Transverse stability of line soliton and characterization of ground state for wave guide Schr\"odinger equations
Abstract
In this paper, we study the transverse stability of the line Schr\"odinger soliton under a full wave guide Schr\"odinger flow on a cylindrical domain R× T. When the nonlinearity is of power type ||p-1 with p>1, we show that there exists a critical frequency ωp >0 such that the line standing wave is stable for 0<ω < ωp and unstable for ω > ωp. Furthermore, we characterize the ground state of the wave guide Schr\"odinger equation. More precisely, we prove that there exists ω* ∈ (0, ωp] such that the ground states coincide with the line standing waves for ω ∈ (0, ω*] and are different from the line standing waves for ω ∈ (ω*, ∞).
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