Nature of the Bogoliubov ground state of a weakly interacting Bose gas
Abstract
As is well-known, in Bogoliubov's theory of an interacting Bose gas the ground state of the Hamiltonian H=Σ k≠ 0H k is found by diagonalizing each of the Hamiltonians H k corresponding to a given momentum mode k independently of the Hamiltonians H k'(≠ k) of the remaining modes. We argue that this way of diagonalizing H may not be adequate, since the Hilbert spaces where the single-mode Hamiltonians H k are diagonalized are not disjoint, but have the k=0 in common. A number-conserving generalization of Bogoliubov's method is presented where the total Hamiltonian H is diagonalized directly. When this is done, the spectrum of excitations changes from a gapless one, as predicted by Bogoliubov's method, to one which has a finite gap in the k 0 limit.
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