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Paper detail

Variational approximations in discrete nonlinear Schrödinger equations with next-nearest-neighbor couplings

Solitons of a discrete nonlinear Schrödinger equation which includes the next-nearest-neighbor interactions are studied by means of a variational approximation and numerical computations. A large family of multi-humped solutions, including those with a nontrivial phase structure which are a feature particular to the next-nearest-neighbor interaction model, are accurately predicted by the variational approximation. Bifurcations linking solutions with the trivial and nontrivial phase structures are also captured remarkably well, including a prediction of critical parameter values.

preprint2011arXivOpen access
C. ChongR. Carretero-GonzálezB. A. MalomedP. G. Kevrekidis
nlin.PS
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C. ChongR. Carretero-GonzálezB. A. MalomedP. G. Kevrekidis

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