Your search keyword '"Niculescu, Silviu-Iulian"' showing total 11 results

1. Invariance properties for a class of quasipolynomials.

Author

Li, Xu-Guang, Niculescu, Silviu-Iulian, Cela, Arben, Wang, Hong-Hai, and Cai, Tiao-Yang

Subjects

*MATHEMATICAL symmetry, *POLYNOMIALS, *SET theory, *TIME delay systems, *THEORY of knowledge, *NEWTON diagrams, *MATHEMATICAL series

Abstract

Abstract: When a time-delay system involves multiple imaginary roots (MIRs), the stability analysis will become much more complicated than that in the case with only simple imaginary roots (SIRs). An MIR may exhibit different splitting behaviors and, to the best of the authors’ knowledge, their properties have not been fully investigated. In this paper, we focus on characterizing the invariance properties for MIRs with any multiplicity. Furthermore, the proposed methodology makes it possible to also cover some degenerate cases already encountered and discussed in the literature. In addition, we propose an easily implemented frequency-sweeping method, making it possible to derive the asymptotic behavior without invoking the Puiseux series. [Copyright &y& Elsevier]

Published

2014

2. Lyapunov–Krasovskii functionals and application to input delay compensation for linear time-invariant systems

Author

Mazenc, Frédéric, Niculescu, Silviu-Iulian, and Krstic, Miroslav

Subjects

*LYAPUNOV functions, *LINEAR systems, *TIME delay systems, *DISTRIBUTED algorithms, *FUNCTIONAL analysis, *CLOSED loop systems

Abstract

Abstract: For linear systems with pointwise or distributed delay in the inputs which are stabilized through the reduction approach, we propose a new technique of construction of Lyapunov–Krasovskii functionals. These functionals allow us to establish the ISS property of the closed-loop systems relative to additive disturbances. [Copyright &y& Elsevier]

Published

2012

3. On delay robustness analysis of a simple control algorithm in high-speed networks

Author

Niculescu, Silviu-Iulian

Subjects

*TIME delay systems, *ROBUST control, *TRANSFER functions

Abstract

This paper focuses on the robustness analysis of a simple (second-order) control algorithm for data transfer in high-speed networks. The model under consideration (derived using a fluid approximation technique) can be found in Izmailov (SIAM J. Contr. Optimiz. 34 (1996) 1767). The novelty of the approach lies in characterizing the stability of the scheme in the delay-parameter space (where the delays correspond to the control-time interval, and to the round-trip time, respectively). Thus, we shall compute some delay-insensitive measures for the algorithm which give upper and lower bounds for the uncertainty in the knowledge of the round-trip times. [Copyright &y& Elsevier]

Published

2002

4. Further remarks on the effect of multiple spectral values on the dynamics of time-delay systems. Application to the control of a mechanical system.

Author

Boussaada, Islam, Tliba, Sami, Niculescu, Silviu-Iulian, Ünal, Hakki Ulaş, and Vyhlídal, Tomáš

Subjects

*TIME delay systems, *EXPONENTIAL stability, *SPECTRAL theory, *VANDERMONDE matrices

Abstract

A question of ongoing interest for linear Time-delay systems is to determine conditions on the equation parameters that guarantee the exponential stability of solutions. In recent works a new interesting property of time-delay systems was emphasized. As a matter of fact, the multiple spectral values for time-delay systems was characterized by using a Birkhoff/Vandermonde-based approach. Then, a multiplicity induced stability criteria were exhibited for reduced order systems; scalar delay-equations and a special class of second order systems. This work, further explores such a criteria and shows their applicability to the control of a mechanical system. [ABSTRACT FROM AUTHOR]

Published

2018

5. New insights in stability analysis of delayed Lotka–Volterra systems.

Author

Li, Xu-Guang, Chen, Jun-Xiu, Niculescu, Silviu-Iulian, and Çela, Arben

Subjects

*STABILITY theory, *LOTKA-Volterra equations, *TIME delay systems, *POPULATION dynamics, *CHARACTERISTIC functions

Abstract

Abstract Most of the reported Lotka–Volterra examples have at most one stability interval for the delay parameters. Furthermore, the existing methods fall short in treating more general case studies. Inspired by some recent results for analyzing the stability of time-delay systems, this paper focuses on a deeper characterization of the stability of Lotka–Volterra systems w.r.t. the delay parameters. More precisely, we will introduce the recently-proposed frequency-sweeping approach to study the complete stability problem for a broad class of linearized Lotka–Volterra systems. As a result, the whole stability delay-set can be analytically determined. Moreover, as a significant byproduct of the proposed approach, some Lotka–Volterra examples are found to have multiple stability delay-intervals. To the best of the authors' knowledge, such a characterization represents a novelty for having some insights in the population dynamics: in some situations, a longer maturation period of species is helpful for the stability of a population system. [ABSTRACT FROM AUTHOR]

Published

2018

6. Guide on set invariance for delay difference equations.

Author

Laraba, Mohammed-Tahar, Olaru, Sorin, Niculescu, Silviu-Iulian, Blanchini, Franco, Giordano, Giulia, Casagrande, Daniele, and Miani, Stefano

Subjects

*SET theory, *INVARIANTS (Mathematics), *DIFFERENCE equations, *TIME delay systems, *LINEAR systems, *MATHEMATICAL mappings

Abstract

This paper addresses set invariance properties for linear time-delay systems. More precisely, the first goal of the article is to review known necessary and/or sufficient conditions for the existence of invariant sets with respect to dynamical systems described by linear discrete time-delay difference equations (dDDEs). Secondly, we address the construction of invariant sets in the original state space (also called D -invariant sets) by exploiting the forward mappings. The notion of D -invariance is appealing since it provides a region of attraction, which is difficult to obtain for delay systems without taking into account the delayed states in some appropriate extended state space model. The present paper contains a sufficient condition for the existence of ellipsoidal D -contractive sets for dDDEs, and a necessary and sufficient condition for the existence of D -invariant sets in relation to linear time-varying dDDE stability. Another contribution is the clarification of the relationship between convexity (convex hull operation) and D - invariance of linear dDDEs. In short, it is shown that the convex hull of the union of two or more D - invariant sets is not necessarily D - invariant , while the convex hull of a non-convex D - invariant set is D - invariant . [ABSTRACT FROM AUTHOR]

Published

2016

7. Robust stability analysis of Smith predictor-based congestion control algorithms for computer networks

Author

De Cicco, Luca, Mascolo, Saverio, and Niculescu, Silviu-Iulian

Subjects

*ROBUST control, *STABILITY (Mechanics), *CONTROL theory (Engineering), *ALGORITHMS, *COMPUTER networks, *TIME delay systems

Abstract

Abstract: Congestion control is a fundamental building block in packet switching networks such as the Internet due to the fact that communication resources are shared. It has been shown that the plant dynamics is essentially made up of an integrator plus time delay and that a proportional controller plus a Smith predictor defines a simple and effective controller. It has also been shown that the TCP congestion control can be modelled using a Smith predictor plus a proportional controller. Due to the importance of this control structure in the field of data network congestion control, we analyse the robust stability of the closed-loop system in the face of delay uncertainties that are present in data networks due to queuing. In particular, by applying a geometric approach, we derive a bound on the proportional controller gain which is necessary and sufficient to guarantee the closed-loop stability for a given bound on the delay uncertainty. [Copyright &y& Elsevier]

Published

2011

8. Explicit bounds for guaranteed stabilization by PID control of second-order unstable delay systems.

Author

Ma, Dan, Chen, Jianqi, Liu, Andong, Chen, Jie, and Niculescu, Silviu-Iulian

Subjects

*SLIDING mode control, *PID controllers, *TIME delay systems

Abstract

Abstract In this paper we derive explicit lower bounds on the delay margin of second-order unstable delay systems achievable by PID control, which provide a priori a guaranteed range of delay values over which a second-order delay plant can be stabilized by a PID, and more generally, a finite-dimensional LTI controller. This is done by deriving lower bounds on the delay margin achievable by PD controllers, whereas this margin constitutes a lower bound on that achievable by PID controllers. Analysis shows that in most cases our results can be significantly less conservative than the lower bounds obtained elsewhere using more sophisticated, general LTI controllers. [ABSTRACT FROM AUTHOR]

Published

2019

9. A numerical method for stability windows and unstable root-locus calculation for linear fractional time-delay systems

Author

Fioravanti, André Ricardo, Bonnet, Catherine, Özbay, Hitay, and Niculescu, Silviu-Iulian

Subjects

*NUMERICAL analysis, *STABILITY theory, *LINEAR systems, *FRACTIONAL calculus, *TIME delay systems, *ALGORITHMS, *ASYMPTOTIC expansions

Abstract

Abstract: This paper aims to provide a numerical algorithm able to locate all unstable poles, and therefore the characterization of the stability as a function of the delay, for a class of linear fractional-order neutral systems with multiple commensurate delays. We start by giving the asymptotic position of the chains of poles and the conditions for their stability for a small delay. When these conditions are met, the root continuity argument and some simple substitutions allow us to determine the locations where some roots cross the imaginary axis, providing therefore the complete characterization of the stability windows. The same method can be extended to provide the position of all unstable poles as a function of the delay. [Copyright &y& Elsevier]

Published

2012

10. Cyclic invariance for discrete time-delay systems

Author

Lombardi, Warody, Olaru, Sorin, Bitsoris, Georges, and Niculescu, Silviu-Iulian

Subjects

*DISCRETE-time systems, *TIME delay systems, *MATHEMATICAL sequences, *STATE-space methods, *POLYHEDRAL functions, *DYNAMICAL systems, *MATHEMATICAL symmetry

Abstract

Abstract: This technical communique introduces a new concept of set invariance with respect to linear discrete time dynamics affected by delay. We are interested in the definition and characterization of sequences of cyclically invariant subsets in the state space. The algebraic conditions established in the late ’80s for linear dynamics are generalized to invariance analysis in the presence of delays for given sequences of polyhedral sets. [Copyright &y& Elsevier]

Published

2012

11. Reversals in stability of linear time-delay systems: A finer characterization.

Author

Li, Xu, Liu, Jian-Chang, Li, Xu-Guang, Niculescu, Silviu-Iulian, and Çela, Arben

Subjects

*LINEAR systems, *TIME delay systems, *GLOBAL asymptotic stability

Abstract

In most of the numerical examples of time-delay systems proposed in the literature, the number of unstable characteristic roots remains positive before and after a multiple critical imaginary root (CIR) appears (as the delay, seen as a parameter, increases). This fact may lead to some misunderstandings: (i) A multiple CIR may at most affect the instability degree; (ii) It cannot cause any stability reversals (stability transitions from instability to stability). As far as we know, whether the appearance of a multiple CIR can induce stability is still unclear (in fact, when a CIR generates a stability reversal has not been specifically investigated). In this paper, we provide a finer analysis of stability reversals and some new insights into the classification: the link between the multiplicity of a CIR and the asymptotic behavior with the stabilizing effect. Based on these results, we present an example illustrating that a multiple CIR's asymptotic behavior is able to cause a stability reversal. To the best of the authors' knowledge, such an example is a novelty in the literature on time-delay systems. [ABSTRACT FROM AUTHOR]

Published

2019