| Article ID | Journal | Published Year | Pages | File Type |
|---|---|---|---|---|
| 734455 | Optics & Laser Technology | 2013 | 7 Pages |
In this paper, with symbolic computation, a generalized variable-coefficient coupled Hirota–Maxwell–Bloch system is studied, which can describe the ultrashort optical pulse propagation in a variable-coefficient nonlinear, dispersive fiber doped with two-level resonant atoms. Integrable conditions of such system are determined via the Painlevé analysis and the associated Lax pair is explicitly constructed. Furthermore, the analytic one- and two-soliton-like solutions are derived by virtue of the Darboux transformation. Through the graphical analysis of the soliton-like solutions obtained, the propagation features of optical solitons and their interaction behaviors are discussed. Different from the previous results, the two-soliton interaction is found to admit the energy interchanging property.
► Generalized variable-coefficient coupled Hirota–Maxwell–Bloch system is studied. ► The associated Lax pair is explicitly constructed. ► Soliton solutions are derived by virtue of the Darboux transformation. ► The two-soliton collision is found to admit the energy interchanging property.
