A Gap Between the Hypergraph and Stabilizer Entropy Cones
Abstract
It was recently found that the stabilizer and hypergraph entropy cones coincide for four parties, leading to a conjecture of their equivalence at higher party numbers. In this note, we show this conjecture to be false by proving new inequalities obeyed by all hypergraph entropy vectors that exclude particular stabilizer states on six qubits. By further leveraging this connection, we improve the characterization of stabilizer entropies and show that all linear rank inequalities at five parties, except for classical monotonicity, form facets of the stabilizer cone. Additionally, by studying minimum cuts on hypergraphs, we prove some structural properties of hypergraph representations of entanglement and generalize the notion of entanglement wedge nesting in holography.
Cite
@article{arxiv.2006.16292,
title = {A Gap Between the Hypergraph and Stabilizer Entropy Cones},
author = {Ning Bao and Newton Cheng and Sergio Hernández-Cuenca and Vincent Paul Su},
journal= {arXiv preprint arXiv:2006.16292},
year = {2021}
}
Comments
16 pages, 1 figure; more discussion of previous work, updated references, inclusion of appendix with explicit contraction map