Entanglement Entropy and Full Counting Statistics for 2d-Rotating Trapped Fermions

Abstract

We consider N non-interacting fermions in a 2d harmonic potential of trapping frequency ω and in a rotating frame at angular frequency , with 0<ω - ω. At zero temperature, the fermions are in the non-degenerate lowest Landau level and their positions are in one to one correspondence with the eigenvalues of an N× N complex Ginibre matrix. For large N, the fermion density is uniform over the disk of radius N centered at the origin and vanishes outside this disk. We compute exactly, for any finite N, the R\'enyi entanglement entropy of order q, Sq(N,r), as well as the cumulants of order p, Nrpc, of the number of fermions Nr in a disk of radius r centered at the origin. For N 1, in the (extended) bulk, i.e., for 0 < r/N < 1, we show that Sq(N,r) is proportional to the number variance Var\,(Nr), despite the non-Gaussian fluctuations of Nr. This relation breaks down at the edge of the fermion density, for r ≈ N, where we show analytically that Sq(N,r) and Var\,(Nr) have a different r-dependence.