Anca Visinescu, Dan Grecu, Renato Fedele, Sergio De Nicola, “Periodic and Solitary Wave Solutions of Two Component Zakharov–Yajima–Oikawa System, Using Madelung's Approach”, SIGMA, 2011, Volume 7,041, 11 pp.

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Periodic and Solitary Wave Solutions of Two Component Zakharov–Yajima–Oikawa System, Using Madelung's Approach

Anca Visinescu^a, Dan Grecu^a, Renato Fedele^bc, Sergio De Nicola^d

^a Department of Theoretical Physics, National Institute for Physics and Nuclear Engineering, Bucharest, Romania
^b Dipartimento di Scienze Fisiche, Universita Federico II
^c INFN Sezione di Napoli, Napoli, Italy
^d Istituto Nazionale di Ottica del Consiglio Nazionale delle Ricerche, Pozuolli, (Na), Italy

Abstract: Using the multiple scales method, the interaction between two bright and one dark solitons is studied. Provided that a long wave-short wave resonance condition is satisfied, the two-component Zakharov–Yajima–Oikawa (ZYO) completely integrable system is obtained. By using a Madelung fluid description, the one-soliton solutions of the corresponding ZYO system are determined. Furthermore, a discussion on the interaction between one bright and two dark solitons is presented. In particular, this problem is reduced to solve a one-component ZYO system in the resonance conditions.

Keywords: dark-bright solitons; nonlinear Schrödinger equation; Zakharov–Yajima–Oikawa system; Madelung fluid approach.

MSC: 35Q55; 37K10; 45G15

Received: February 10, 2011; in final form April 19, 2011; Published online April 23, 2011

Language: English

DOI: 10.3842/SIGMA.2011.041