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Article Dans Une Revue Quarterly Journal of Mechanics and Applied Mathematics Année : 2007

Resonances of an elastic plate in a compressible confined fluid

Résumé

We present a theoretical study of the resonances of a fluid-structure problem, an elastic plate placed in a duct in the presence of a compressible fluid. The case of a rigid plate has been largely studied. Acoustic resonances are then associated to resonant modes trapped by the plate. Due to the elasticity of the plate, we need to solve a quadratic eigenvalue problem in which the resonance frequencies k solve the equations γ(k) = k2, where γ are the eigenvalues of a self-adjoint operator of the form A + kB. First, we show how to study the eigenvalues located below the essential spectrum by using the min-max principle. Then, we study the fixed-point equations. We establish sufficient conditions on the characteristics of the plate and of the fluid to ensure the existence of resonances. Such conditions are validated numerically. © The author 2007. Published by Oxford University Press; all rights reserved.

Dates et versions

hal-00876224 , version 1 (24-10-2013)

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Anne-Sophie Bonnet-Ben Dhia, Jean-François Mercier. Resonances of an elastic plate in a compressible confined fluid. Quarterly Journal of Mechanics and Applied Mathematics, 2007, 60 (4), pp.397-421. ⟨10.1093/qjmam/hbm015⟩. ⟨hal-00876224⟩
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