H-Index & Metrics Best Publications

H-Index & Metrics

Discipline name H-index Citations Publications World Ranking National Ranking
Electronics and Electrical Engineering D-index 55 Citations 14,465 299 World Ranking 819 National Ranking 11

Research.com Recognitions

Awards & Achievements

2018 - IEEE Fellow For research on the effects of delays in system dynamics

Overview

What is he best known for?

The fields of study he is best known for:

  • Control theory
  • Mathematical analysis
  • Algebra

His primary areas of study are Control theory, Linear system, Stability, Exponential stability and Robustness. Nonlinear system is the focus of his Control theory research. His work carried out in the field of Linear system brings together such families of science as Work, Bounded feedback, Matrix pencil, Applied mathematics and Constant.

His biological study spans a wide range of topics, including Lyapunov function, Control engineering, Model transformation, Full state feedback and Stability conditions. His work on Delay dependent as part of general Exponential stability study is frequently linked to Perturbation, bridging the gap between disciplines. Silviu-Iulian Niculescu interconnects Integrator, Transfer function and Control theory, Adaptive control in the investigation of issues within Robustness.

His most cited work include:

  • Delay Effects on Stability: A Robust Control Approach (1334 citations)
  • Survey on Recent Results in the Stability and Control of Time-Delay Systems* (503 citations)
  • Stability and Stabilization of Time-Delay Systems: An Eigenvalue-Based Approach (477 citations)

What are the main themes of his work throughout his whole career to date?

The scientist’s investigation covers issues in Control theory, Linear system, Exponential stability, Applied mathematics and Stability. His studies in Control theory integrate themes in fields like Control engineering and Constant. His Linear system research includes elements of Time complexity, Matrix, Matrix pencil and State.

His Exponential stability study frequently involves adjacent topics like Stability conditions. His research is interdisciplinary, bridging the disciplines of Class and Applied mathematics. As part of his studies on Stability, Silviu-Iulian Niculescu often connects relevant areas like Mathematical optimization.

He most often published in these fields:

  • Control theory (57.26%)
  • Linear system (19.09%)
  • Exponential stability (16.72%)

What were the highlights of his more recent work (between 2016-2021)?

  • Control theory (57.26%)
  • Control theory (10.14%)
  • Applied mathematics (13.34%)

In recent papers he was focusing on the following fields of study:

Silviu-Iulian Niculescu mostly deals with Control theory, Control theory, Applied mathematics, Multiplicity and Mathematical analysis. His work on Vibration expands to the thematically related Control theory. His research investigates the connection between Control theory and topics such as Model predictive control that intersect with problems in Control engineering.

His work deals with themes such as Stability, Exponential stability, System stability and Argument principle, which intersect with Applied mathematics. His research in the fields of Differential equation overlaps with other disciplines such as The Imaginary. His Linear system research is multidisciplinary, incorporating elements of Full state feedback and Lyapunov function.

Between 2016 and 2021, his most popular works were:

  • Recent developments on the stability of systems with aperiodic sampling: An overview (169 citations)
  • A Frequency-Sweeping Framework for Stability Analysis of Time-Delay Systems (25 citations)
  • Further remarks on the effect of multiple spectral values on the dynamics of time-delay systems. Application to the control of a mechanical system (21 citations)

In his most recent research, the most cited papers focused on:

  • Control theory
  • Mathematical analysis
  • Algebra

Control theory, Applied mathematics, Mathematical analysis, Multiplicity and Exponential stability are his primary areas of study. His research integrates issues of Parameter space and Minification in his study of Control theory. His research investigates the connection with Applied mathematics and areas like Spectral abscissa which intersect with concerns in Degree.

His Mathematical analysis research incorporates elements of Eigenvalue perturbation, Eigenvalues and eigenvectors, Divide-and-conquer eigenvalue algorithm and Link. Silviu-Iulian Niculescu has included themes like Delay differential equation, Differential equation, Reduced order, Spectral method and Argument principle in his Multiplicity study. The study incorporates disciplines such as Vandermonde matrix, Active vibration control and Stable manifold in addition to Exponential stability.

This overview was generated by a machine learning system which analysed the scientist’s body of work. If you have any feedback, you can contact us here.

Best Publications

Delay Effects on Stability: A Robust Control Approach

Silviu-Iulian Niculescu.
(2001)

2642 Citations

Stability and Stabilization of Time-Delay Systems: An Eigenvalue-Based Approach

Wim Michiels;Silviu-Iulian Niculescu.
(2008)

942 Citations

Survey on Recent Results in the Stability and Control of Time-Delay Systems*

Keqin Gu;Silviu-Iulian Niculescu.
Journal of Dynamic Systems Measurement and Control-transactions of The Asme (2003)

649 Citations

Stability and Stabilization of Systems with Time Delay

R Sipahi;S Niculescu;Chaouki T Abdallah;W Michiels.
IEEE Control Systems Magazine (2011)

570 Citations

Advances in linear matrix inequality methods in control

Laurent El Ghaoui;Silviu-Iulian Niculescu.
(2000)

535 Citations

On stability crossing curves for general systems with two delays

Keqin Gu;Silviu-Iulian Niculescu;Jie Chen.
Journal of Mathematical Analysis and Applications (2005)

312 Citations

Stability and robust stability of time-delay systems: A guided tour

Silviu-Iulian Niculescu;Erik I. Verriest;Luc Dugard;Jean-Michel Dion.
(1998)

307 Citations

Additional dynamics in transformed time-delay systems

Keqin Gu;S.-I. Niculescu.
IEEE Transactions on Automatic Control (2000)

282 Citations

On the Liapunov-Krasovskii functionals for stability analysis of linear delay systems

Vladimir B. Kolmanovskii;Silviu-Iulian Niculescu;J.-P. Richard.
International Journal of Control (1999)

269 Citations

Global asymptotic stabilization for chains of integrators with a delay in the input

F. Mazenc;S. Mondie;S.-I. Niculescu.
IEEE Transactions on Automatic Control (2003)

265 Citations

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