A General Class of Control Lyapunov Functions and Sampled-Data Stabilization
Abstract
The present work extends recent results by second author concerning sampled-data feedback stabilization for affine in the control of nonlinear systems with nonzero drift term, under the presence of a generalized control Lyapunov function associated with appropriate Lie algebraic hypotheses concerning the dynamics of the system. The main results of present work, constitute a generalization of the well-known "Artstein-Sontag" theorem on asymptotic stabilization by means of an almost smooth feedback controller. The analysis is limited to the affine single-input nonlinear systems with nonzero drift term, however, the results can easily be extended to the multi-input case. An illustrative example of the derived results is included.
Cite
@article{arxiv.1908.00934,
title = {A General Class of Control Lyapunov Functions and Sampled-Data Stabilization},
author = {Katerina Chrysafi and John Tsinias},
journal= {arXiv preprint arXiv:1908.00934},
year = {2019}
}
Comments
7 pages, submitted to IEEE Transactions on Automatic Control for possible publication