Efimov effect in a D-dimensional Born-Oppenheimer approach

Abstract

We study a three-body system, formed by two identical heavy bosons and a light particle, in the Born-Oppenheimer approximation for an arbitrary dimension D. We restrict D to the interval 2\,<\,D\,<\,4, and derive the heavy-heavy D-dimensional effective potential proportional to 1/R2 (R is the relative distance between the heavy particles), which is responsible for the Efimov effect. We found that the Efimov states disappear once the critical strength of the heavy-heavy effective potential 1/R2 approaches the limit -(D-2)2/4. We obtained the scaling function for the 133Cs-133Cs-6Li system as the limit cycle of the correlation between the energies of two consecutive Efimov states as a function of D and the heavy-light binding energy ED2. In addition, we found that the energy of the (N+1) th excited state reaches the two-body continuum independently of the dimension D when ED2/E3(N)=0.89, where E3(N) is the N th excited three-body binding energy.