Asymptotics of the finite-temperature sine kernel determinant

Abstract

In the present paper, we study the asymptotics of the Fredholm determinant D(x,s) of the finite-temperature deformation of the sine kernel, which represents the probability that there is no particles on the interval (-x/π,x/π) in the bulk scaling limit of the finite-temperature fermion system. The variable s in D(x,s) is related to the temperature. The determinant also corresponds to the finite-temperature correlation function of one dimensional Bose gas. We derive the asymptotics of D(x,s) in several different regimes in the (x,s)-plane. A third-order phase transition is observed in the asymptotic expansions as both x and s tend to positive infinity at certain related speed. The phase transition is then shown to be described by an integral involving the Hastings-McLeod solution of the second Painlev\'e equation.