Abstract: Finite element or finite volume discretizations of distributed parameter systems (DPS) typically lead to high order finite dimensional systems. Model approximation is then an important first step towards the construction of optimal controllers. However, model reduction methods hardly take model uncertainties and parameter variations into account. As such, reduced order models are not well equipped when uncertain system parameters vary in time. This is particularly true when system behavior does not depend continuously on the parameters. It is shown in this paper that the performance of reduced order models inferred from Galerkin projections and proper orthogonal decompositions can deteriorate considerable when system parameters va...
This work explores the development and the analysis of an efficient reduced order model for the stud...
This work explores the development and the analysis of an efficient reduced order model for the stud...
International audienceThis work deals with the computation of Hopf bifurcation points in the framewo...
Abstract: Finite element or finite volume discretizations of distributed parameter systems (DPS) typ...
This thesis considers the problem of making dynamic models for industrial processes by combining phy...
Dynamical systems with intricate behaviour are all-pervasive in biology. Many of the most interestin...
: This paper is a brief survey of numerical methods for computing bifurcations of generic families o...
Model reduction of a system is an approximation of a higher-order system to a lower-order system whi...
Abstract. Near an orbit of interest in a dynamical system, it is typical to ask which variables domi...
Modeling of dynamical systems is at the core of the simulation and controller design of modern techn...
International audienceWe propose a projection-based model order reduction method for the solution of...
Nonlinear dynamical systems are known to be sensitive to input parameters. In this thesis, we apply ...
The basic mathematical nature of low-dimensional models hints at existence of interesting sequences ...
The time domain solution of a chaotic system governed by a set of nonlinear equations is computation...
AbstractThis study focusses on the development of reduced order models, which minimize the computati...
This work explores the development and the analysis of an efficient reduced order model for the stud...
This work explores the development and the analysis of an efficient reduced order model for the stud...
International audienceThis work deals with the computation of Hopf bifurcation points in the framewo...
Abstract: Finite element or finite volume discretizations of distributed parameter systems (DPS) typ...
This thesis considers the problem of making dynamic models for industrial processes by combining phy...
Dynamical systems with intricate behaviour are all-pervasive in biology. Many of the most interestin...
: This paper is a brief survey of numerical methods for computing bifurcations of generic families o...
Model reduction of a system is an approximation of a higher-order system to a lower-order system whi...
Abstract. Near an orbit of interest in a dynamical system, it is typical to ask which variables domi...
Modeling of dynamical systems is at the core of the simulation and controller design of modern techn...
International audienceWe propose a projection-based model order reduction method for the solution of...
Nonlinear dynamical systems are known to be sensitive to input parameters. In this thesis, we apply ...
The basic mathematical nature of low-dimensional models hints at existence of interesting sequences ...
The time domain solution of a chaotic system governed by a set of nonlinear equations is computation...
AbstractThis study focusses on the development of reduced order models, which minimize the computati...
This work explores the development and the analysis of an efficient reduced order model for the stud...
This work explores the development and the analysis of an efficient reduced order model for the stud...
International audienceThis work deals with the computation of Hopf bifurcation points in the framewo...