Higher order terms in the condensate fraction of a homogeneous and dilute Bose gas

Abstract

The condensate fraction of a homogeneous and dilute Bose gas is expanded as a power series of n a3 as N0/N = 1 -c1 (n a3)1/2 -c2 (n a3) - c3 (n a3)3/2. The coefficient c1 is well-known as 8/3 π, but the others are unknown yet. Considering two-body contact interactions and applying a canonical transformation method twice we developed the method to obtain the higher order coefficients analytically. An iteration method is applied to make up a cutoff in a fluctuation term. The coefficients ares c2=2(π - 8/3) and c3=(4/π) (π -8/3)(10/3-π).