@ARTICLE{Basdouri_Imed_Practical_2023,
 author={Basdouri, Imed and Kasmi, Souad and Lerbet, Jean},
 volume={vol. 33},
 number={No 1},
 journal={Archives of Control Sciences},
 pages={55-70},
 howpublished={online},
 year={2023},
 publisher={Committee of Automatic Control and Robotics PAS},
 abstract={This paper focuses on the global practical Mittag-Leffler feedback stabilization problem for a class of uncertain fractional-order systems. This class of systems is a larger class of nonlinearities than the Lipschitz ones. Based on the quasi-one-sided Lipschitz condition, firstly, we provide sufficient conditions for the practical observer design. Then, we exhibit that practical Mittag-Leffler stability of the closed loop system with a linear, state feedback is attained. Finally, a separation principle is established and we prove that the closed loop system is practical Mittag-Leffler stable.},
 type={Article},
 title={Practical Mittag-Leffler stability of quasi-one-sided Lipschitz fractional order systems},
 URL={http://journals.pan.pl/Content/126810/PDF/art03_int.pdf},
 doi={10.24425/acs.2023.145113},
 keywords={fractional-order systems, Caputo derivative, quasi-one-sided Lipschitz condition, nonlinear systems, observer design, output feedback stabilization, separation principle},
}