2012
DOI: 10.1017/jfm.2012.338
|View full text |Cite
|
Sign up to set email alerts
|

Transformation of a shoaling undular bore

Abstract: We consider the propagation of a shallow-water undular bore over a gentle monotonic bottom slope connecting two regions of constant depth, in the framework of the variablecoefficient Korteweg -de Vries equation. We show that, when the undular bore advances in the direction of decreasing depth, its interaction with the slowly varying topography results, apart from an adiabatic deformation of the bore itself, in the generation of a sequence of isolated solitons -an expanding large-amplitude modulated solitary wa… Show more

Help me understand this report

Search citation statements

Order By: Relevance

Paper Sections

Select...
3
2

Citation Types

2
42
0
1

Year Published

2013
2013
2018
2018

Publication Types

Select...
4
1
1

Relationship

0
6

Authors

Journals

citations
Cited by 38 publications
(45 citation statements)
references
References 36 publications
2
42
0
1
Order By: Relevance
“…An alternative method developed by Kamchatnov (2004) for a perturbed KdV equation requires a change of variable in (5), U ¼ bŨ andT ¼ R T b dT, to generate a KdV equation forŨ with a perturbation term of the form bTŨ=b. This approach was used by El et al (2007El et al ( , 2012 to study the evolution of solitary waves and undular bores over a slope, a study similar but complementary to that described here.…”
Section: Modulation Equationsmentioning
confidence: 99%
See 4 more Smart Citations
“…An alternative method developed by Kamchatnov (2004) for a perturbed KdV equation requires a change of variable in (5), U ¼ bŨ andT ¼ R T b dT, to generate a KdV equation forŨ with a perturbation term of the form bTŨ=b. This approach was used by El et al (2007El et al ( , 2012 to study the evolution of solitary waves and undular bores over a slope, a study similar but complementary to that described here.…”
Section: Modulation Equationsmentioning
confidence: 99%
“…1 in the modulation equations (14, 15) by retaining the terms in 1/K(m), or more directly by averaging the wave action conservation law (8) for a solitary wave, see Whitham (1974) for the case of the constant-coefficient KdV equation, or Grimshaw (1979) and the discussion in El et al (2012) for the variable-coefficient KdV equation. The pair (13), (20) form a nonlinear hyperbolic system for a solitary wave train and can be solved explicitly.…”
Section: Modulation Equationsmentioning
confidence: 99%
See 3 more Smart Citations