Subarea law of entanglement in nodal fermionic systems
Strongly Correlated Electrons
2008-09-24 v2 Statistical Mechanics
Quantum Physics
Abstract
We investigate the subarea law scaling properties of the block entropy in bipartite fermionic systems which do not have a finite Fermi surface. It is found that in gapped regimes the leading subarea term is a negative constant, whereas in critical regimes with point nodes the leading subarea law is a logarithmic additive term. At the phase boundary that separates the critical and non-critical regimes, the subarea scaling shows power-law behavior.
Keywords
Cite
@article{arxiv.0801.0713,
title = {Subarea law of entanglement in nodal fermionic systems},
author = {Letian Ding and Noah Bray-Ali and Rong Yu and Stephan Haas},
journal= {arXiv preprint arXiv:0801.0713},
year = {2008}
}
Comments
4 pages,4 figures; published version