The Nonexistence of Vortices for Rotating Bose-Einstein Condensates with Attractive Interactions

Abstract

This article is devoted to studying the model of two-dimensional attractive Bose-Einstein condensates in a trap V(x) rotating at the velocity . This model can be described by the complex-valued Gross-Pitaevskii energy functional. It is shown that there exists a critical rotational velocity 0<*:=*(V)≤ ∞, depending on the general trap V(x), such that for any rotational velocity 0≤ < *, minimizers (i.e., ground states) exist if and only if a<a*=\|w\|22, where a>0 denotes the absolute product for the number of particles times the scattering length, and w>0 is the unique positive solution of w-w+w3=0 in R2. If V(x)=|x|2 and 0< <*(=2) is fixed, we prove that, up to a constant phase, all minimizers must be real-valued, unique and free of vortices as a a*, by analyzing the refined limit behavior of minimizers and employing the non-degenerancy of w.