Stability of a vortex in a small trapped Bose-Einstein condensate

Abstract

A second-order expansion of the Gross-Pitaevskii equation in the interaction parameter determines the thermodynamic critical angular velocity Omegac for the creation of a vortex in a small axisymmetric condensate. Similarly, a second-order expansion of the Bogoliubov equations determines the (negative) frequency omegaa of the anomalous mode. Although Omegac = -omegaa through first order, the second-order contributions ensure that the absolute value |omegaa| is always smaller than the critical angular velocity Omegac. With increasing external rotation Omega, the dynamical instability of the condensate with a vortex disappears at Omega*=|omegaa|, whereas the vortex state becomes energetically stable at the larger value Omegac. Both second-order contributions depend explicitly on the axial anisotropy of the trap. The appearance of a local minimum of the free energy for a vortex at the center determines the metastable angular velocity Omegam. A variational calculation yields Omegam=|ωa| to first order (hence Omegam also coincides with the critical angular velocity Omegac to this order). Qualitatively, the scenario for the onset of stability in the weak-coupling limit is the same as that found in the strong-coupling (Thomas-Fermi) limit.