Insights on Asymptotic Behavior of Characteristic Roots of Quasi-Polynomials with Delay-Dependent Coefficients in Some Ill-Posed Cases

Martínez-González, Alejandro; Méndez-Barrios, César-Fernando; Niculescu, Silviu–Iulian; Chen, J.

doi:10.1016/j.ifacol.2019.12.209

Cited by 1 publication

(1 citation statement)

References 14 publications

Supporting

Mentioning

Contrasting

Order By: Relevance

“…Remark It is worth mentioning that an extension of Lemma 1 to a wider class of dynamical systems was presented and discussed in Reference 38. However, the arguments given there are based on the Newton diagram method and the implicit function theorem.…”

Section: Improperly Posed Closed‐loop Systems: a Characterizationmentioning

confidence: 99%

Characterizing some improperly posed problems in proportional‐derivative control

Méndez-Barrios

Niculescu

Martínez-González

et al. 2021

Intl J Robust & Nonlinear

View full text Add to dashboard Cite

This article focuses on the root behavior of the characteristic function of some LTI SISO systems controlled by a PD-control when a delay-difference operator is used to approximate the derivative action. We will focus on the cases when the corresponding stability problem is improperly posed for "small" delay values. In this context, we will express the solutions of the corresponding characteristic function as power series and exploit their structure in deriving the asymptotic behavior of the characteristic roots. This analysis will allow detecting and explicitly characterizing the cases when delay-difference approximations lead to improperly posed stability problems. Furthermore, in the case when the derivative approximation guarantees the properly posedness of the closed-loop system, the robustness of the scheme with respect to the delay margin of the delay-difference approximation and control gains parameters are explicitly addressed. More precisely, upper bounds on the delays as well as the robustness of the corresponding controller are computed. Some illustrative examples complete the presentation.

show abstract

Section: Improperly Posed Closed‐loop Systems: a Characterizationmentioning

confidence: 99%