Free Energies of Dilute Bose gases: upper bound

Abstract

We derive a upper bound on the free energy of a Bose gas system at density and temperature T. In combination with the lower bound derived previously by Seiringer RS1, our result proves that in the low density limit, i.e., when a3 1, where a denotes the scattering length of the pair-interaction potential, the leading term of f the free energy difference per volume between interacting and ideal Bose gases is equal to 4π a (22-[-]2+). Here, (T) denotes the critical density for Bose-Einstein condensation (for the ideal gas), and [· ]+ = \·, 0\ denotes the positive part.