论文信息 - Interlaced systems and recursive designs for global stabilization

Interlaced systems and recursive designs for global stabilization

Interlaced systems constitute a class of systems only characterized by the zero entries of their matrix configuration and a local stabilizability condition. All these systems are globally stabilizable by a recursive design procedure which combines steps of backstepping and forwarding. When a nonlinear system misses this structural characterization. other types of conditions (sign, growth) are needed to ensure global stabilization.

R. Sepulchre | M. Jankovic | P. V. Kokotovic

[1] Eduardo Sontag. A Lyapunov-Like Characterization of Asymptotic Controllability , 1983, SIAM Journal on Control and Optimization.

[2] L. Praly,et al. Adding an integration and global asymptotic stabilization of feedforward systems , 1994, Proceedings of 1994 33rd IEEE Conference on Decision and Control.

[3] Kehui Wei,et al. Stabilization of linear time-invariant interval systems via constant state feedback control , 1994, IEEE Trans. Autom. Control..

[4] Mrdjan Jankovic,et al. Integrator forwarding: A new recursive nonlinear robust design , 1997, Autom..

[5] P. Kokotovic,et al. Constructive Lyapunov stabilization of nonlinear cascade systems , 1996, IEEE Trans. Autom. Control..

[6] Wei Lin,et al. Global asymptotic stabilization of general nonlinear systems with stable free dynamics via passivity and bounded feedback , 1996, Autom..

[7] K. Wei. Quadratic stabilizability of linear systems with structural independent time-varying uncertainties , 1990 .