Camassa–Holm, Korteweg–de Vries-5 and other asymptotically equivalent equations for shallow water waves

Dullin, Holger R.; Gottwald, Georg A.; Holm, Darryl D.

doi:10.1016/s0169-5983(03)00046-7

Cited by 264 publications

(226 citation statements)

References 36 publications

Supporting

Mentioning

219

Contrasting

Unclassified

Order By: Relevance

“…The two-body dynamics is integrable for any b (see Figure 1), and for all values of b > 1 the peakons appear to be numerically stable and dominate the initial value problem [24]. Furthermore, with the addition of linear dispersion (u x and u xxx terms) it has been shown that not only the Camassa-Holm equation [20] but also the whole b-family (1.6) (apart from b = −1) belong to a class of asymptotically equivalent shallow water wave equations [21].…”

Section: Introductionmentioning

confidence: 98%

A Class of Equations with Peakon and Pulson Solutions (with an Appendix by Harry Braden and John Byatt-Smith)

Holm¹,

Hone²

2005

JNMP

View full text Add to dashboard Cite

We consider a family of integro-differential equations depending upon a parameter b as well as a symmetric integral kernel g(x). When b = 2 and g is the peakon kernel (i.e. g(x) = exp(−|x|) up to rescaling) the dispersionless Camassa-Holm equation results, while the Degasperis-Procesi equation is obtained from the peakon kernel with b = 3. Although these two cases are integrable, generically the corresponding integro-PDE is non-integrable. However, for b = 2 the family restricts to the pulson family of Fringer & Holm, which is Hamiltonian and numerically displays elastic scattering of pulses. On the other hand, for arbitrary b it is still possible to construct a nonlocal Hamiltonian structure provided that g is the peakon kernel or one of its degenerations: we present a proof of this fact using an associated functional equation for the skew-symmetric antiderivative of g. The nonlocal bracket reduces to a non-canonical Poisson bracket for the peakon dynamical system, for any value of b = 1.

show abstract

Section: Introductionmentioning

confidence: 98%

A Class of Equations with Peakon and Pulson Solutions (with an Appendix by Harry Braden and John Byatt-Smith)

Holm¹,

Hone²

2005

JNMP

View full text Add to dashboard Cite

show abstract

“…Dullin etal. [25] showed that Eq. (1.4) can be obtained from the shallow water elevation equation by an appropriate Kodama transformation.…”

Section: Introductionmentioning

confidence: 99%

Blow-Up Phenomena and Global Existence to a Weakly Dissipative Shallow Water Equation

Zhou

Chen

Zhang³

2014

BSMaSS

View full text Add to dashboard Cite

show abstract

“…was derived recently as a shallow water approximation to the Euler equation [14]. The equation (1.1) presents some similarities to the Camassa-Holm equation [1,17] u t − u txx + 3uu x = 2u x u xx + uu xxx , x ∈ R, t ≥ 0.…”

Section: Introductionmentioning

confidence: 99%

A Note on the Degasperis-Procesi Equation

Mustafa¹

2005

JNMP

View full text Add to dashboard Cite

show abstract

Camassa–Holm, Korteweg–de Vries-5 and other asymptotically equivalent equations for shallow water waves

Cited by 264 publications

References 36 publications

A Class of Equations with Peakon and Pulson Solutions (with an Appendix by Harry Braden and John Byatt-Smith)

A Class of Equations with Peakon and Pulson Solutions (with an Appendix by Harry Braden and John Byatt-Smith)

Blow-Up Phenomena and Global Existence to a Weakly Dissipative Shallow Water Equation

A Note on the Degasperis-Procesi Equation

Contact Info

Product

Resources

About