The spectral functions method for acoustic wave diffraction by a stress-free wedge: theory and validation
DOI10.1016/j.jcp.2018.10.040zbMath1416.76198OpenAlexW2898640843MaRDI QIDQ2002468
Gilles Lebeau, Audrey Kamta Djakou, Samar Chehade, Michel Darmon
Publication date: 12 July 2019
Published in: Journal of Computational Physics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.jcp.2018.10.040
Spectral, collocation and related methods for boundary value problems involving PDEs (65N35) Water waves, gravity waves; dispersion and scattering, nonlinear interaction (76B15) Spectral methods applied to problems in fluid mechanics (76M22) Hydro- and aero-acoustics (76Q05)
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Cites Work
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- The linear hyperbolic initial and boundary value problems in a domain with corners
- Wave diffraction by wedges having arbitrary aperture angle
- Rayleigh wave scattering by a wedge
- Scattering of a Rayleigh wave by an elastic wedge whose angle is less than \(180^{\circ}\)
- Feasible fundamental solution of the multiphysics wave equation in inhomogeneous domains of complex shape
- On Budaev and Bogy’s Approach to Diffraction by the 2D Traction‐Free Elastic Wedge
- Scattering of a Rayleigh Wave by an Elastic Wedge Whose Angle is Greater Than 180 Degrees
- Diffraction by an elastic wedge with stress-free boundary: existence and uniqueness
- Diffraction by a Two-Dimensional Traction-Free Elastic Wedge
- Initial-Boundary Value Problems for Hyperbolic Systems in Regions with Corners. I
- Initial-Boundary Value Problems for Hyperbolic Systems in Regions with Corners. II
- SOME EXTENSIONS TO THE METHOD OF INTEGRATION BY STEEPEST DESCENTS
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