posted on 2007-01-23, 11:09authored byRoger Grimshaw, D.H. Zhang, K.W. Chow
It is well-known that transcritical flow over a localised obstacle generates upstream
and downstream nonlinear wavetrains. The flow has been successfully modeled in the
framework of the forced Korteweg-de Vries equation, where numerical and asymptotic
analytical solutions have shown that the upstream and downstream nonlinear wavetrains
have the structure of unsteady undular bores, connected by a locally steady solution over
the obstacle, which is elevated on the upstream side and depressed on the downstream
side. In this paper we consider the analogous transcritical flow over a step, primarily in
the context of water waves. We use numerical and asymptotic analytical solutions of the
forced Korteweg-de Vries equation, together with numerical solutions of the full Euler
equations, to demonstrate that a positive step generates only an upstream-propagating
undular bore, and a negative step generates only a downstream-propagating undular bore.