Title :
Stabilization of asymptotically time-invariant linear time-varying systems
Author :
Yuli Sun ; Wei Chi ; Jinmei Xiao ; Yu Tianqiu
Author_Institution :
Sch. of Math. Sci., Heilongjiang Univ., Harbin, China
Abstract :
In this paper, we study the stabilization problem of asymptotically time-invariant linear time-varying systems within the framework of nest algebras. The main theorem of the paper establishes that an asymptotically time-invariant system is stabilizable if and only if the time-invariant part is also stabilizable. The proof relies on the theory of Fredholm and compact operators. In particular, when the compact part of systems are strictly causal, we show that a controller (possibly time-varying) stabilizes system if and only if it stabilizes the time-invariant part.
Keywords :
Fredholm integral equations; algebra; invariance; linear systems; stability; time-varying systems; Fredholm theory; asymptotically time-invariant linear time-varying systems; compact operators; nest algebras; stabilization problem; time-varying controller; Algebra; Hilbert space; Linear systems; Niobium; Standards; Time-varying systems; Topology; asymptotically time-invariant systems; coprime factorizations; fredholm operators; stabilization;
Conference_Titel :
Intelligent Control and Automation (WCICA), 2014 11th World Congress on
DOI :
10.1109/WCICA.2014.7053364
