English

Three-boson scattering hypervolume for a nonzero orbital angular momentum

Quantum Gases 2026-01-13 v2 Atomic Physics Quantum Physics

Abstract

We analyze the zero energy collision of three identical bosons in the same internal state with total orbital angular momentum L=2L=2, assuming short range interactions. By solving the Schr\"odinger equation asymptotically, we derive two expansions of the wave function when three bosons are far apart or a pair of bosons and the third boson are far apart. The scattering hypervolume DD is defined for this collision. Unlike the scattering hypervolume defined by one of us in 2008, whose dimension is length to the fourth power, the dimension of DD studied in the present paper is length to the eighth power. We then derive the expression of DD when the interaction potentials are weak, using the Born's expansion. We also calculate the energy shift of such three bosons with three different momenta k1\hbar \mathbf{k_{1}}, k2\hbar\mathbf{k_{2}} and k3\hbar\mathbf{k_{3}} in a large periodic box. The obtained energy shift depends on D(0)/Ω2D^{(0)}/\Omega^{2} and D/Ω2D/\Omega^{2}, where D(0)D^{(0)} is the three-body scattering hypervolume defined for the three-body L=0L=0 collision and Ω\Omega is the volume of the periodic box. We also calculate the contribution of DD to the three-body T-matrix element for low-energy collisions. We then calculate the shift of the energy and the three-body recombination rate due to D(0)D^{(0)} and DD in the dilute homogeneous Bose gas. The contribution to the three-body recombination rate constant from DD is proportional to T2T^2 if the temperature TT is much larger than the quantum degeneracy temperature but still much lower than the temperature scale at which the thermal de Broglie wave length becomes comparable to the physical range of interaction.

Keywords

Cite

@article{arxiv.2507.20787,
  title  = {Three-boson scattering hypervolume for a nonzero orbital angular momentum},
  author = {Pui In Ip and Shina Tan},
  journal= {arXiv preprint arXiv:2507.20787},
  year   = {2026}
}
R2 v1 2026-07-01T04:22:01.840Z