Abstract
We present a rigorous study of momentum distribution and p-wave contacts of one-dimensional spinless Fermi gases with an attractive p-wave interaction. Using the Bethe ansatz wave function, we calculate analytically the high-momentum tail and show that the leading (∼1/p2) and sub-leading terms (∼1/p4) are determined by two contacts C2 and C4, which are related to the short-distance behavior of the two-body density matrix and its derivatives. As one increases the one-dimensional scattering length, the contact C2 increases monotonically from zero while C4 exhibits a peak at finite scattering length. In addition, we obtain analytic expressions for p-wave contacts at finite temperature from the thermodynamic Bethe ansatz equations for both weak and strong attractive interactions.
Original language | English |
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Article number | 023605 |
Journal | Physical Review A |
Volume | 98 |
Issue number | 2 |
DOIs | |
Publication status | Published - 7 Aug 2018 |