®®®® SIIA Público

Título del libro: 2009 6th International Conference On Electrical Engineering, Computing Science And Automatic Control, Cce 2009
Título del capítulo: A linear framework for the robust stability analysis of a generalized super-twisting algorithm

Autores UNAM:
JAIME ALBERTO MORENO PEREZ;
Autores externos:
Idioma:
Inglés
Año de publicación:
2009
Palabras clave:

Algebraic riccati inequalities; Analysis and design; Convergence velocity; Frequency domains; Linear corrections; Lyapunov equation; Nonlinear perturbations; Nonlinear versions; Robust stability analysis; Sliding modes; Strong Lyapunov function; Super-twisting; Algebra; Automation; Control; Convergence of numerical methods; Electrical engineering; Lyapunov functions; Lyapunov methods; Process control; Riccati equations; Spatial variables control; Storm sewers; Synthetic apertures; Variable structure control; Linear matrix inequalities

Resumen:

In this paper a linear framework is proposed for the analysis and design of stable and robust stable Generalized Super-Twisting Algorithms (GSTA). The GSTA includes a linear version of the algorithm, the standard STA and a STA with extra linear correction terms, that provide more robustness and convergence velocity. This linear framework allows to construct strong Lyapunov functions of quadratic-like type for the GSTA by means of Algebraic Lyapunov Equations (ALE), in exactly the same form for the linear STA and for the GSTA. When nonlinear perturbations are present this framework leads to the construction of robust Lyapunov functions by solving Algebraic Riccati Inequalities (ARI) or Linear Matrix Inequalities (LMI), that are identical for the linear and the nonlinear versions of the GSTA. The corresponding frequency domain interpretations are also identical for the whole class of GSTA.

Entidades citadas de la UNAM:
Fuente:


ISBN:
9781424446896
Editorial:
IEEE Computer Society

Tipo de producto:
Conference Paper



DOI:
10.1109/ICEEE.2009.5393477