Multicritical edge statistics for the momenta of fermions in non-harmonic traps

Abstract

We compute the joint statistics of the momenta pi of N non-interacting fermions in a trap, near the Fermi edge, with a particular focus on the largest one p. For a 1d harmonic trap, momenta and positions play a symmetric role and hence, the joint statistics of momenta is identical to that of the positions. In particular, p, as x, is distributed according to the Tracy-Widom distribution. Here we show that novel "momentum edge statistics" emerge when the curvature of the potential vanishes, i.e. for "flat traps" near their minimum, with V(x) x2n and n>1. These are based on generalisations of the Airy kernel that we obtain explicitly. The fluctuations of p are governed by new universal distributions determined from the n-th member of the second Painlev\'e hierarchy of non-linear differential equations, with connections to multicritical random matrix models. Finite temperature extensions and possible experimental signatures in cold atoms are discussed.