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Camassa–Holm_equation abstract "In fluid dynamics, the Camassa–Holm equation is the integrable, dimensionless and non-linear partial differential equationThe equation was introduced by Camassa and Holm as a bi-Hamiltonian model for waves in shallow water, and in this context the parameter κ is positive and the solitary wave solutions are smooth solitons.In the special case that κ is equal to zero, the Camassa–Holm equation has peakon solutions: solitons with a sharp peak, so with a discontinuity at the peak in the wave slope.".
Camassa–Holm_equation thumbnail Two-peakon.svg?width=300.
Camassa–Holm_equation wikiPageID "16871767".
Camassa–Holm_equation wikiPageRevisionID "597235965".
Camassa–Holm_equation bodystyle "font-size: 100%".
Camassa–Holm_equation title "Introductions to the subject".
Camassa–Holm_equation title "Others".
Camassa–Holm_equation toggle "left".
Camassa–Holm_equation subject Category:Equations_of_fluid_dynamics.
Camassa–Holm_equation subject Category:Partial_differential_equations.
Camassa–Holm_equation subject Category:Solitons.
Camassa–Holm_equation comment "In fluid dynamics, the Camassa–Holm equation is the integrable, dimensionless and non-linear partial differential equationThe equation was introduced by Camassa and Holm as a bi-Hamiltonian model for waves in shallow water, and in this context the parameter κ is positive and the solitary wave solutions are smooth solitons.In the special case that κ is equal to zero, the Camassa–Holm equation has peakon solutions: solitons with a sharp peak, so with a discontinuity at the peak in the wave slope.".
Camassa–Holm_equation label "Camassa–Holm equation".
Camassa–Holm_equation label "卡马萨-霍尔姆方程".
Camassa–Holm_equation sameAs Camassa%E2%80%93Holm_equation.
Camassa–Holm_equation sameAs Q5025006.
Camassa–Holm_equation sameAs Q5025006.
Camassa–Holm_equation wasDerivedFrom Camassa–Holm_equation?oldid=597235965.
Camassa–Holm_equation depiction Two-peakon.svg.