关键词: Tan's Contact, Gaudin—Yang model, Bethe ansatz

Abstract: Tan's contact $\mathcal{C}$ is an important quantity measuring the two-body correlations at short distances in a dilute system. Here we make use of the technique of exactly solved models to study the thermal-contact capacity $\mathcal{K}_{\scriptscriptstyle{\rm T}}$, i.e., the derivative of $\mathcal{C}$ with respect to temperature in the attractive Gaudin—Yang model. It is found that $\mathcal{K}_{\scriptscriptstyle{\rm T}}$ is useful in identifying the low temperature phase diagram, and using the obtained analytical expression of $\mathcal{K}_{\scriptscriptstyle{\rm T}}$, we study its critical behavior and the scaling law. Especially, we show $\mathcal{K}_{\scriptscriptstyle{\rm T}}$ versus temperature and thus the non-monotonic tendency of $\mathcal{C}$ in a tiny interval, for both spin-balanced and imbalanced phases. Such a phenomenon is merely observed in multi-component systems such as $SU(2)$ Fermi gases and spinor bosons, indicating the crossover from the Tomonaga—Luttinger liquid to the spin-coherent liquid.

Key words: Tan's Contact, Gaudin—Yang model, Bethe ansatz