A delay‐independent output feedback for linear systems with time‐varying input delay

It is well known that a delay‐dependent or delay‐independent truncated predictor feedback law stabilizes a general linear system in the presence of a certain amount of input delay. Results also exist on estimating the maximum delay bound that guarantees stability. In the face of a time‐varying or unknown delay, delay‐independent feedback laws are preferable over delay‐dependent feedback laws as the former provide robustness to the uncertainties in the delay. In the light of few results on the construction of delay‐independent output feedback laws for general linear systems with input delay, we present in this paper a delay‐independent observer–based output feedback law that stabilizes the system. Our design is based on the truncated predictor feedback design. We establish an estimate of the maximum allowable delay bound through the Razumikhin‐type stability analysis. An implication of the delay bound result reveals the capability of the proposed output feedback law in handling an arbitrarily large input delay in linear systems with all open‐loop poles at the origin or in the open left‐half plane. Compared with that of the delay‐dependent output feedback laws in the literature, this same level of stabilization result is not sacrificed by the absence of the prior knowledge of the delay.

[1]  Zongli Lin,et al.  Maximum delay bounds of linear systems under delay independent truncated predictor feedback , 2017, Autom..

[2]  Zongli Lin,et al.  Delay independent truncated predictor feedback for stabilization of linear systems with multiple time-varying input delays , 2017, 2017 American Control Conference (ACC).

[3]  Qing-Long Han,et al.  Network-based output tracking control for T-S fuzzy systems using an event-triggered communication scheme , 2015, Fuzzy Sets Syst..

[4]  Qing-Long Han,et al.  Network-Based Output Tracking Control for a Class of T-S Fuzzy Systems That Can Not Be Stabilized by Nondelayed Output Feedback Controllers , 2015, IEEE Transactions on Cybernetics.

[5]  Guoqiang Hu,et al.  Information Fusion Estimation for spatially distributed cyber-physical systems with communication delay and bandwidth constraints , 2015, 2015 American Control Conference (ACC).

[6]  Zhong-Ping Jiang,et al.  Event-Based Leader-following Consensus of Multi-Agent Systems with Input Time Delay , 2015, IEEE Transactions on Automatic Control.

[7]  Jie Huang,et al.  Robust output regulation problem for linear time-delay systems , 2015, Int. J. Control.

[8]  Bin Zhou,et al.  Truncated Predictor Feedback Stabilization of Polynomially Unstable Linear Systems With Multiple Time-Varying Input Delays , 2014, IEEE Transactions on Automatic Control.

[9]  Zhong-Ping Jiang,et al.  Stability of nonlinear switched systems with delays , 2013, Proceedings of the 32nd Chinese Control Conference.

[10]  Yigang He,et al.  Global sampled-data output feedback stabilisation of a class of upper-triangular systems with input delay , 2013 .

[11]  Zongli Lin,et al.  Truncated predictor feedback control for exponentially unstable linear systems with time-varying input delay , 2013, 2013 American Control Conference.

[12]  Guang-Ren Duan,et al.  Truncated predictor feedback for linear systems with long time-varying input delays , 2012, Autom..

[13]  Shengyuan Xu,et al.  Robust Controller Design of Uncertain Discrete Time-Delay Systems With Input Saturation and Disturbances , 2012, IEEE Transactions on Automatic Control.

[14]  Miroslav Krstic,et al.  Lyapunov stability of linear predictor feedback for time-varying input delay , 2009, Proceedings of the 48h IEEE Conference on Decision and Control (CDC) held jointly with 2009 28th Chinese Control Conference.

[15]  M. Krstić Delay Compensation for Nonlinear, Adaptive, and PDE Systems , 2009 .

[16]  Guang-Ren Duan,et al.  Properties of the parametric Lyapunov equation based low gain design with applications in stabilization of time-delay systems , 2009, 2009 American Control Conference.

[17]  Guang-Ren Duan,et al.  A Parametric Lyapunov Equation Approach to the Design of Low Gain Feedback , 2008, IEEE Transactions on Automatic Control.

[18]  Lihua Xie,et al.  Further Improvement of Free-Weighting Matrices Technique for Systems With Time-Varying Delay , 2007, IEEE Transactions on Automatic Control.

[19]  Zongli Lin,et al.  On Asymptotic Stabilizability of Linear Systems With Delayed Input , 2006, IEEE Transactions on Automatic Control.

[20]  Sabine Mondié,et al.  Global asymptotic stabilization of feedforward systems with delay in the input , 2004, IEEE Transactions on Automatic Control.

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

[22]  F. Mazenc,et al.  Global asymptotic stabilization for chains of integrators with a delay in the input , 2001, Proceedings of the 40th IEEE Conference on Decision and Control (Cat. No.01CH37228).

[23]  K. Gu An integral inequality in the stability problem of time-delay systems , 2000, Proceedings of the 39th IEEE Conference on Decision and Control (Cat. No.00CH37187).

[24]  V. Van Assche,et al.  Some problems arising in the implementation of distributed-delay control laws , 1999, Proceedings of the 38th IEEE Conference on Decision and Control (Cat. No.99CH36304).

[25]  Guoxiang Gu,et al.  On the Stability Testing of Time Delay Systems , 1988, 1988 American Control Conference.

[26]  Z. Artstein Linear systems with delayed controls: A reduction , 1982 .

[27]  A. Olbrot,et al.  Finite spectrum assignment problem for systems with delays , 1979 .

[28]  Richard Bellman,et al.  Differential-Difference Equations , 1967 .

[29]  Jack K. Hale,et al.  Effects of Small Delays on Stability and Control , 2001 .

[30]  Zongli Lin,et al.  Low gain feedback , 1999 .