Existence and Asymptotic Behavior of Ground States for Rotating Bose-Einstein Condensates

Abstract

We study ground states of two-dimensional Bose-Einstein condensates with repulsive (a>0) or attractive (a<0) interactions in a trap V (x) rotating at the velocity . It is known that there exist critical parameters a*>0 and *:=*(V(x))>0 such that if >*, then there is no ground state for any a∈; if 0 < *, then ground states exist if and only if a∈(-a*,+∞). As a completion of the existing results, in this paper, we focus on the critical case where 0<=*<+∞ and classify the existence and nonexistence of ground states for a∈. Moreover, for a suitable class of radially symmetric traps V(x), employing the inductive symmetry method, we prove that up to a constant phase, the ground states must be real-valued, unique and free of vortices as 0, no matter whether the interactions of the condensates are repulsive or not.

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