What is he best known for?
The fields of study he is best known for:
- Control theory
- Mathematical analysis
- Computer network
Alexandre Seuret focuses on Stability, Control theory, Mathematical optimization, Stability conditions and Linear system.
His Exponential stability study in the realm of Control theory interacts with subjects such as Affine transformation.
The study incorporates disciplines such as Convex combination and Jensen's inequality in addition to Mathematical optimization.
His Jensen's inequality study incorporates themes from Bernoulli's inequality and Cauchy–Schwarz inequality.
Alexandre Seuret combines subjects such as Bessel function, Mathematical analysis, Bessel's inequality, Lyapunov function and Asynchronous communication with his study of Stability conditions.
His research ties Linear matrix inequality and Linear system together.
His most cited work include:
- Wirtinger-based integral inequality: Application to time-delay systems (1237 citations)
- Technical Communique: Robust sampled-data stabilization of linear systems: an input delay approach (976 citations)
- Brief paper: A novel stability analysis of linear systems under asynchronous samplings (323 citations)
What are the main themes of his work throughout his whole career to date?
His primary scientific interests are in Control theory, Linear system, Exponential stability, Stability and Mathematical optimization.
His work carried out in the field of Control theory brings together such families of science as Control engineering and Constant.
The Linear system study combines topics in areas such as Observer, Bounded function, Sampled data systems, Applied mathematics and Convex combination.
Alexandre Seuret has researched Stability in several fields, including Asynchronous communication, Inequality and Stability conditions.
His Mathematical optimization study combines topics in areas such as Jensen's inequality, Kantorovich inequality, Linear inequality and Linear matrix.
His Jensen's inequality study integrates concerns from other disciplines, such as Bernoulli's inequality and Log sum inequality.
He most often published in these fields:
- Control theory (56.12%)
- Linear system (27.04%)
- Exponential stability (24.49%)
What were the highlights of his more recent work (between 2017-2021)?
- Control theory (56.12%)
- Applied mathematics (19.39%)
- Linear system (27.04%)
In recent papers he was focusing on the following fields of study:
Control theory, Applied mathematics, Linear system, Exponential stability and Stability are his primary areas of study.
His work in the fields of Control theory, such as Discrete time and continuous time, Observer and Lyapunov function, intersects with other areas such as Affine transformation.
Alexandre Seuret has researched Applied mathematics in several fields, including Legendre polynomials, Lyapunov stability, Ordinary differential equation, Polynomial and Stability conditions.
The concepts of his Linear system study are interwoven with issues in Bounded function, Lemma and Convex optimization.
His Exponential stability research is multidisciplinary, relying on both Linear matrix inequality and Control theory.
His work carried out in the field of Stability brings together such families of science as Stability result and Focus.
Between 2017 and 2021, his most popular works were:
- Overview of recent advances in stability of linear systems with time‐varying delays (91 citations)
- Stability of Linear Systems With Time-Varying Delays Using Bessel–Legendre Inequalities (90 citations)
- Generalized reciprocally convex combination lemmas and its application to time-delay systems (56 citations)
In his most recent research, the most cited papers focused on:
- Mathematical analysis
- Control theory
- Computer network
Alexandre Seuret mostly deals with Stability conditions, Control theory, Linear system, Applied mathematics and Bessel's inequality.
Alexandre Seuret interconnects Decision variables and Stability criterion in the investigation of issues within Control theory.
His studies examine the connections between Linear system and genetics, as well as such issues in Bessel function, with regards to Laguerre polynomials and Parameterized complexity.
The study incorporates disciplines such as Linear matrix inequality, Legendre polynomials and Numerical stability in addition to Bessel's inequality.
His biological study deals with issues like Centrality, which deal with fields such as Mathematical optimization.
His research in Mathematical optimization intersects with topics in Control system and Linear matrix.
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