P-wave and S-wave decomposition in boundary integral equation for plane elastodynamic problems.
(2003)
Journal Article
Perrey-Debain, E., Trevelyan, J., & Bettess, P. (2003). P-wave and S-wave decomposition in boundary integral equation for plane elastodynamic problems. Communications in numerical methods in engineering, 19(12), 945-958
Jonathan Trevelyan's Outputs (6)
Plane wave basis finite-elements for wave scattering in three dimensions. (2003)
Journal Article
Laghrouche, O., Bettess, P., Perrey-Debain, E., & Trevelyan, J. (2003). Plane wave basis finite-elements for wave scattering in three dimensions. Communications in numerical methods in engineering, 19(9), 715-723
Use of wave boundary elements for acoustic computations. (2003)
Journal Article
Perrey-Debain, E., Trevelyan, J., & Bettess, P. (2003). Use of wave boundary elements for acoustic computations. Journal of computational acoustics (Singapore.Online), 11(2), 305-321
Plane wave interpolation in direct collocation boundary element method for radiation and wave scattering : numerical aspects and applications (2003)
Journal Article
Perrey-Debain, E., Trevelyan, J., & Bettess, P. (2003). Plane wave interpolation in direct collocation boundary element method for radiation and wave scattering : numerical aspects and applications. Journal of Sound and Vibration, 261(5), 839-858. https://doi.org/10.1016/s0022-460x%2802%2901006-4The classical boundary element formulation for the Helmholtz equation is rehearsed, and its limitations with respect to the number of variables needed to model a wavelength are explained. A new type of interpolation for the potential is then describe... Read More about Plane wave interpolation in direct collocation boundary element method for radiation and wave scattering : numerical aspects and applications.
A numerical integration scheme for special quadrilateral finite elements for the Helmholtz equation. (2003)
Journal Article
Sugimoto, R., Bettess, P., & Trevelyan, J. (2003). A numerical integration scheme for special quadrilateral finite elements for the Helmholtz equation. Communications in numerical methods in engineering, 19(3), 233-245
A numerical integration scheme for special finite elements for the Helmholtz equation. (2003)
Journal Article
Bettess, P., Shirron, J., Laghrouche, O., Peseux, B., Sugimoto, R., & Trevelyan, J. (2003). A numerical integration scheme for special finite elements for the Helmholtz equation. International Journal for Numerical Methods in Engineering, 56(4), 531-552