K. Ziegler
Published 2001-08-02, updated 2001-10-23Version 2
A grand canonical system of hard-core bosons in an optical lattice is considered. The bosons can occupy randomly $N$ equivalent states at each lattice site. The limit $N\to\infty$ is solved exactly in terms of a saddle-point integration, representing a weakly-interacting Bose gas. At T=0 there is only a condensate in the limit $N\to\infty$. Corrections in 1/N increase the total density of bosons but suppress the condensate. This indicates a depletion of the condensate due to increasing interaction at finite values of N.
Comments: 14 pages, 1 figure
Journal: Journ. Low Temp. Phys. 126, 1431 (2002)
Probing the energy bands of a Bose-Einstein condensate in an optical lattice
Feshbach resonances in an optical lattice
Density wave and supersolid phases of correlated bosons in an optical lattice
