Instability of vortex solitons for 2D focusing NLS
Abstract
We study instability of a vortex soliton ei(mθ+ω t)φω,m(r) to iut+ u+|u|p-1u=0, x∈n, t>0, where n=2, m∈ and (r,θ) are polar coordinates in 2. Grillakis Gr proved that every radially standing wave solutions are unstable if p>1+4/n. However, we do not have any examples of unstable standing wave solutions in the subcritical case (p<1+n/4). Suppose φω,m is nonnegative. We investigate a limiting profile of φω,m as m∞ and prove that for every p>1, there exists an m*∈ such that for m m*, a vortex soliton ei(mθ+ω t)φω,m(r) becomes unstable to the perturbations of the form ei(m+j)θv(r) with 1 j m.
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