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The axisymmetric Rayleigh waves in a semi-infinite elastic solid

Ji Wang, Shaoyun Wang, Longtao Xie, Yangyang Zhang, Lili Yuan, Jianke Du, Han Zhang

2020Theoretical and Applied Mechanics Letters14 citationsDOIOpen Access PDF

Abstract

It is well-known that Rayleigh wave, also known as surface acoustic wave (SAW), solutions in semi-infinite solids are plane waves with signatory properties like the distinct velocity and exponentially decaying deformation in the depth. Applications of Rayleigh waves are focused on the deformation and energy in the vicinity of surface of solids and less loss in the propagation. A generalized model of Rayleigh waves in axisymmetric mode is established and solutions are obtained with cylindrical coordinates. It is found that the Rayleigh waves also propagate in the axisymmetric mode with slow decay in radius, confirming the existence of surface acoustic waves is irrelevant to coordinate system. On the other hand, the solutions can be treated as plane waves in regions far away from the source. Furthermore, the particle trajectory of axisymmetric SAW is a line with constant slope rather than the signatory ellipse in Cartesian coordinate case.

Topics & Concepts

Rayleigh waveRotational symmetryPhysicsMechanical waveLove waveCartesian coordinate systemRADIUSEllipseRayleigh scatteringSurface wavePlane (geometry)Classical mechanicsLongitudinal waveAcoustic waveMechanicsWave propagationGeometryOpticsMathematicsComputer securityComputer scienceAstronomyMicrofluidic and Bio-sensing TechnologiesGranular flow and fluidized bedsPlanetary Science and Exploration
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