Local Uniqueness of Ground States for Rotating Bose-Einstein Condensates with Attractive Interactions

Abstract

We study ground states of two-dimensional Bose-Einstein condensates with attractive interactions in a trap V(x) rotating at the velocity . It is known that there exist a critical rotational velocity 0< *:=*(V)≤ ∞ and a critical number 0<a*<∞ such that for any rotational velocity 0 < *, ground states exist if and only if the coupling constant a satisfies a<a*. For a general class of traps V(x), which may not be symmetric, we prove in this paper that up to a constant phase, there exists a unique ground state as a a*, where ∈(0,*) is fixed. This result extends essentially our recent uniqueness result, where only the radially symmetric traps V(x) could be handled with.