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Stabilization of a Class of Linear Systems With Input Delay and the Zero Distribution of Their Characteristic Equations | IEEE Journals & Magazine | IEEE Xplore

Stabilization of a Class of Linear Systems With Input Delay and the Zero Distribution of Their Characteristic Equations


Abstract:

This paper is concerned with stabilization of linear systems with arbitrarily large but bounded time-varying delay in the input. A pole assignment based low gain feedback...Show More

Abstract:

This paper is concerned with stabilization of linear systems with arbitrarily large but bounded time-varying delay in the input. A pole assignment based low gain feedback design is adopted to solve the problem. Both delay-dependent and delay-independent results are presented and a series of sufficient conditions for guaranteeing the stability of the closed-loop system are established. By using properties of this class of low gain feedback laws and the properties of certain transcendental equations, distribution of the zeros of the closed-loop characteristic equation is described. As a result, a necessary and sufficient condition is identified that guarantees the stability of the closed-loop system. A numerical example is given to illustrate the effectiveness of the proposed approach.
Published in: IEEE Transactions on Circuits and Systems I: Regular Papers ( Volume: 58, Issue: 2, February 2011)
Page(s): 388 - 401
Date of Publication: 14 October 2010

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