Odd-soliton solutions and inelastic interaction for the differential-difference nonlinear Schrödinger equation in nonlinear optics

Abstract Nonlinear Schrodinger equation-type may model diverse physical phenomena in nonlinear optics, plasma physics and fluid mechanics, etc. Under consideration in this paper is the differential–difference nonlinear Schrodinger equation. On the basis of its Lax pair, N -fold Darboux transformation and conservation laws for the differential–difference nonlinear Schrodinger equation are constructed. Odd-soliton solutions in terms of determinant are derived with the resulting Darboux transformation. Figures are plotted to reveal the dynamic features of the solitons. Especially, the inelastic interaction phenomena among the three solitons are discussed for the differential–difference nonlinear Schrodinger equation, which might be useful for understanding some physical phenomena in nonlinear optics.

[1]  Zuo-nong Zhu,et al.  On the gauge equivalent structure of the modified nonlinear Schrödinger equation , 2000 .

[2]  Yi-Tian Gao,et al.  An improved Γ-Riccati Bäcklund transformation and its applications for the inhomogeneous nonlinear Schrödinger model from plasma physics and nonlinear optics , 2012 .

[3]  M. Ablowitz Nonlinear Evolution Equations—Continuous and Discrete , 1977 .

[4]  M. Ablowitz,et al.  Nonlinear differential–difference equations and Fourier analysis , 1976 .

[5]  Mark J. Ablowitz,et al.  A Nonlinear Difference Scheme and Inverse Scattering , 1976 .

[6]  Xian-jing Lai,et al.  Exact Localized and Periodic Solutions of the Ablowitz-Ladik Discrete Nonlinear Schrödinger System , 2005 .

[7]  Adrian Ankiewicz,et al.  Discrete rogue waves of the Ablowitz-Ladik and Hirota equations. , 2010, Physical review. E, Statistical, nonlinear, and soft matter physics.

[8]  On soliton creation in the nonlinear Schrodinger models: discrete and continuous versions , 1992 .

[9]  V. Konotop,et al.  Discrete nonlinear Schrodinger equation under nonvanishing boundary conditions , 1992 .

[10]  Chao-Qing Dai,et al.  The management and containment of self-similar rogue waves in the inhomogeneous nonlinear Schrödinger equation , 2012 .

[11]  Yi-Tian Gao,et al.  Odd-Soliton-Like Solutions for the Variable-Coefficient Variant Boussinesq Model in the Long Gravity Waves , 2010 .

[12]  Vladimir V. Konotop,et al.  Randomly modulated dark soliton , 1991 .

[13]  Xiaoyong Wen Elastic Interaction and Conservation Laws for the Nonlinear Self-Dual Network Equation in Electric Circuit , 2012 .

[14]  M. Wadati,et al.  Relationships among Inverse Method, Bäcklund Transformation and an Infinite Number of Conservation Laws , 1975 .

[15]  F. Lederer,et al.  Approach to first-order exact solutions of the Ablowitz-Ladik equation. , 2011, Physical review. E, Statistical, nonlinear, and soft matter physics.

[16]  Xiaoyong Wen N-SOLITON SOLUTIONS AND CONSERVATION LAWS OF THE MODIFIED TODA LATTICE EQUATION , 2012 .

[17]  Bo Tian,et al.  Integrability aspects and soliton solutions for an inhomogeneous nonlinear system with symbolic computation , 2012 .

[18]  Yi-Tian Gao,et al.  N-fold Darboux transformation and solitonic interactions of a variable-coefficient generalized Boussinesq system in shallow water , 2011, Appl. Math. Comput..