TY - JOUR
T1 - Rayleigh's, Stoneley's, and Scholte's interface waves in elastic models using a boundary element method
AU - Flores-Mendez, Esteban
AU - Carbajal-Romero, Manuel
AU - Flores-Guzmán, Norberto
AU - Sánchez-Martínez, Ricardo
AU - Rodríguez-Castellanos, Alejandro
PY - 2012
Y1 - 2012
N2 - This work is focused on studying interface waves for three canonical models, that is, interfaces formed by vacuum-solid, solid-solid, and liquid-solid. These interfaces excited by dynamic loads cause the emergence of Rayleigh's, Stoneley's, and Scholte's waves, respectively. To perform the study, the indirect boundary element method is used, which has proved to be a powerful tool for numerical modeling of problems in elastodynamics. In essence, the method expresses the diffracted wave field of stresses, pressures, and displacements by a boundary integral, also known as single-layer representation, whose shape can be regarded as a Fredholm's integral representation of second kind and zero order. This representation can be considered as an exemplification of Huygens' principle, which is equivalent to Somigliana's representation theorem. Results in frequency domain for the three types of interfaces are presented; then, using the fourier discrete transform, we derive the results in time domain, where the emergence of interface waves is highlighted.
AB - This work is focused on studying interface waves for three canonical models, that is, interfaces formed by vacuum-solid, solid-solid, and liquid-solid. These interfaces excited by dynamic loads cause the emergence of Rayleigh's, Stoneley's, and Scholte's waves, respectively. To perform the study, the indirect boundary element method is used, which has proved to be a powerful tool for numerical modeling of problems in elastodynamics. In essence, the method expresses the diffracted wave field of stresses, pressures, and displacements by a boundary integral, also known as single-layer representation, whose shape can be regarded as a Fredholm's integral representation of second kind and zero order. This representation can be considered as an exemplification of Huygens' principle, which is equivalent to Somigliana's representation theorem. Results in frequency domain for the three types of interfaces are presented; then, using the fourier discrete transform, we derive the results in time domain, where the emergence of interface waves is highlighted.
UR - http://www.scopus.com/inward/record.url?scp=84859784493&partnerID=8YFLogxK
U2 - 10.1155/2012/313207
DO - 10.1155/2012/313207
M3 - Artículo
SN - 1110-757X
VL - 2012
JO - Journal of Applied Mathematics
JF - Journal of Applied Mathematics
M1 - 313207
ER -