On the existence of surface waves in an elastic half-space with impedance boundary conditions
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Date
2012
Journal Title
Journal ISSN
Volume Title
Publisher
ELSEVIER SCIENCE BV
Abstract
In this work, the problem of surface waves in an isotropic elastic half-space with impedance boundary conditions is investigated. It is assumed that the boundary is free of normal traction and the shear traction varies linearly with the tangential component of displacement multiplied by the frequency, where the impedance corresponds to the constant of proportionality. The standard traction-free boundary conditions are then retrieved for zero impedance. The secular equation for surface waves with impedance boundary conditions is derived in explicit form. The existence and uniqueness of the Rayleigh wave is properly established, and it is found that its velocity varies with the impedance. Moreover, we prove that an additional surface wave exists in a particular case, whose velocity lies between those of the longitudinal and the transverse waves. Numerical examples are presented to illustrate the obtained results. (C) 2012 Elsevier B.V. All rights reserved.
Description
Keywords
Surface waves, Secular equation, Rayleigh waves, Elastic half-space, Impedance boundary conditions, RAYLEIGH-WAVES, SECULAR EQUATION, HELMHOLTZ-EQUATION, VELOCITY, FORMULA, SPEED, EXPRESSIONS, PLANE, MEDIA