New insights on the analysis of nonlinear time-delay systems: application to the triangular equivalence
From MaRDI portal
Publication:864586
DOI10.1016/j.sysconle.2006.08.004zbMath1112.93029OpenAlexW2027304881MaRDI QIDQ864586
Claude H. Moog, Luis Alejandro Marquez-Martinez
Publication date: 12 February 2007
Published in: Systems \& Control Letters (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.sysconle.2006.08.004
Nonlinear systems in control theory (93C10) Transformations (93B17) Control/observation systems governed by ordinary differential equations (93C15)
Related Items
Finite-time and asymptotic left inversion of nonlinear time-delay systems, Stabilization of Nonlinear Delay Systems: A Tutorial on Recent Results, Identifiability and Observability of Nonlinear Time-Delay Systems with Unknown Inputs, Global linearization approach to nonlinear control systems: a brief tutorial overview, Robust stability and stabilization methods for a class of nonlinear discrete-time delay systems, Networked feedback control for nonlinear systems with random varying delays, New stability and stabilization methods for nonlinear systems with time-varying delays
Uses Software
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Feedback linearization of discrete-time systems
- Analysis of nonlinear time-delay systems using modules over noncommutative rings
- Introduction to the theory and application of differential equations with deviating arguments. Translated from the Russian by John L. Casti
- Input-output linearization of retarded non-linear systems by using an extension of Lie derivative
- Controllability of Nonlinear Discrete-Time Systems: A Lie-Algebraic Approach
- Linearization of Discrete-Time Systems
- The disturbance decoupling problem for time-delay nonlinear systems
- Note sur l'accessibilité des systèmes non linéaires à retards
- A linear algebraic framework for dynamic feedback linearization
- The Disturbance Decoupling Problem for Systems over a Ring
- Controllability of nonlinear systems
