Analysis of the propagation of plane acoustic waves in passive periodic materials using the finite element method

Langlet, Philippe; Hladky, Anne-Christine; Decarpigny, Jean‐noël

Type de document :

Compte-rendu et recension critique d'ouvrage

DOI :

10.1121/1.413244

Titre :

Analysis of the propagation of plane acoustic waves in passive periodic materials using the finite element method

Auteur(s) :

Langlet, Philippe [Auteur]
Institut d’Électronique, de Microélectronique et de Nanotechnologie - UMR 8520 [IEMN]
Hladky, Anne-Christine [Auteur]

Acoustique - IEMN [ACOUSTIQUE - IEMN]
Institut d’Électronique, de Microélectronique et de Nanotechnologie - UMR 8520 [IEMN]
Decarpigny, Jean‐noël [Auteur]

Titre de la revue :

Journal of the Acoustical Society of America

Pagination :

2792-2800

Éditeur :

Acoustical Society of America

Date de publication :

1995-11

ISSN :

0001-4966

Discipline(s) HAL :

Sciences de l'ingénieur [physics]/Acoustique [physics.class-ph]

Résumé en anglais : [en]

The finite element approach has been previously used, with the help of the ATILA code, to model the scattering of acoustic waves by single or doubly periodic passive structures ͓A. C. Hladky-Hennion et al., J. Acoust. Soc. ...
Lire la suite >The finite element approach has been previously used, with the help of the ATILA code, to model the scattering of acoustic waves by single or doubly periodic passive structures ͓A. C. Hladky-Hennion et al., J. Acoust. Soc. Am. 90, 3356-3367 ͑1991͔͒. This paper presents a new extension of this technique to the analysis of the propagation of plane acoustic waves in passive periodic materials without losses and describes with particular emphasis its application to doubly periodic materials containing different types of inclusions. In the proposed approach, only the unit cell of the periodic material has to be meshed, thanks to Bloch-Floquet relations. The modeling of these materials provides dispersion curves from which results of physical interest can be easily extracted: identification of propagation modes, cutoff frequencies, passbands, stopbands, as well as effective homogeneous properties. In this paper, the general method is first described, and particularly the aspects related to the periodicity. Then a test example is given for which analytical results exist. This example is followed by detailed presentations of finite element results, in the case of periodic materials containing inclusions or cylindrical pores. The homogenized properties of porous materials are determined with the help of an anisotropic model, in the large wavelength limit. A validation has been carried out with periodically perforated plates, the resonance frequencies of which have been measured. The efficiency and the versatility of the method is thus clearly demonstrated.Lire moins >

Langue :

Anglais

Vulgarisation :

Non

Collections :