Parametric instability of oscillations of a vortex ring in a z-periodic Bose-Einstein condensate and the recurrence to starting state

Abstract

The dynamics of deformations of a quantum vortex ring in a Bose-Einstein condensate with periodic equilibrium density (z)= 1-ε z has been considered within the local induction approximation. Parametric instabilities of the normal modes with azimuthal numbers m have been revealed at the energy integral E near values Em(p)=2mm2-1/p, where p is the resonance order. Numerical simulations have shown that already at ε 0.03 a rapid growth of unstable modes with m=2, p=1 to magnitudes of order of unity is typical, which is then followed, after a few large oscillations, by fast return to a weakly excited state. Such behavior corresponds to an integrable Hamiltonian of the form H σ(E2(1)-E)(|b+|2 + |b-|2) -ε(b+ b- + b+* b-*) +u(|b+|4 +|b-|4) + w |b+|2|b-|2 for two complex envelopes b(t). The results have been compared to parametric instabilities of vortex ring in condensate with density (z,r)=1-r2-α z2, which take place at α≈ 8/5 and at α≈ 16/7.