Ground States of Attractive Bose Gases in Rotating Anharmonic Traps

Abstract

This paper is concerned with ground states of attractive Bose gases confined in an anharmonic trap V(x)=ω(|x|2+k|x|4) rotating at the velocity >0, where ω>0 denotes the trapping frequency, and k>0 represents the strength of the quartic term. It is known that for any >0, ground states exist in such traps if and only if 0<a<a*, where a*:=\|Q\|22 and Q>0 is the unique positive solution of Q-Q+Q3=0 in R2. By analyzing the refined energies and expansions of ground states, we prove that there exists a constant C>0, independent of 0<a<a*, such that ground states do not have any vortex in the region R(a):=\x∈R2:\, |x|≤ C(a*-a)-1-6β20\ as a a*, for the case where ω=324, k=16, and =C0(a*-a)-β varies for some β∈ [0,16) and C0>0.