Soliton dynamics of a discrete integrable Ablowitz–Ladik equation for some electrical and optical systems
0103 physical sciences
01 natural sciences
DOI:
10.1016/j.aml.2014.03.017
Publication Date:
2014-04-19T19:46:13Z
AUTHORS (5)
ABSTRACT
Abstract Under investigation in this paper is a discrete integrable Ablowitz–Ladik equation, which has certain applications in the electrical and optical systems. Via the Hirota method and symbolic computation, the bilinear forms and N -bright soliton solutions are obtained. Propagation and interaction behaviors of the discrete solitons are analyzed through the one- and two-soliton solutions. The discreteness effects on soliton and soliton interaction are discussed. Asymptotic analysis shows that the interactions between two solitons are elastic. Head-on and overtaking interactions can be obtained with the choices of the directions of the velocities. Two kinds of overtaking interactions are investigated analytically and graphically, respectively.
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