Scaling of Entanglement Entropy in Point Contact Free Fermion Systems

Abstract

The scaling of entanglement entropy is computationally studied in several 1 d 2 dimensional free fermion systems that are connected by one or more point contacts (PC). For both the k-leg Bethe lattice (d =1) and d=2 rectangular lattices with a subsystem of Ld sites, the entanglement entropy associated with a single PC is found to be generically S L. We argue that the O(L) entropy is an expression of the subdominant O(L) entropy of the bulk entropy-area law. For d=2 (square) lattices connected by m PCs, the area law is found to be S aLd-1 + b m L and is thus consistent with the anomalous area law for free fermions (S L L) as m → L. For the Bethe lattice, the relevance of this result to Density Matrix Renormalization Group (DMRG) schemes for interacting fermions is discussed.