Abstract
A basic knowledge of stability of linear systems has been assumed throughout the previous chapters. Stability was associated with the location of the poles of the system in the left half plane. In chapter 6, we saw that the poles are the eigenvalues of the system matrix A when the system is written in state variable form. In chapter 7, we examined the Nyquist criterion for closed-loop stability of a SISO system; we concluded on the stability of the closed-loop system G(1 + G)-1 from the number of encirclements of —1 by the open-loop transfer function G(s). In this chapter, we examine the salient results of Liapunov’s theory of stability; it is attractive for mechanical systems, because of its exceptional physical meaning and its wide ranging applicability, especially for the analysis of nonlinear systems, and also in controller design. We will conclude this chapter with a class of collocated controls that are especially useful in practice, because of their guaranteed stability, even for nonlinear systems; we will call them energy absorbing controls. The following discussion will be restricted to time invariant systems (also called autonomous), but most of the results can be extended to time varying systems. As in the previous chapters, most of the general results are stated without demonstration and the discussion is focussed on vibrating mechanical systems; a deeper discussion can be found in the references.
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© 1997 Springer Science+Business Media Dordrecht
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Preumont, A. (1997). Stability. In: Vibration Control of Active Structures. Solid Mechanics and Its Applications, vol 50. Springer, Dordrecht. https://doi.org/10.1007/978-94-011-5654-7_10
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DOI: https://doi.org/10.1007/978-94-011-5654-7_10
Publisher Name: Springer, Dordrecht
Print ISBN: 978-94-010-6385-2
Online ISBN: 978-94-011-5654-7
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