2014
DOI: 10.1103/physreve.90.033203
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Coexisting rogue waves within the (2+1)-component long-wave–short-wave resonance

Abstract: The coexistence of two different types of fundamental rogue waves is unveiled, based on the coupled equations describing the (2+1)-component long-wave-short-wave resonance. For a wide range of asymptotic background fields, each family of three rogue wave components can be triggered by using a slight deterministic alteration to the otherwise identical background field. The ability to trigger markedly different rogue wave profiles from similar initial conditions is confirmed by numerical simulations. This remark… Show more

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Cited by 60 publications
(65 citation statements)
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“…However, both modes here share the same baseband growth rate because they correspond to a pair of complex conjugate roots of Equation (3). Similar co-existence of rogue waves in a chaotic wave field was also reported earlier in the literature [40]. …”
Section: Computational Approachsupporting
confidence: 89%
See 1 more Smart Citation
“…However, both modes here share the same baseband growth rate because they correspond to a pair of complex conjugate roots of Equation (3). Similar co-existence of rogue waves in a chaotic wave field was also reported earlier in the literature [40]. …”
Section: Computational Approachsupporting
confidence: 89%
“…From Equation (3), if a + ib is a root of the dispersion relation, then a − ib will also be admissible and provides another rogue wave solution. This phenomenon was also observed in other multi-component system [38][39][40][41]. Such multi-rogue-wave scenarios are not allowed in the two-component Manakov system.…”
Section: Extension Of Existence Regimementioning
confidence: 54%
“…However, the wave patterns associated with the first pair are drastically different from those corresponding to the second pair. Indeed, multiple roots of dispersion relations of RW systems, e.g., long-wave-short-wave interaction model [30], are known to produce different wave profiles.…”
Section: The Evolution Model and Rogue Wavesmentioning
confidence: 99%
“…While similar approaches might have been adopted in earlier works , we also exhibit the connection between the instability gain spectrum and RWs by following the time evolution of a plane wave subjected to a disturbance of a specified frequency. With information from the MI gain spectrum, further quantitative trends can be deduced.…”
Section: Introductionmentioning
confidence: 99%