Unitarity potentials and neutron matter at the unitary limit

Abstract

We study the equation of state of neutron matter using a family of unitarity potentials all of which are constructed to have infinite 1S0 scattering lengths as. For such system, a quantity of much interest is the ratio =E0/E0free where E0 is the true ground-state energy of the system, and E0free is that for the non-interacting system. In the limit of as ∞, often referred to as the unitary limit, this ratio is expected to approach a universal constant, namely 0.44(1). In the present work we calculate this ratio using a family of hard-core square-well potentials whose as can be exactly obtained, thus enabling us to have many potentials of different ranges and strengths, all with infinite as. We have also calculated using a unitarity CDBonn potential obtained by slightly scaling its meson parameters. The ratios given by these different unitarity potentials are all close to each other and also remarkably close to 0.44, suggesting that the above ratio is indifferent to the details of the underlying interactions as long as they have infinite scattering length. A sum-rule and scaling constraint for the renormalized low-momentum interaction in neutron matter at the unitary limit is discussed.