Abstract
This paper presents a technique, based on a deferred approach to a limit, for analysing the dispersion relation for propagation of long waves in a curved waveguide. The technique involves the concept of an analytically satisfactory pair of Bessel functions, which is different from the concept of a numerically satisfactory pair, and simplifies the dispersion relations for curved waveguide problems. Details are presented for long elastic waves in a curved layer, for which symmetric and antisymmetric waves are strongly coupled. The technique gives high-order corrections to a widely used approximate dispersion relation based a kinematic hypothesis, and determines rigorously which of its coefficients are exact.
Originalsprog | Engelsk |
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Artikelnummer | 20160900 |
Tidsskrift | Proceedings of the Royal Society A: Mathematical, Physical and Engineering Sciences |
Vol/bind | 473 |
Udgave nummer | 2200 |
ISSN | 1364-5021 |
DOI | |
Status | Udgivet - 1 apr. 2017 |