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Communications in Mathematical Sciences
Volume 21 (2023)
Number 6
Riemann–Hilbert problem for the focusing Hirota equation with counterpropagating flows
Pages: 1625 – 1654
DOI: https://dx.doi.org/10.4310/CMS.2023.v21.n6.a9
Authors
Abstract
The focusing Hirota equation is analyzed with a general initial condition via the inverse scattering transform, whose asymptotic behavior at infinity consists of counterpropagating waves. According to some necessary conditions, including jump condition, normalization condition, residue conditions and suitable growth condition near the branch points, the inverse problem is transformed into a matrix Riemann–Hilbert (RH) problem jumping along the branch cuts and real axis, the problem is transformed into a set of linear algebraic integral equations, and the reconstruction formula of potential is successfully obtained. In addition, the zero point of the analytical scattering coefficient on the continuous spectrum is placed on a sufficiently large circle, so a modified piecewise analytical RH problem is further successfully constructed. Finally, the exact expressions of soliton solution and breathing solution of focusing Hirota equation under degenerate initial value conditions are discussed.
Keywords
focusing Hirota equation, Riemann–Hilbert problem, counterpropagating flows
2010 Mathematics Subject Classification
35C08, 35Q15, 35Q51
This work was supported by the National Natural Science Foundation of China under Grant No. 11975306, the Natural Science Foundation of Jiangsu Province under Grant No. BK20181351, the Six Talent Peaks Project in Jiangsu Province under Grant No. JY-059, the 333 Project in Jiangsu Province, the Fundamental Research Fund for the Central Universities under the Grant No. 2019ZDPY07, the Graduate Innovation Program of the China University of Mining and Technology under Grant No. 2023WLKXJ118, and the Postgraduate Research & Practice Innovation Program of Jiangsu Province under Grant No. KYCX-232644.
Received 4 July 2022
Received revised 24 November 2022
Accepted 4 December 2022
Published 22 September 2023