In this paper we apply a reduced basis framework for the computation of flow bifurcation (and stability) problems in fluid dynamics. The proposed method aims at reducing the complexity and the computational time required for the construction of bifurcation and stability diagrams. The method is quite general since it can in principle be specialized to a wide class of nonlinear problems, but in this work we focus on an application in incompressible fluid dynamics at low Reynolds numbers. The validation of the reduced order model with the full order computation for a benchmark cavity flow problem is promising.
On the Application of Reduced Basis Methods to Bifurcation Problems in Incompressible Fluid Dynamics / Pitton, Giuseppe; Rozza, Gianluigi. - In: JOURNAL OF SCIENTIFIC COMPUTING. - ISSN 0885-7474. - 73:1(2017), pp. 157-177. [10.1007/s10915-017-0419-6]
On the Application of Reduced Basis Methods to Bifurcation Problems in Incompressible Fluid Dynamics
Pitton, GiuseppeMembro del Collaboration group
;Rozza, Gianluigi
2017-01-01
Abstract
In this paper we apply a reduced basis framework for the computation of flow bifurcation (and stability) problems in fluid dynamics. The proposed method aims at reducing the complexity and the computational time required for the construction of bifurcation and stability diagrams. The method is quite general since it can in principle be specialized to a wide class of nonlinear problems, but in this work we focus on an application in incompressible fluid dynamics at low Reynolds numbers. The validation of the reduced order model with the full order computation for a benchmark cavity flow problem is promising.| File | Dimensione | Formato | |
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