On Hamiltonian formulations of the \(\mathcal{C}_1(m, a, b)\) equations
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Publication:1681464
DOI10.1016/j.physleta.2017.03.009zbMath1375.35440OpenAlexW2597021104MaRDI QIDQ1681464
Alon Zilburg, Philip S. Rosenau
Publication date: 23 November 2017
Published in: Physics Letters. A (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.physleta.2017.03.009
KdV equations (Korteweg-de Vries equations) (35Q53) Soliton equations (35Q51) Soliton solutions (35C08)
Related Items (10)
Local well-posedness for a quasilinear Schroedinger equation with degenerate dispersion ⋮ Loss of regularity in the ${K(m, n)}$ equations ⋮ On Hamiltonian formulations of the \(\mathcal{C}_1(m, a, b)\) equations ⋮ On planar compactons with an extended regularity ⋮ Compacton solutions and (non)integrability of nonlinear evolutionary PDEs associated with a chain of prestressed granules ⋮ Compactons ⋮ Stability and interaction of compactons in the sublinear KdV equation ⋮ Lie symmetry analysis of \(C_1(m, a, b)\) partial differential equations ⋮ Compactons and their variational properties for degenerate KdV and NLS in dimension 1 ⋮ On the stability of the compacton waves for the degenerate KdV and NLS models
Cites Work
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- On a model equation of traveling and stationary compactons
- Darboux' theorem for Hamiltonian differential operators
- Modifying Lax equations and the second Hamiltonian structure
- On Hamiltonian formulations of the \(\mathcal{C}_1(m, a, b)\) equations
- On solitons, compactons, and Lagrange maps.
- On singular and sincerely singular compact patterns
- On solitary patterns in Lotka–Volterra chains
- Dirac’s theory of constraints in field theory and the canonical form of Hamiltonian differential operators
- Classification results and the Darboux theorem for low-order Hamiltonian operators
- An integrable shallow water equation with peaked solitons
- Compactons: Solitons with finite wavelength
- Korteweg-de Vries Equation and Generalizations. II. Existence of Conservation Laws and Constants of Motion
- A complete list of conservation laws for non-integrable compacton equations ofK(m,m) type
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