Reduced density matrices and entanglement entropy in free lattice models
Abstract
We review the properties of reduced density matrices for free fermionic or bosonic many-particle systems in their ground state. Their basic feature is that they have a thermal form and thus lead to a quasi-thermodynamic problem with a certain free-particle Hamiltonian. We discuss the derivation of this result, the character of the Hamiltonian and its eigenstates, the single-particle spectra and the full spectra, the resulting entanglement and in particular the entanglement entropy. This is done for various one- and two-dimensional situations, including also the evolution after global or local quenches.
Cite
@article{arxiv.0906.1663,
title = {Reduced density matrices and entanglement entropy in free lattice models},
author = {Ingo Peschel and Viktor Eisler},
journal= {arXiv preprint arXiv:0906.1663},
year = {2015}
}
Comments
33 pages, 18 figures, minor changes, references added. Review article for the special issue "Entanglement entropy in extended systems" in J. Phys. A