Bose--Einstein condensation in the Luttinger--Sy model with contact interaction

Abstract

We study bosons on the real line in a Poisson random potential (Luttinger--Sy model) with contact interaction in the thermodynamic limit at absolute zero temperature. We prove that generalized Bose--Einstein condensation (BEC) occurs almost surely if the intensity N of the Poisson potential satisfies [ (N)]4/N1 - 2η N 1 for arbitrary 0 < η ≤ 1/3. We also show that the contact interaction alters the type of condensation, going from a type-I BEC to a type-III BEC as the strength of this interaction is increased. Furthermore, for sufficiently strong contact interactions and 0 < η < 1/6 we prove that the mean particle density in the largest interval is almost surely bounded asymptotically by NN3/5+δ for δ > 0.