Bifurcations of multi-vortex configurations in rotating Bose--Einstein condensates

Abstract

We analyze global bifurcations along the family of radially symmetric vortices in the Gross--Pitaevskii equation with a symmetric harmonic potential and a chemical potential μ under the steady rotation with frequency . The families are constructed in the small-amplitude limit when the chemical potential μ is close to an eigenvalue of the Schr\"odinger operator for a quantum harmonic oscillator. We show that for near 0, the Hessian operator at the radially symmetric vortex of charge m0∈N has m0(m0+1)/2 pairs of negative eigenvalues. When the parameter is increased, 1+m0(m0-1)/2 global bifurcations happen. Each bifurcation results in the disappearance of a pair of negative eigenvalues in the Hessian operator at the radially symmetric vortex. The distributions of vortices in the bifurcating families are analyzed by using symmetries of the Gross--Pitaevskii equation and the zeros of Hermite--Gauss eigenfunctions. The vortex configurations that can be found in the bifurcating families are the asymmetric vortex (m0 = 1), the asymmetric vortex pair (m0 = 2), and the vortex polygons (m0 ≥ 2).