Novel delay-partitioning stabilization approach for networked control system via Wirtinger-based inequalities.

This paper studies the problems of stability analysis and state feedback stabilization for networked control system. By developing a novel delay-partitioning approach, the information on both the range of network-induced delay and the maximum number of consecutive data packet dropouts can be taken into full consideration. Various augmented Lyapunov-Krasovskii functionals (LKFs) with triple-integral terms are constructed for the two delay subintervals. Moreover, the Wirtinger-based inequalities in combination with an improved reciprocal convexity are utilized to estimate the derivatives of LKFs more accurately. The proposed approaches have improved the stability conditions without increasing much computational complexity. Based on the obtained stability criterion, a stabilization controller design approach is also given. Finally, four numerical examples are presented to illustrate the effectiveness and outperformance of the proposed approaches.

[1]  Pin-Lin Liu Further results on delay-range-dependent stability with additive time-varying delay systems. , 2014, ISA transactions.

[2]  Pin-Lin Liu,et al.  Further improvement on delay-range-dependent stability results for linear systems with interval time-varying delays. , 2013, ISA transactions.

[3]  Bing Chen,et al.  Complete LKF approach to stabilization for linear systems with time-varying input delay , 2015, J. Frankl. Inst..

[4]  Guo-Ping Liu,et al.  Improvement of State Feedback Controller Design for Networked Control Systems , 2008, IEEE Transactions on Circuits and Systems II: Express Briefs.

[5]  L. Ghaoui,et al.  A cone complementarity linearization algorithm for static output-feedback and related problems , 1997, IEEE Trans. Autom. Control..

[6]  Ali Vahidian Kamyad,et al.  Modified fractional Euler method for solving Fuzzy Fractional Initial Value Problem , 2013, Commun. Nonlinear Sci. Numer. Simul..

[7]  Dong Yue,et al.  Stabilization of Systems With Probabilistic Interval Input Delays and Its Applications to Networked Control Systems , 2009, IEEE Transactions on Systems, Man, and Cybernetics - Part A: Systems and Humans.

[8]  Xin Zhou,et al.  Delay-partitioning approach for systems with interval time-varying delay and nonlinear perturbations , 2015, J. Comput. Appl. Math..

[9]  Mehran Mazandarani,et al.  Differentiability of type-2 fuzzy number-valued functions , 2014, Commun. Nonlinear Sci. Numer. Simul..

[10]  Pin-Lin Liu New results on delay-range-dependent stability analysis for interval time-varying delay systems with non-linear perturbations. , 2015, ISA transactions.

[11]  Min Wu,et al.  Stability analysis for control systems with aperiodically sampled data using an augmented Lyapunov functional method , 2013 .

[12]  Guoping Liu,et al.  Improved delay-range-dependent stability criteria for linear systems with time-varying delays , 2010, Autom..

[13]  Hong Gu,et al.  Asymptotic and exponential stability of uncertain system with interval delay , 2012, Appl. Math. Comput..

[14]  Jianguo Dai,et al.  A delay system approach to networked control systems with limited communication capacity , 2010, J. Frankl. Inst..

[15]  Jun Cheng,et al.  Further improved stability criteria for uncertain T-S fuzzy systems with time-varying delay by (m,N)-delay-partitioning approach. , 2015, ISA transactions.

[16]  Baotong Cui,et al.  Delay-dividing approach for absolute stability of Lurie control system with mixed delays , 2010 .

[17]  Jian-an Wang,et al.  Less conservative stability criteria for neural networks with interval time-varying delay based on delay-partitioning approach , 2015, Neurocomputing.

[18]  Pin-Lin Liu,et al.  Improved delay-range-dependent robust stability for uncertain systems with interval time-varying delay. , 2014, ISA transactions.

[19]  Sung Hyun Kim,et al.  Improved approach to robust stability and H∞ performance analysis for systems with an interval time-varying delay , 2012, Appl. Math. Comput..

[20]  Peng Shi,et al.  A novel approach on stabilization for linear systems with time-varying input delay , 2012, Appl. Math. Comput..

[21]  Xun-lin Zhu,et al.  Brief paper New stability criteria for continuous-time systems with interval time-varying delay , 2010 .

[22]  Frédéric Gouaisbaut,et al.  Wirtinger-based integral inequality: Application to time-delay systems , 2013, Autom..

[23]  R. Rakkiyappan,et al.  Stability of stochastic neural networks of neutral type with Markovian jumping parameters: A delay-fractioning approach , 2014, J. Frankl. Inst..

[24]  Xinzhi Liu,et al.  New delay-dependent stability criteria for neutral-type neural networks with mixed random time-varying delays , 2015, Neurocomputing.

[25]  Zhengqiang Zhang,et al.  Delay-dependent state feedback stabilization for a networked control model with two additive input delays , 2015, Appl. Math. Comput..

[26]  Ju H. Park,et al.  Improved approaches to stability criteria for neural networks with time-varying delays , 2013, J. Frankl. Inst..

[27]  P. T. Nam,et al.  Partial state estimation for linear systems with output and input time delays. , 2014, ISA transactions.

[28]  Guanghong Yang,et al.  Jensen integral inequality approach to stability analysis of continuous-time systems with time-varying delay , 2008 .

[29]  Arash Farnam,et al.  Improved stabilization method for networked control systems with variable transmission delays and packet dropout. , 2014, ISA transactions.

[30]  PooGyeon Park,et al.  Reciprocally convex approach to stability of systems with time-varying delays , 2011, Autom..

[31]  Xiangjun Xie,et al.  Improved delay-dependent stability analysis for neural networks with time-varying delays. , 2014, ISA transactions.

[32]  Muguo Li,et al.  An improved delay-dependent stability criterion of networked control systems , 2014, J. Frankl. Inst..

[33]  Hieu Minh Trinh,et al.  A new approach to state bounding for linear time-varying systems with delay and bounded disturbances , 2014, Autom..

[34]  Mehran Mazandarani,et al.  Type-2 fuzzy fractional derivatives , 2014, Commun. Nonlinear Sci. Numer. Simul..

[35]  Xiaomei Wang,et al.  A novel approach to delay-fractional-dependent stability criterion for linear systems with interval delay. , 2014, ISA transactions.

[36]  Muhammad Rehan,et al.  Delay-range-dependent observer-based control of nonlinear systems under input and output time-delays , 2015, Appl. Math. Comput..

[37]  Yuzhi Liu,et al.  Improved robust stabilization method for linear systems with interval time-varying input delays by using Wirtinger inequality. , 2015, ISA transactions.

[38]  Ju H. Park,et al.  Analysis on robust H∞ performance and stability for linear systems with interval time-varying state delays via some new augmented Lyapunov-Krasovskii functional , 2013, Appl. Math. Comput..

[39]  Changyun Wen,et al.  Improved delay-range-dependent stability criteria for linear systems with interval time-varying delays [Brief Paper] , 2012 .

[40]  Wei Qian,et al.  New stability analysis for systems with interval time-varying delay , 2013, J. Frankl. Inst..

[41]  Ju H. Park,et al.  Stability of time-delay systems via Wirtinger-based double integral inequality , 2015, Autom..

[42]  Shouming Zhong,et al.  Delay-dependent exponential passivity of uncertain cellular neural networks with discrete and distributed time-varying delays. , 2015, ISA transactions.

[43]  Pagavathigounder Balasubramaniam,et al.  A delay decomposition approach to delay-dependent passivity analysis for interval neural networks with time-varying delay , 2011, Neurocomputing.

[44]  Jigui Jian,et al.  Delay-dependent passivity analysis of impulsive neural networks with time-varying delays , 2015, Neurocomputing.

[45]  Jin-Hoon Kim,et al.  Note on stability of linear systems with time-varying delay , 2011, Autom..

[46]  Corentin Briat,et al.  Convergence and Equivalence Results for the Jensen's Inequality—Application to Time-Delay and Sampled-Data Systems , 2011, IEEE Transactions on Automatic Control.

[47]  James Lam,et al.  A new delay system approach to network-based control , 2008, Autom..

[48]  Jun Cheng,et al.  Improved integral inequality approach on stabilization for continuous-time systems with time-varying input delay , 2015, Neurocomputing.

[49]  PooGyeon Park,et al.  Improved criteria on robust stability and H∞ performance for linear systems with interval time-varying delays via new triple integral functionals , 2014, Appl. Math. Comput..

[50]  S. Zhong,et al.  Stability analysis of neutral type neural networks with mixed time-varying delays using triple-integral and delay-partitioning methods. , 2015, ISA transactions.

[51]  S. Bhattacharyya,et al.  Robust stability with structured real parameter perturbations , 1987 .