Nonlinear Schr\"odinger lattices I: Stability of discrete solitons
Abstract
We consider the discrete solitons bifurcating from the anti-continuum limit of the discrete nonlinear Schr\"odinger (NLS) lattice. The discrete soliton in the anti-continuum limit represents an arbitrary finite superposition of in-phase or anti-phase excited nodes, separated by an arbitrary sequence of empty nodes. By using stability analysis, we prove that the discrete solitons are all unstable near the anti-continuum limit, except for the solitons, which consist of alternating anti-phase excited nodes. We classify analytically and confirm numerically the number of unstable eigenvalues associated with each family of the discrete solitons.
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