Wigner negativity in spin-$j$ systems
Abstract
The nonclassicality of simple spin systems as measured by Wigner negativity is studied on a spherical phase space. Several SU(2)-covariant states with common qubit representations are addressed: spin coherent, spin cat (GHZ/N00N), and Dicke (). We derive a bound on the Wigner negativity of spin cat states that rapidly approaches the true value as spin increases beyond . We find that spin cat states are not significantly Wigner-negative relative to their Dicke state counterparts of equal dimension. We also find, in contrast to several entanglement measures, that the most Wigner-negative Dicke basis element is spin-dependent, and not the equatorial state (or for half-integer spins). These results underscore the influence that dynamical symmetry has on nonclassicality, and suggest a guiding perspective for finding novel quantum computational applications.
Keywords
Cite
@article{arxiv.2008.10167,
title = {Wigner negativity in spin-$j$ systems},
author = {Jack Davis and Meenu Kumari and Robert B. Mann and Shohini Ghose},
journal= {arXiv preprint arXiv:2008.10167},
year = {2021}
}
Comments
11 pages, 7 figures