Nonlinear modes for the Gross-Pitaevskii equation -- demonstrative computation approach
Abstract
A method for the study of steady-state nonlinear modes for Gross-Pitaevskii equation (GPE) is described. It is based on exact statement about coding of the steady-state solutions of GPE which vanish as x+∞ by reals. This allows to fulfill demonstrative computation of nonlinear modes of GPE i.e. the computation which allows to guarantee that all nonlinear modes within a given range of parameters have been found. The method has been applied to GPE with quadratic and double-well potential, for both, repulsive and attractive nonlinearities. The bifurcation diagrams of nonlinear modes in these cases are represented. The stability of these modes has been discussed.
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