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Instability of double-periodic waves in the nonlinear Schrodinger equation

It is shown how to compute the instability rates for the double-periodic solutions to the cubic NLS (nonlinear Schrodinger) equation by using the Lax linear equations. The wave function modulus of the double-periodic solutions is periodic both in space and time coordinates; such solutions generalize the standing waves which have the time-independent and space-periodic wave function modulus. Similar to other waves in the NLS equation, the double-periodic solutions are spectrally unstable and this instability is related to the bands of the Lax spectrum outside the imaginary axis. A simple numerical method is used to compute the unstable spectrum and to compare the instability rates of the double-periodic solutions with those of the standing periodic waves.

preprint2020arXivOpen access
Dmitry E. Pelinovsky
math.APmath-phmath.DSmath.MPnlin.PSnlin.SI
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Open access1 author6 topics
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Dmitry E. Pelinovsky

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