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Supercritical surface gravity waves generated by a positive forcing
Forced surface waves on an incompressible, inviscid fluid in a two-dimensional channel with a small bump on a horizontal rigid flat bottom are studied. The wave motion on the free surface is determined by a nondimensional wave speed F, called Froude number, and F = 1 is a critical value of F. If F =...
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| Published in: | European journal of mechanics, B, Fluids B, Fluids, 2008-11, Vol.27 (6), p.750-770 |
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| Main Authors: | , , |
| Format: | Article |
| Language: | English |
| Subjects: | |
| Citations: | Items that this one cites Items that cite this one |
| Online Access: | Get full text |
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| Summary: | Forced surface waves on an incompressible, inviscid fluid in a two-dimensional channel with a small bump on a horizontal rigid flat bottom are studied. The wave motion on the free surface is determined by a nondimensional wave speed
F, called Froude number, and
F
=
1
is a critical value of
F. If
F
=
1
+
λ
ϵ
with
ϵ
>
0
a small parameter, then a time-dependent forced Korteweg–de Vries (FKdV) equation can be derived to model the wave motion on the free surface. Here, the case
λ
⩾
0
(or
F
⩾
1
, called supercritical case) is considered. The steady FKdV equation is first studied both theoretically and numerically. It is shown that there exists a cut-off value
λ
0
of
λ. For
λ
⩾
λ
0
there are steady solutions, while for
0
⩽
λ
<
λ
0
no steady solution of FKdV exists. For the unsteady FKdV equation, it is found that for
λ
>
λ
0
, the solution of FKdV with zero initial condition tends to a stable steady solution, whilst for
0
<
λ
<
λ
0
a succession of solitary waves are periodically generated and continuously propagating upstream as time evolves. Moreover, the solutions of FKdV equation with nonzero initial conditions are studied. |
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| ISSN: | 0997-7546 1873-7390 |
| DOI: | 10.1016/j.euromechflu.2008.01.006 |