2021
DOI: 10.1093/imamat/hxab005
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General rogue waves in the three-wave resonant interaction systems

Abstract: General rogue waves in (1+1)-dimensional three-wave resonant interaction systems are derived by the bilinear method. These solutions are divided into three families, which correspond to a simple root, two simple roots and a double root of a certain quartic equation arising from the dimension reduction, respectively. It is shown that while the first family of solutions associated with a simple root exists for all signs of the nonlinear coefficients in the three-wave interaction equations, the other two families… Show more

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Cited by 45 publications
(92 citation statements)
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“…Remark 3. The function σ k (k = 0, 1) in Theorem 2.3 is a polynomial in x and t. It can be computed that for the N -th order rogue wave, the degree of σ k (k = 0, 1) is 2N (N + 1) for both variables x and t. Since the computations are very similar to those developed by Yang and Yang (see Appendix A in [48]), we omit the details.…”
Section: Introductionmentioning
confidence: 62%
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“…Remark 3. The function σ k (k = 0, 1) in Theorem 2.3 is a polynomial in x and t. It can be computed that for the N -th order rogue wave, the degree of σ k (k = 0, 1) is 2N (N + 1) for both variables x and t. Since the computations are very similar to those developed by Yang and Yang (see Appendix A in [48]), we omit the details.…”
Section: Introductionmentioning
confidence: 62%
“…then f, g and g satisfy the bilinear equations ( 22). Hence, with τ k = τ k0 , k = 0, 1, rational solutions to the Sasa-Satsuma equation ( 2) are obtained via the transformation (23).…”
Section: Proof Of Theorem 22mentioning
confidence: 99%
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“…It is known that the multi-component NLS equation admits more RW patterns in contrast to the scalar NLS equation [47][48][49][50][51][52], such as the mixed bounded RWs consisting of RWs of different types, and the degenerate bounded RWs. Very recently, Yang and Yang derived a family of new bounded RW solutions to the three-wave resonant interaction system [61], which consists of…”
Section: Introductionmentioning
confidence: 99%