A new class of Traveling Solitons for cubic Fractional Nonlinear Schrodinger equations
Abstract
We consider the one-dimensional cubic fractional nonlinear Schr\"odinger equation i∂tu-(-)σ u+|u|2u=0, where σ ∈ (12,1) and the operator (-)σ is the fractional Laplacian of symbol ||2σ. Despite of lack of any Galilean-type invariance, we construct a new class of traveling soliton solutions of the form u(t,x)=e-it(|k|2σ-ω2σ)Qω,k(x-2tσ|k|2σ-2k), k∈R,\ ω>0 by a rather involved variational argument.
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