Journal article

An undular bore solution for the higher-order Korteweg-de Vries equation

TR Marchant, NF Smyth

Journal of Physics A Mathematical and General | IOP PUBLISHING LTD | Published : 2006

Abstract

Undular bores describe the evolution and smoothing out of an initial step in mean height and are frequently observed in both oceanographic and meteorological applications. The undular bore solution for the higher-order Korteweg-de Vries (KdV) equation is derived, using an asymptotic transformation which relates the KdV equation and its higher-order counterpart. The higher-order KdV equation considered includes all possible third-order correction terms (where the KdV equation retains second-order terms). The asymptotic transformation is then applied to the KdV undular bore solution to obtain the higher-order undular bore. Examples of higher-order undular bores, describing both surface and int..

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University of Melbourne Researchers