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Communication Dans Un Congrès Année : 2022

Efficient parametric derivative computations of the pressure in an acoustic cavity with immersed structures

Résumé

The optimization of internal structures positions according to the internal acoustic of a cavity can lead to the study of several configurations and thus may become prohibitive in terms of computational time; for instance such as for improving the passengers comfort in an airplane. The aim of this work is to propose a numerical tool able to efficiently compute both the pressure solution and its gradients with respect to the structure position. In order to be able to compute the solution for any position of the structure in the cavity, XFEM is used in this work to arbitrarily immerse the structure within the acoustic mesh allowing to always use the same acoustic mesh [1]. The use of the XFEM approach enables to easily compute the gradient of the pressure field with respect to the design variables which govern the position of the structure in the cavity. These gradients can be used to build a more accurate surrogate model [3]. At least, the computational time is reduced by using a reduced basis based on a component mode synthesis [2] with a fixed interface for the fluid domain, which is similar to the Craig- Bampton approach where the interface nodes are the enriched nodes of the XFEM. The whole strategy is applied on 2D and 3D cavities with immersed structures. Depending on the problem complexity, the CPU time is divided by a factor from 2 to 10. REFERENCES [1] A. Legay. An extended finite element method approach for structural-acoustic prob- lems involving immersed structures at arbitrary positions. International Journal for Numerical Methods in Engineering, 93(4):376–399, 2013. [2] A. Legay. The extended finite element method combined with a modal synthesis approach for vibro-acoustic problems. International Journal for Numerical Methods in Engineering, 101(5):329–350, 2015. [3] L. Laurent, R. Le Riche, B. Soulier and P.-A. Boucard. An Overview of Gradient- Enhanced Metamodels with Applications. Archives of Computational Methods in En- gineering, 26(1):61–106, 2019.
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Dates et versions

hal-03690752 , version 1 (08-06-2022)

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  • HAL Id : hal-03690752 , version 1

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Antoine Legay, Luc Laurent. Efficient parametric derivative computations of the pressure in an acoustic cavity with immersed structures. The 8th European Congress on Computational Methods in Applied Sciences and Engineering ECCOMAS Congress 2022, Jun 2022, Oslo, Norway. ⟨hal-03690752⟩
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