On the degeneration of creeping waves in a vicinity of critical values of the impedance

Creeping waves propagating on a three-dimensional surface with an impedance boundary condition are considered. The standard asymptotic formula for the creeping waves contains the factor l/( ξ + q 2) where ξ is the attenuation parameter and q is the Fock parameter q = ( kρ/2) 1/3 Z, where k is the wa...

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Bibliographic Details
Published in:Wave motion 2008-03, Vol.45 (4), p.400-411
Main Authors: Andronov, I.V., Bouche, D.
Format: Article
Language:English
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Summary:Creeping waves propagating on a three-dimensional surface with an impedance boundary condition are considered. The standard asymptotic formula for the creeping waves contains the factor l/( ξ + q 2) where ξ is the attenuation parameter and q is the Fock parameter q = ( kρ/2) 1/3 Z, where k is the wave number, ρ is the radius of curvature of the geodesics followed by creeping wave and Z is the impedance. This factor diverges when the parameter q takes critical values, which means invalidity of the usual asymptotic formula for creeping wave field. The critical values of the Fock parameter q are found and a new local asymptotics is derived in the supposition that the factor l/( ξ + q 2) is infinite on a curve (which we call the degeneration curve) crossed by creeping waves. This new asymptotic decomposition is carried out by powers of the small parameter k −1/9. The effect of creeping wave passing through the degeneration curve is examined.
ISSN:0165-2125
1878-433X
DOI:10.1016/j.wavemoti.2007.09.009