Three two-component fermions with contact interactions: correct formulation and energy spectrum

Abstract

Properties of two identical particles of mass m and a distinct particle of mass m1 in the universal low-energy limit of zero-range two-body interaction are studied in different sectors of total angular momentum L and parity P. For the unambiguous formulation of the problem in the interval μr(LP) < m/m1 μc(LP) (μr(1-) ≈ 8.619 and μc(1-) ≈ 13.607, μr(2+) ≈ 32.948 and μc(2+) ≈ 38.630,~etc.) in each LP sector an additional parameter b determining the wave function near the triple-collision point is introduced; thus, a one-parameter family of self-adjoint Hamiltonians is defined. Within the framework of this formulation, dependence of the bound-state energies on m/m1 and b in the sector of angular momentum and parity LP is calculated for L 5 and analysed with the aid of a simple model. A number of the bound states for each LP sector is analysed and presented in the form of `phase diagrams' in the plane of two parameters m/m1 and b.