Entanglement gap, corners, and symmetry breaking

Abstract

We investigate the finite-size scaling of the lowest entanglement gap δ in the ordered phase of the two-dimensional quantum spherical model (QSM). The entanglement gap decays as δ=/L(L). This is in contrast with the purely logarithmic behaviour as δ=π2/(L) at the critical point. The faster decay in the ordered phase reflects the presence of magnetic order. We analytically determine the constant , which depends on the low-energy part of the model dispersion and on the geometry of the bipartition. In particular, we are able to compute the corner contribution to , at least for the case of a square corner.