Ground State and Excited States of a Confined Bose Gas

Abstract

The Bogoliubov approximation is used to study the ground state and low-lying excited states of a dilute gas of N atomic bosons held in an isotropic harmonic potential characterized by frequency ω and oscillator length d0. By assumption, the self-consistent condensate has a macroscopic occupation number N0 >> 1, with N-N0 << N0. For negative scattering length -|a|, a simple variational trial function yields an estimate for the critical condensate number N0\,c = (8π/255\,)1/2\,(d0/|a|) ≈ 0.671\,(d0/|a|) at the onset of collapse. For positive scattering length and large N0 >>d0/a, the spherical condensate has a well-defined radius R >> d0, and the low-lying excited states are compressional waves localized near the surface. The frequencies of the lowest radial modes (n = 0) for successive values of orbital angular momentum l form a rotational band ω0l ≈ ω00 + 1 2 l(l+1)\,ω\,(d0/R)2, with ω00 somewhat larger than ω.

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