Motion and Stability Properties of Solitons in Discrete Dissipative Structures
The discrete complex Ginzburg-Landau (dCGL) equation describes solitons in multiple waveguide structures. We study, numerically, its soliton solutions. We compare stability, translational invariance and motion properties for various cases, including the Ablowitz-Ladik chain, the cubic and two forms of quintic dCGLE.
|Collections||ANU Research Publications|
|Source:||Physics Letters A|
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