A fast numerical framework to compute acoustic scattering by poroelastic plates of arbitrary geometry
ARTIGO
Inglês
Agradecimentos: The authors acknowledge the financial support received from Fundação de Amparo à Pesquisa do Estado de São Paulo, FAPESP, under Grants No. 2013/03413-4, No. 2013/07375-0 and No. 2015/50302-9, from Conselho Nacional de Desenvolvimento Científico e Tecnológico, CNPq, under Grant No....
Agradecimentos: The authors acknowledge the financial support received from Fundação de Amparo à Pesquisa do Estado de São Paulo, FAPESP, under Grants No. 2013/03413-4, No. 2013/07375-0 and No. 2015/50302-9, from Conselho Nacional de Desenvolvimento Científico e Tecnológico, CNPq, under Grant No. 305277/2015-4 and from the US Army Research Laboratory under Grant No. W911NF-16-1-0443. We thank CENAPAD-SP for the computational resources provided through Project 551. The first author is supported by a CNPq MSc scholarship which is acknowledged by the authors. We finally would like to thank Drs. Tim Pritchett and Rajneesh Singh, from the ARL, for supporting the current research
We present a fast numerical framework for the computation of acoustic scattering by poroelastic plates of arbitrary geometries. A boundary element method, BEM, is applied to solve the Helmholtz equation subjected to boundary conditions related to structural vibrations. This analysis is performed by...
We present a fast numerical framework for the computation of acoustic scattering by poroelastic plates of arbitrary geometries. A boundary element method, BEM, is applied to solve the Helmholtz equation subjected to boundary conditions related to structural vibrations. This analysis is performed by rewriting the BEM boundary conditions in terms of a modal basis of the poroelastic plate which is computed by the finite element method, FEM. The current formulation allows a direct solution of the fully coupled fluid-structure interaction problem. In order to accelerate the solution of the large dense linear systems from the BEM formulation in three-dimensional problems, a wideband adaptive multi-level fast multipole method, FMM, is employed. A parametric study is carried out for the trailing-edge scattering of sample acoustic sources, representative of either uncorrelated turbulent eddies or a non-compact turbulent jet. Firstly, the noise scattering by a compact quadrupole source is analyzed for low and high frequencies for square and trapezoidal plates. Results show that geometric features such as trailing-edge sweep and serrations are very effective in the reduction of noise scattering. Moreover, it is shown that finite elastic plates are more effective in reducing the scattered noise at higher frequencies. On the other hand, porosity is more effective in reducing the radiated sound for lower frequencies. Results demonstrate that elasticity and porosity can be combined with trailing-edge sweep and serrations to reduce the scattered noise at a broader range of frequencies for poroelastic plates
FUNDAÇÃO DE AMPARO À PESQUISA DO ESTADO DE SÃO PAULO - FAPESP
2013/03413-4; 2013/07375-0; 2015/50302-9
CONSELHO NACIONAL DE DESENVOLVIMENTO CIENTÍFICO E TECNOLÓGICO - CNPQ
305277/2015-4
Fechado
A fast numerical framework to compute acoustic scattering by poroelastic plates of arbitrary geometry
A fast numerical framework to compute acoustic scattering by poroelastic plates of arbitrary geometry
Fontes
Journal of computational physics Vol. 373 (Nov., 2018), p. 763-783 |