Local Uniqueness and Refined Spike Profiles of Ground States for Two-Dimensional Attractive Bose-Einstein Condensates

Abstract

We consider ground states of two-dimensional Bose-Einstein condensates in a trap with attractive interactions, which can be described equivalently by positive minimizers of the L2-critical constraint Gross-Pitaevskii energy functional. It is known that ground states exist if and only if a< a*:= \|w\|22, where a denotes the interaction strength and w is the unique positive solution of w-w+w3=0 in R2. In this paper, we prove the local uniqueness and refined spike profiles of ground states as a a*, provided that the trapping potential h(x) is homogeneous and H(y)=∫R2 h(x+y)w2(x)dx admits a unique and non-degenerate critical point.