% Encoding: UTF-8
@COMMENT{BibTeX export based on data in FAU CRIS: https://cris.fau.de/}
@COMMENT{For any questions please write to cris-support@fau.de}
@article{faucris.263641451,
abstract = {A variation of the Zamolodchikov–Faddeev algebra over a finite-dimensional Hilbert space H and an involutive unitary R-Matrix S is studied. This algebra carries a natural vacuum state, and the corresponding Fock representation spaces FS(H) are shown to satisfy FS⊞R(H⊕ K) ≅ FS(H) ⊗ FR(K) , where S⊞ R is the box-sum of S (on H⊗ H) and R (on K⊗ K). This analysis generalises the well-known structure of Bose/Fermi Fock spaces and a recent result of Pennig. These representations are motivated from quantum field theory (short-distance scaling limits of integrable models).},
author = {Lechner, Gandalf and Scotford, Charley},
doi = {10.1007/s11005-020-01271-3},
faupublication = {no},
journal = {Letters in Mathematical Physics},
keywords = {Fock space; GNS construction; R-Matrices; Representation theory; Yang-Baxter; Zamolodchikov-Faddeev algebra},
note = {CRIS-Team Scopus Importer:2021-09-07},
pages = {1623-1643},
peerreviewed = {Yes},
title = {{Fock} representations of {ZF} algebras and {R}-matrices},
volume = {110},
year = {2020}
}