Solutions of Gross-Pitaevskii Equation with Periodic Potential in Dimension Two
Abstract
Quasi-periodic solutions of a nonlinear polyharmonic equation for the case 4l>n+1 in n, n>1, are studied. This includes Gross-Pitaevskii equation in dimension two (l=1,n=2). It is proven that there is an extensive "non-resonant" set G⊂ n such that for every k∈ G there is a solution asymptotically close to a plane wave Aei k, x as | k| ∞ , given A is sufficiently small.
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