Reentrant stability of BEC standing wave patterns

TL;DR

This paper investigates the stability of standing wave patterns in a Bose-Einstein Condensate induced by an external potential, revealing a reentrant stability phenomenon as the potential depth varies.

Contribution

It introduces the concept of reentrant dynamical stability in BEC standing waves and analyzes their stability across different potential depths and configurations.

Findings

Stable and unstable regimes identified for BEC standing waves.

Reentrant stability phenomenon observed as potential depth varies.

General trends applicable in multiple dimensions and potential types.

Abstract

We describe standing wave patterns induced by an attractive finite-ranged external potential inside a large Bose-Einstein Condensate (BEC). As the potential depth increases, the time independent Gross-Pitaevskii equation develops pairs of solutions that have nodes in their wavefunction. We elucidate the nature of these states and study their dynamical stability. Although we study the problem in a two-dimensional BEC subject to a cylindrically symmetric square-well potential of a radius that is comparable to the coherence length of the BEC, our analysis reveals general trends, valid in two and three dimensions, independent of the symmetry of the localized potential well, and suggestive of the behavior in general, short- and large-range potentials. One set of nodal BEC wavefunctions resembles the single particle n node bound state wavefunction of the potential well, the other wavefunctions resemble the n-1 node bound-state wavefunction with a kink state pinned by the potential. The second state, though corresponding to the lower free energy value of the pair of n node BEC states, is always unstable, whereas the first can be dynamically stable in intervals of the potential well depth, implying that the standing wave BEC can evolve from a dynamically unstable to stable, and back to unstable status as the potential well is adiabatically deepened, a phenomenon that we refer to as "reentrant dynamical stability".