Validity of Bogoliubov's approximation for translation-invariant Bose gases
Abstract
We verify Bogoliubov's approximation for translation invariant Bose gases in the mean field regime, i.e. we prove that the ground state energy EN is given by EN=NeH+∈f σ(H)+oN→ ∞(1), where N is the number of particles, eH is the minimal Hartree energy and H is the Bogoliubov Hamiltonian. As an intermediate result we show the existence of approximate ground states N, i.e. states satisfying HN_N=EN+oN→ ∞(1), exhibiting complete Bose--Einstein condensation with respect to one of the Hartree minimizers.
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