Title :
Stability of infinite-dimensional linear inclusions
Author :
Adam Czornik;Michał Niezabitowski
Author_Institution :
Silesian University of Technology, Faculty of Automatic Control, Electronics and Computer Science, Institute of Automatic Control, Akademicka 16 Street, 44-100 Gliwice, Poland
Abstract :
In this paper we present three concepts of stability for discrete linear inclusions, i.e. uniform power equistability, power equistability and selectable stability. The main result states that first two concepts are equivalent. Moreover they are equivalent to the fact that a numerical quantity called generalized spectral radius is less than one. Finally, we show the relation between the joint spectral subradius and selectable stability.
Keywords :
"Numerical stability","Stability criteria","Joints","Asymptotic stability","Control systems","Time-varying systems"
Conference_Titel :
Methods and Models in Automation and Robotics (MMAR), 2015 20th International Conference on
DOI :
10.1109/MMAR.2015.7283873
