Explicit secular equations of Rayleigh waves in elastic media under the influence of gravity and initial stress
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Publication:732500
DOI10.1016/J.AMC.2009.05.014zbMath1172.74031OpenAlexW2005210276MaRDI QIDQ732500
Publication date: 9 October 2009
Published in: Applied Mathematics and Computation (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.amc.2009.05.014
Related Items (6)
New results on Rayleigh waves in incompressible elastic media subjected to gravity ⋮ Rayleigh-type wave propagation in exponentially graded initially stressed composite structure resting on rigid and yielding foundations ⋮ Rayleigh waves in an incompressible elastic half-space overlaid with a water layer under the effect of gravity ⋮ Weakly nonlocal Rayleigh waves with impedance boundary conditions ⋮ On formulas for the velocity of Stoneley waves propagating along the loosely bonded interface of two elastic half-spaces ⋮ Influence of initial stress and gravity field on propagation of Rayleigh and Stoneley waves in a thermoelastic orthotropic granular medium
Cites Work
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- Rayleigh-gravity waves in a heavy elastic medium
- Propagation of Rayleigh waves in an elastic half-space of orthotropic material
- Stoneley and Rayleigh waves in a non-homogeneous orthotropic elastic medium under the influence of gravity.
- Interfacial and surface waves in pre-strained isotropic elastic media
- An Explicit Secular Equation for Surface Waves in an Elastic Material of General Anisotropy
- Dislocations and Cracks in Anisotropic Elasticity
- Steady State Problems in Anisotropic Elasticity
- The existence of pure surface modes in elastic materials with orthorhombic symmetry
- Seismic Rayleigh waves on an exponentially graded, orthotropic half-space
- Rayleigh waves guided by topography
- The Influence of Initial Stress on Elastic Waves
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