Prikazchikov
Explicit formulation for the Rayleigh wave field induced by surface stresses in an orthorhombic half-plane
Prikazchikov
Authors
Abstract
We develop an explicit asymptotic model for the Rayleigh wave field arising in case of stresses prescribed on the surface of an orthorhombic elastic half-plane. The model consists of an elliptic equation governing the behaviour within the half-plane, with boundary values given on the half-plane surface by a wave equation. Consequently, propagation along the surface is entirely accounted for by the hyperbolic equation, which, besides, may be immediately recast in terms of the associated surface displacement. The model readily solves otherwise involved dynamic problems for prescribed surface stresses, and its effectiveness is demonstrated for the classical Lamb's problem, as well as for the steady-state moving load problem. The latter example shows that the proposed model is really obtained by perturbation around the steady-state solution for a load moving at the Rayleigh speed.
| Acceptance Date | Jan 17, 2018 |
|---|---|
| Publication Date | Jan 17, 2018 |
| Journal | European Journal of Mechanics - A/Solids |
| Print ISSN | 0997-7538 |
| Publisher | Elsevier |
| Pages | 86-94 |
| Keywords | Asymptotic model; Rayleigh wave; Moving load |
| Publisher URL | https://iris.unimore.it/handle/11380/1155335#.WsSooS7waUk |
Files
Submitted EJMSOL_2017_782_Original_V0.pdf
(654 Kb)
PDF
Publisher Licence URL
https://creativecommons.org/licenses/by-nc-nd/4.0/
You might also like
On a Hyperbolic Equation for the Rayleigh Wave
(2023)
Journal Article
Asymptotic Formulation for the Rayleigh Wave on a Nonlocally Elastic Half-Space
(2023)
Journal Article
On non-locally elastic Rayleigh wave
(2022)
Journal Article