On vector derivative nonlinear Schrödinger equation
DOI:
https://doi.org/10.13108/2024-16-3-92Keywords:
integrable nonlinear equation, Kaup -- Newell equation, Chen -- Lee -- Liu equation, Gerdjikov -- Ivanov equation, multiphase equation, spectral curveAbstract
We propose a sequence of Lax pairs, the compatibility conditions of which are integrable vector nonlinear equations. The first equations in this hierarchy are vector Kaup -- Newell, Chen -- Lee -- Liu, Gerdjikov -- Ivanov integrable nonlinear equations. The type of vector equation depends on an additional parameter $\alpha$. The proposed form of the vector Kaup -- Newell equation has slight differences in comparison with the classical form. We show that the evolution of simplest nontrivial solutions of these equations is a composition of the evolutions of length and orientations of solution. We study properties of spectral curves of simplest nontrivial solutions the vector equations in the constructed hierarchy.
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Published
12.09.2024
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