Evolution equations such as the nonliear Schrödinger equation (NLSE) can be extended to include an infinite number of free parameters. The extensions are not unique. We give two examples that contain the NLSE as the lowest-order PDE of each set. Such representations provide the advantage of modelling a larger variety of physical problems due to the presence of an infinite number of higher-order terms in this equation with an infinite number of arbitrary parameters. An example of a rogue wave solution for one of these cases is presented, demonstrating the power of the technique

Akhmediev, Nail

Amiranashvili, Shalva

Ankiewicz, Adrian

Bandelow, Uwe

English

Evolution equations such as the nonlinear Schrödinger equation (NLSE)
can be extended to include an infinite number of free parameters. The
extensions are not unique. We give two examples that contain the NLSE as the
lowest-order PDE of each set. Such representations provide the advantage of
modelling a larger variety of physical problems due to the presence of an
infinite number of higher-order terms in this equation with an infinite
number of arbitrary parameters. An example of a rogue wave solution for one
of these cases is presented, demonstrating the power of the technique

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Generalized integrable evolution equations with an infinite number of
free parameters

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Generalized integrable evolution equations with an infinite number of free parameters

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Generalized integrable evolution equations with an infinite number of free parameters

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Repositorium für Naturwissenschaften und Technik

Publications Server of the Weierstrass Institute for Applied Analysis and Stochastics