Exponential stability of homogeneous impulsive positive delay systems of degree one

This paper investigates the global exponential stability of homogeneous impulsive positive delay systems of degree one. By using the max-separable Lyapunov functions, a sufficient criterion is obtained for exponential stability of continuous-time homogeneous impulsive positive delay systems of degree one. We also provide the corresponding counterpart for discrete-time homogeneous impulsive positive delay systems of degree one. Our results show that a stable impulse-free system can keep its original stability property under certain destabilising impulsive perturbations. It should be noted that it's the first time that the exponential stability results for homogeneous impulsive positive delay systems of degree one are given. Numerical examples are provided to demonstrate the effectiveness of the derived results.

[1]  Hamid Reza Feyzmahdavian,et al.  Exponential Stability of Homogeneous Positive Systems of Degree One With Time-Varying Delays , 2013, IEEE Transactions on Automatic Control.

[2]  Hamid Reza Feyzmahdavian,et al.  Asymptotic Stability and Decay Rates of Homogeneous Positive Systems With Bounded and Unbounded Delays , 2014, SIAM J. Control. Optim..

[3]  Xinzhi Liu,et al.  The method of Lyapunov functionals and exponential stability of impulsive systems with time delay , 2007 .

[4]  Hamid Reza Feyzmahdavian,et al.  Stability Analysis of Monotone Systems via Max-Separable Lyapunov Functions , 2016, IEEE Transactions on Automatic Control.

[5]  Uwe Helmke,et al.  Positive observers for linear positive systems, and their implications , 2011, Int. J. Control.

[6]  Jinde Cao,et al.  Stability Analysis of Markovian Jump Stochastic BAM Neural Networks With Impulse Control and Mixed Time Delays , 2012, IEEE Transactions on Neural Networks and Learning Systems.

[7]  Jiu-Gang Dong,et al.  On the Decay Rates of Homogeneous Positive Systems of Any Degree With Time-Varying Delays , 2015, IEEE Transactions on Automatic Control.

[8]  Wei Xing Zheng,et al.  Exponential stability of nonlinear time-delay systems with delayed impulse effects , 2011, Autom..

[9]  M. E. Valcher Controllability and reachability criteria for discrete time positive systems , 1996 .

[10]  Joseph J. DiStefano,et al.  Identification of the dynamics of thyroid hormone metabolism , 1975, Autom..

[11]  Oliver Mason,et al.  Observations on the stability properties of cooperative systems , 2009, Syst. Control. Lett..

[12]  Peng Shi,et al.  Stability of switched positive linear systems with average dwell time switching , 2012, Autom..

[13]  Jinde Cao,et al.  A unified synchronization criterion for impulsive dynamical networks , 2010, Autom..

[14]  Jiang-Wen Xiao,et al.  Impulsive effects on the stability and stabilization of positive systems with delays , 2017, J. Frankl. Inst..

[15]  Wassim M. Haddad,et al.  Stability theory for nonnegative and compartmental dynamical systems with time delay , 2004, Proceedings of the 2004 American Control Conference.

[16]  Long Wang,et al.  Stability Analysis for Continuous-Time Positive Systems With Time-Varying Delays , 2010, IEEE Transactions on Automatic Control.

[17]  Huamin Wang,et al.  Stability of impulsive delayed linear differential systems with delayed impulses , 2015, J. Frankl. Inst..

[18]  David J. Hill,et al.  Uniform stability of large-scale delay discrete impulsive systems , 2009, Int. J. Control.

[19]  Dimitri Peaucelle,et al.  LMI approach to linear positive system analysis and synthesis , 2014, Syst. Control. Lett..

[20]  Kok Lay Teo,et al.  Exponential Stability With $L_{2}$-Gain Condition of Nonlinear Impulsive Switched Systems , 2010, IEEE Transactions on Automatic Control.

[21]  Xiaodi Li,et al.  Stability of nonlinear differential systems with state-dependent delayed impulses , 2016, Autom..

[22]  James Lam,et al.  Static output-feedback stabilization with optimal L1-gain for positive linear systems , 2016, Autom..

[23]  S. Rinaldi,et al.  Positive Linear Systems: Theory and Applications , 2000 .

[24]  Yang Liu,et al.  Controllability for a Class of Linear Time-Varying Impulsive Systems With Time Delay in Control Input , 2011, IEEE Transactions on Automatic Control.

[25]  Meng Liu,et al.  Brief Paper - Exponential stability of impulsive positive systems with mixed time-varying delays , 2014 .

[26]  Yu Zhang,et al.  Impulsive Control of Discrete Systems With Time Delay , 2009, IEEE Transactions on Automatic Control.

[27]  Vladimir L. Kharitonov,et al.  Stability of Time-Delay Systems , 2003, Control Engineering.

[28]  Gang Feng,et al.  Stabilisation of second-order LTI switched positive systems , 2011, Int. J. Control.

[29]  Corentin Briat,et al.  Dwell-time stability and stabilization conditions for linear positive impulsive and switched systems , 2016, Nonlinear Analysis: Hybrid Systems.

[30]  Daoyi Xu,et al.  Stability Analysis and Design of Impulsive Control Systems With Time Delay , 2007, IEEE Transactions on Automatic Control.

[31]  Long Wang,et al.  Stability Analysis of Positive Systems With Bounded Time-Varying Delays , 2009, IEEE Transactions on Circuits and Systems II: Express Briefs.

[32]  Yu Zhang,et al.  Global exponential stability of delay difference equations with delayed impulses , 2017, Math. Comput. Simul..

[33]  Dirk Aeyels,et al.  Stabilization of positive linear systems , 2001, Syst. Control. Lett..

[34]  Hieu Minh Trinh,et al.  Stability analysis of a general family of nonlinear positive discrete time-delay systems , 2016, Int. J. Control.