TY - JOUR
T1 - Approximation of acoustic black holes with finite element mixed formulations and artificial neural network correction terms
AU - Fabra, Arnau
AU - Guasch, Oriol
AU - Baiges, Joan
AU - Codina, Ramon
N1 - Publisher Copyright:
© 2024 Elsevier B.V.
PY - 2024/11/15
Y1 - 2024/11/15
N2 - Wave propagation in elastodynamic problems in solids often requires fine computational meshes. In this work we propose to combine stabilized finite element methods (FEM) with an artificial neural network (ANN) correction term to solve such problems on coarse meshes. Irreducible and mixed velocity–stress formulations for the linear elasticity problem in the frequency domain are first presented and discretized using a variational multiscale FEM. A non-linear ANN correction term is then designed to be added to the FEM algebraic matrix system and produce accurate solutions when solving elastodynamics on coarse meshes. As a case study we consider acoustic black holes (ABHs) on structural elements with high aspect ratios such as beams and plates. ABHs are traps for flexural waves based on reducing the structural thickness according to a power-law profile at the end of a beam, or within a two-dimensional circular indentation in a plate. For the ABH to function properly, the thickness at the termination/center must be very small, which demands very fine computational meshes. The proposed strategy combining the stabilized FEM with the ANN correction allows us to accurately simulate the response of ABHs on coarse meshes for values of the ABH order and residual thickness outside the training test, as well as for different excitation frequencies.
AB - Wave propagation in elastodynamic problems in solids often requires fine computational meshes. In this work we propose to combine stabilized finite element methods (FEM) with an artificial neural network (ANN) correction term to solve such problems on coarse meshes. Irreducible and mixed velocity–stress formulations for the linear elasticity problem in the frequency domain are first presented and discretized using a variational multiscale FEM. A non-linear ANN correction term is then designed to be added to the FEM algebraic matrix system and produce accurate solutions when solving elastodynamics on coarse meshes. As a case study we consider acoustic black holes (ABHs) on structural elements with high aspect ratios such as beams and plates. ABHs are traps for flexural waves based on reducing the structural thickness according to a power-law profile at the end of a beam, or within a two-dimensional circular indentation in a plate. For the ABH to function properly, the thickness at the termination/center must be very small, which demands very fine computational meshes. The proposed strategy combining the stabilized FEM with the ANN correction allows us to accurately simulate the response of ABHs on coarse meshes for values of the ABH order and residual thickness outside the training test, as well as for different excitation frequencies.
KW - Acoustic black holes
KW - Artificial neural network
KW - Elastodynamics
KW - Stabilized finite element methods
KW - Vector-tensor mixed formulation
UR - http://www.scopus.com/inward/record.url?scp=85201886168&partnerID=8YFLogxK
U2 - 10.1016/j.finel.2024.104236
DO - 10.1016/j.finel.2024.104236
M3 - Article
AN - SCOPUS:85201886168
SN - 0168-874X
VL - 241
JO - Finite Elements in Analysis and Design
JF - Finite Elements in Analysis and Design
M1 - 104236
ER -