Ground States of Two-Component Attractive Bose-Einstein Condensates I: Existence and Uniqueness

Abstract

We study ground states of two-component Bose-Einstein condensates (BEC) with trapping potentials in R2, where the intraspecies interaction (-a1,-a2) and the interspecies interaction -β are both attractive, i.e, a1, a2 and β are all positive. The existence and non-existence of ground states are classified completely by investigating equivalently the associated L2-critical constraint variational problem. The uniqueness and symmetry-breaking of ground states are also analyzed under different types of trapping potentials as β β *=a*+(a*-a1)(a*-a2), where 0<ai<a*:=\|w\|22 (i=1,2) is fixed and w is the unique positive solution of w-w+w3=0 in R2. The semi-trivial limit behavior of ground states is tackled in the companion paper [12].