Universal Bose Gases Near Resonance: A Rigorous Solution
arXiv:1307.4263 · doi:10.1103/PhysRevA.89.033614
Abstract
We obtain a rigorous solution of universal Bose gases near resonance and offer an answer to one of the long-standing challenges of quantum gases at large scattering lengths, where the standard dilute theory breaks down. The solution was obtained by using an $ε$ expansion near four spatial dimension. In dimension $d = 4 - ε$, the chemical potential of Bose gases near resonances is shown to approach the universal value $ε^{(2/(4-ε))} ε_F \sqrt{2/3} (1 + 0.474 ε- i 1.217 ε+ ...)$, where $ε_F$ is the Fermi energy defined for a Fermi gas of density $n$, and the condensation fraction is equal to $2/3 (1 + 0.0877 ε+ ...)$. We also discuss the implications on ultra-cold gases in physical dimensions.
5 pages, 1 figure