Title:
On the continuum limit of the entanglement Hamiltonian
Author(s):
Eisler, Viktor; Tonni, Erik; Peschel, Ingo
Year of publication:
2019
Available Date:
2020-07-27T09:02:17Z
Abstract:
We consider the entanglement Hamiltonian for an interval in a chain of free fermions in its ground state and show that the lattice expression goes over into the conformal one if one includes the hopping to distant neighbours in the continuum limit. For an infinite chain, this can be done analytically for arbitrary fillings and is shown to be the consequence of the particular structure of the entanglement Hamiltonian, while for finite rings or temperatures the result is based on numerical calculations.
Part of Identifier:
e-ISSN (online): 1742-5468
Keywords:
continuum limit
entanglement Hamiltonian
free fermions
DDC-Classification:
530 Physik
Publication Type:
Wissenschaftlicher Artikel
URL of the Original Publication:
DOI of the Original Publication:
Journaltitle:
Journal of statistical mechanics: theory and experiment
Department/institution:
Physik
