Concavity of the collective excitation branch of a Fermi gas in the BEC-BCS crossover

Abstract

We study the concavity of the dispersion relation q ω\q of the bosonic excitations of a three-dimensional spin-1/2 Fermi gas in the Random Phase Approximation (RPA). In the limit of small wave numbers q we obtain analytically the spectrum up to order 5 in q. In the neighborhood of q=0, a change in concavity between the convex BEC limit and the concave BCS limit takes place at /μ0.869 [1/(k\F a)-0.144], where a is the scattering length between opposite spin fermions, k\F is the Fermi wave number and the gap according to BCS theory, and μ is the chemical potential. At that point the branch is concave due to a negative fifth-order term. Our results are supplemented by a numerical study which shows the evolution of the border between the zone of the (q,) plane where q ω\q is concave and the zone where it is convex.