Deterministic Vector Freak Waves
Fabio Baronio, Antonio Degasperis, Matteo Conforti, Stefan Wabnitz
TL;DR
This paper introduces a new class of vector freak wave solutions for coupled nonlinear Schrödinger equations, expanding the understanding of rogue waves in various physical systems.
Contribution
It presents a semi-rational, multi-parametric family of solutions that includes known and novel vector freak waves, advancing the theoretical framework of nonlinear wave phenomena.
Findings
Includes known vector Peregrine solutions
Introduces novel vector freak wave solutions
Potential applications across optics, BEC, and finance
Abstract
We construct and discuss a semi-rational, multi-parametric vector solution of coupled nonlinear Schr\"odinger equations (Manakov system). This family of solutions includes known vector Peregrine solutions, bright-dark-rogue solutions, and novel vector unusual freak waves. The vector freak (or rogue) waves could be of great interest in a variety of complex systems, from optics to Bose-Einstein condensates and finance.
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