Reliable reduced-order models for time-dependent linearized Euler equations |
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Authors: | Gilles Serre Philippe Lafon Xavier Gloerfelt Christophe Bailly |
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Affiliation: | 1. LaMSID, UMR EDF-CEA-CNRS 8193, 1, Avenue du Général de Gaulle, 92141 Clamart Cedex, France;2. Dynfluid Laboratory, Arts et Metiers ParisTech, 151, Boulevard de l’Hôpital, 75013 Paris, France;3. Laboratoire de Mécanique des Fluides et d’Acoustique, UMR CNRS 5509, École Centrale de Lyon, 36, Avenue Guy de Collonge, 69134 Ecully Cedex, France |
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Abstract: | Development of optimal reduced-order models for linearized Euler equations is investigated. Recent methods based on proper orthogonal decomposition (POD), applicable for high-order systems, are presented and compared. Particular attention is paid to the link between the choice of the projection and the efficiency of the reduced model. A stabilizing projection is introduced to induce a stable reduced-order model at finite time even if the energy of the physical model is growing. The proposed method is particularly well adapted for time-dependent hyperbolic systems and intrinsically skew-symmetric models. This paper also provides a common methodology to reliably reduce very large nonsymmetric physical problems. |
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