Entanglement in Fermionic Chains and Bispectrality
Mathematical Physics
2021-08-25 v2 Statistical Mechanics
math.MP
Abstract
Entanglement in finite and semi-infinite free Fermionic chains is studied. A parallel is drawn with the analysis of time and band limiting in signal processing. It is shown that a tridiagonal matrix commuting with the entanglement Hamiltonian can be found using the algebraic Heun operator construct in instances when there is an underlying bispectral problem. Cases corresponding to the Lie algebras and as well as to the q-deformed algebra at a root of unity are presented.
Cite
@article{arxiv.2001.10576,
title = {Entanglement in Fermionic Chains and Bispectrality},
author = {Nicolas Crampé and Rafael I. Nepomechie and Luc Vinet},
journal= {arXiv preprint arXiv:2001.10576},
year = {2021}
}
Comments
21 pages; invited contribution to the Roman Jackiw 80th Birthday Festschrift (World Scientific, 2020); v2: minor changes