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Cédric Join
Researcher at University of Lorraine
Publications - 185
Citations - 5373
Cédric Join is an academic researcher from University of Lorraine. The author has contributed to research in topics: Nonlinear system & Fault detection and isolation. The author has an hindex of 32, co-authored 178 publications receiving 4562 citations. Previous affiliations of Cédric Join include Nancy-Université & Concordia University Wisconsin.
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Proceedings ArticleDOI
Model-free load control for high penetration of solar photovoltaic generation
TL;DR: In this article, a model-free control (MFC) mechanism is proposed to enable the local distribution level circuit consumption of the photovoltaic (PV) generation by local building loads, in particular, distributed heating, ventilation and air conditioning (HVAC) units.
Journal ArticleDOI
Toward simple in silico experiments for drugs administration in some cancer treatments
TL;DR: In this article, the flatness property of the used mathematical model yields straightforward reference trajectories, which provide us with the nominal open-loop control inputs, and closing the loop via model-free control allows to deal with the uncertainties on the injected drug doses.
Proceedings ArticleDOI
A simple but energy-efficient HVAC control synthesis for data centers
TL;DR: The air conditioning management of data centers, a key question with respect to energy saving, is here tackled via the recent model-free control synthesis, which shows excellent tracking performances in various realistic situations, like CPU load or temperature changes.
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Fault diagnosis of uncertain linear system using structural knowledge
TL;DR: In this paper, an algebraic approach of fault diagnosis in linear dynamical systems is presented, using tools and results of algebraic identification and pseudospectra analysis, a method is proposed for the generation of a residual sensitive to faults.
Seasonalities and cycles in time series: A fresh look with computer experiments
Michel Fliess,Cédric Join +1 more
TL;DR: A theorem due to P. Cartier and Y. Perrin and several time scales yield, perhaps for the first time, a clear-cut definition of seasonalities and cycles, and suggests the application of this approach to the debatable Kondriatev waves.