Nonuniform Bose-Einstein condensate. II. Doubly coherent states

Abstract

We find stationary excited states of a one-dimensional system of N spinless point bosons with repulsive interaction and zero boundary conditions by numerically solving the time-independent Gross-Pitaevskii equation. The solutions are compared with the exact ones found in the Bethe-ansatz approach. We show that the jth stationary excited state of a nonuniform condensate of atoms corresponds to a Bethe-ansatz solution with the quantum numbers n1=n2=… =nN=j+1. On the other hand, such n1,…,nN correspond to a condensate of N elementary excitations (in the present case the latter are the Bogoliubov quasiparticles with the quasimomentum π j/L, where L is the system size). Thus, each stationary excited state of the condensate is ``doubly coherent'', since it corresponds simultaneously to a condensate of N atoms and a condensate of N elementary excitations. We find the energy E and the particle density profile (x) for such states. The possibility of experimental production of these states is also discussed.

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