cellular neural networks
with discrete and distributed time-varying delays, Chaos Solitons Fract
34(2007) 1213-1219.
[18] M.T. Hagan, H.B. Demuth, M. Beale, Neural Network Design,PWS
Publishing Company,Boston MA,1996.
[19] A. Cichoki, R. Unbehauen,Neural Networks for Optimization and Signal
Processing, Wiley, Chichester,1993.
[20] J.D.Cao, L.Wang, Exponential stability and periodic oscillatory solution
in BAM networks with delays,IEEE Trans. Neural Netw. 13(2002) 457-
463.
[21] J.H.Park,O.M.Kwon,Further results on state estimation for neural
networks of neutral-type with time-varying delay,App. Math.. Comput.
208(2009) 69-57.
[22] O.M.Kwon, J.H.Park, Improved delay-dependent stability criterion for
networks with time-varying, Phys Lett. A 373(2009) 529-535.
[23] Q.K. Song, Z.J. Zhao, Y.M. Li, Global exponential stability of BAM
neural networks with distributed delays and reaction diffusion terms,
Phys. Lett.A 335(2005) 213-225.
[24] S. Arik,Global asymptotic stability of hybrid bidirectional associative
memory neural networks with time delays. Phys. Lett.A 351(2006) 85-
91.
[25] X.F. Liao, G. Chen, E.N.Sanchez, Delay-dependent exponential stability
analysis of delayed neural networks: an LMI approach, Neural Netw.
15(2002) 855-866.
[26] X. Zhu, Y. Wang, Delay-dependent exponential stability for neural
networks with time-varying delays, Phys. Lett. A 373(2009) 4066-4027.
[27] P.G. Park, J.W. Ko, C. Jeong, Reciprocally convex approach to stability
of systems with time-varying delays, Automatica 47(2011) 235-238.
[28] O.M.Kwon,J.H.Park,S.M.Lee,On robust stability for uncertain neural
networks with interval time-vary delays,IET Control Theory and
Applications 7(2008)625-634.
[29] O.M.Kwon,Ju H.Park,Exponential stability analysis for uncertain neural
networks with interval time-varying delays.Applied Mathematics and
Computation 212(2009)530-541.
[30] Z.G. Wu, J.H. Park, H.Y. Su, J. Chu, New results on exponential
passivity of neural networks with time-varying delays, Nonlinear Anal.
Real World Appl. 13(2012) 1593-1599.
[1] Q.K. Song, Z.J. Zhao, Y.M. Li, Global exponential stability of BAM
neural networks with distributed delays and reaction diffusion terms,
Phys. Lett.A 335(2005) 213-225.
[2] F.Long,S.Fei,Z.Fu,H∞ control and quadratic stabilization of switched
linear systems with linear fractional uncertainties via output
feedback,Nonlinear Anal:Hybrid Syst.2(2008) 18-27.
[3] O.M.Kwon, J.H.Park, Improved delay-dependent stability criterion for
networks with time-varying, Phys Lett. A 373(2009) 529-535.
[4] D. Lin, X. Wang, Self-organizing adaptive fuzzy neural control for the
synchronization of uncertain chaotic systems with random-varying parameters,
Neurocomputing 74 (12C13) (2011) 2241C2249.
[5] J.L. Wang, H.N. Wu, Robust stability and robust passivity of parabolic
complex networks with parametric uncertainties and time-varying
delays, Neurocomputing 87 (2012) 26C32.
[6] J. K. Tain, S.M. Zhong, New delay-dependent exponential stability
criteria for neural networks with discrete and distributed time-varying
delays, Neurocomputing 74 (2011) 3365-3375.
[7] S. Cui, T. Zhao, J. Guo, Global robust exponential stability for interval
neural networks with delay, Chaos Solitons Fractals 42 (3) (2009)
1567C1576.
[8] O.M.Kwon,Ju H.Park,Exponential stability analysis for uncertain neural
networks with interval time-varying delays.Applied Mathematics and
Computation 212(2009) 530-541.
[9] P.G.Park, J.W.Ko, C.Jeong, Reciprocally convex approach to stability of
systems with time-varying delays, Automatica, 47(2011)235-238.
[10] D.Yue, C. Peng, G. Y. Tang, Guaranteed cost control of linear systems
over networks with state and input quantizations, IEE Proc. Control
Theory Appl. 153 (6) (2006) 658-664.
[11] T.Li,Q.Luo,C.Y.Sun,B.Y.Zhang,Exponential stability of recurrent neural
networks with time-varying discrete and distributed delays,Nonlinear
Anal.Real World Appl.10 (2009)2581-2589.
[12] X.Zhu, Y.Wang,Delay-dependent exponential stability for neural
networks with discrete and distributed time-varying delays,Phys.Lett.A
373(2009) 4066-4072.
[13] L.Shi,H.Zhu,S.M.Zhong,L.Y.Hou,Globally exponential stability for
neural networks with time-varying delays,Applied Mathematics and
Computation 219(2013) 10487-10498.
[14] S.M. Lee, O.M. Kwon, J.H. Park, A novel delay-dependent criterion
for delayed neural networks of neutral type, Phys. Lett. A 374(2010)
1843-1848.
[15] J.H. Park, O.M. Kwon, Synchronization of neural networks of neutral
type with stochastic perurbation, Mod. Phys. Lett. B 23(2009) 1743-
1751.
[16] Q. Song, Z. Wang,Neural networks with discrete and distributed
time-varying delays:a general stability analysis, Chaos Solitons Fract.
37(2008) 1538-1547.
[17] C.Lien,L.Chung, Global asymptotic stability for cellular neural networks
with discrete and distributed time-varying delays, Chaos Solitons Fract
34(2007) 1213-1219.
[18] M.T. Hagan, H.B. Demuth, M. Beale, Neural Network Design,PWS
Publishing Company,Boston MA,1996.
[19] A. Cichoki, R. Unbehauen,Neural Networks for Optimization and Signal
Processing, Wiley, Chichester,1993.
[20] J.D.Cao, L.Wang, Exponential stability and periodic oscillatory solution
in BAM networks with delays,IEEE Trans. Neural Netw. 13(2002) 457-
463.
[21] J.H.Park,O.M.Kwon,Further results on state estimation for neural
networks of neutral-type with time-varying delay,App. Math.. Comput.
208(2009) 69-57.
[22] O.M.Kwon, J.H.Park, Improved delay-dependent stability criterion for
networks with time-varying, Phys Lett. A 373(2009) 529-535.
[23] Q.K. Song, Z.J. Zhao, Y.M. Li, Global exponential stability of BAM
neural networks with distributed delays and reaction diffusion terms,
Phys. Lett.A 335(2005) 213-225.
[24] S. Arik,Global asymptotic stability of hybrid bidirectional associative
memory neural networks with time delays. Phys. Lett.A 351(2006) 85-
91.
[25] X.F. Liao, G. Chen, E.N.Sanchez, Delay-dependent exponential stability
analysis of delayed neural networks: an LMI approach, Neural Netw.
15(2002) 855-866.
[26] X. Zhu, Y. Wang, Delay-dependent exponential stability for neural
networks with time-varying delays, Phys. Lett. A 373(2009) 4066-4027.
[27] P.G. Park, J.W. Ko, C. Jeong, Reciprocally convex approach to stability
of systems with time-varying delays, Automatica 47(2011) 235-238.
[28] O.M.Kwon,J.H.Park,S.M.Lee,On robust stability for uncertain neural
networks with interval time-vary delays,IET Control Theory and
Applications 7(2008)625-634.
[29] O.M.Kwon,Ju H.Park,Exponential stability analysis for uncertain neural
networks with interval time-varying delays.Applied Mathematics and
Computation 212(2009)530-541.
[30] Z.G. Wu, J.H. Park, H.Y. Su, J. Chu, New results on exponential
passivity of neural networks with time-varying delays, Nonlinear Anal.
Real World Appl. 13(2012) 1593-1599.
@article{"International Journal of Engineering, Mathematical and Physical Sciences:66743", author = "Qingqing Wang and Baocheng Chen and Shouming Zhong", title = "Stability Analysis of Neural Networks with Leakage, Discrete and Distributed Delays", abstract = "This paper deals with the problem of stability of
neural networks with leakage, discrete and distributed delays. A
new Lyapunov functional which contains some new double integral
terms are introduced. By using appropriate model transformation
that shifts the considered systems into the neutral-type time-delay
system, and by making use of some inequality techniques,
delay-dependent criteria are developed to guarantee the stability of
the considered system. Finally, numerical examples are provided to
illustrate the usefulness of the proposed main results.
", keywords = "Neural networks, Stability, Time-varying delays,
Linear matrix inequality.", volume = "8", number = "2", pages = "419-5", }
