The many levels pairing Hamiltonian for two pairs
Abstract
We address the problem of two pairs of fermions living on an arbitrary number of single particle levels of a potential well (mean field) and interacting through a pairing force. The associated solutions of the Richardson's equations are classified in terms of a number vl, which reduces to the seniority v in the limit of large values of the pairing strength G and yields the number of pairs not developing a collective behaviour, their energy remaining finite in the G∞ limit. We express analytically, through the moments of the single particle levels distribution, the collective mode energy and the two critical values G cr+ and G cr- of the coupling which can exist on a single particle level with no pair degeneracy. Notably G cr+ and G cr- merge when the number of single particle levels goes to infinity, where they coincide with the G cr (when it exists) of a one pair system, not envisioned by the Richardson theory. In correspondence of G cr the system undergoes a transition from a mean field to a pairing dominated regime. We finally explore the behaviour of the excitation energies, wave functions and pair transfer amplitudes finding out that the former, for G>G cr-, come close to the BCS predictions, whereas the latter display a divergence at G cr, signaling the onset of a long range off-diagonal order in the system.
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