Entanglement entropy of fermions in any dimension and the Widom conjecture
arXiv:quant-ph/0504151 · doi:10.1103/PhysRevLett.96.100503
Abstract
We show that entanglement entropy of free fermions scales faster then area law, as opposed to the scaling $L^{d-1}$ for the harmonic lattice, for example. We also suggest and provide evidence in support of an explicit formula for the entanglement entropy of free fermions in any dimension $d$, $S\sim c(\partialÎ,\partialΩ)\cdot L^{d-1}\log L$ as the size of a subsystem $L\to\infty$, where $\partialÎ$ is the Fermi surface and $\partialΩ$ is the boundary of the region in real space. The expression for the constant $c(\partialÎ,\partialΩ)$ is based on a conjecture due to H. Widom. We prove that a similar expression holds for the particle number fluctuations and use it to prove a two sided estimates on the entropy $S$.
Final version