Symmetries and Integrability of Modified Camassa-Holm Equation with an Arbitrary Parameter
We study the symmetry and integrability of a modified Camassa-Holm Equation (MCH), with an arbitrary parameter $k,$ of the form $$u_{t}+k(u-u_{xx})^2u_{x}-u_{xxt}+(u^{2}-{u_{x}}^2)(u_{x}-u_{xxx})=0.$$ By using Lie point symmetries we reduce the order of the above equation and also we obtain interest...
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| Format: | Artikel |
| Sprache: | eng |
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| Zusammenfassung: | We study the symmetry and integrability of a modified Camassa-Holm Equation
(MCH), with an arbitrary parameter $k,$ of the form
$$u_{t}+k(u-u_{xx})^2u_{x}-u_{xxt}+(u^{2}-{u_{x}}^2)(u_{x}-u_{xxx})=0.$$ By
using Lie point symmetries we reduce the order of the above equation and also
we obtain interesting novel solutions for the reduced ordinary differential
equations. Finally we apply the Painlev\'e Test to the resultant nonlinear
ordinary differential equation. |
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| DOI: | 10.48550/arxiv.1911.05713 |