Litcius/Paper detail

The quantum entropy cone of hypergraphs

Ning Bao, Newton Cheng, Sergio Hernández-Cuenca, Vincent P. Su

2020SciPost Physics26 citationsDOIOpen Access PDF

Abstract

In this work, we generalize the graph-theoretic techniques used for the holographic entropy cone to study hypergraphs and their analogously-defined entropy cone. This allows us to develop a framework to efficiently compute entropies and prove inequalities satisfied by hypergraphs. In doing so, we discover a class of quantum entropy vectors which reach beyond those of holographic states and obey constraints intimately related to the ones obeyed by stabilizer states and linear ranks. We show that, at least up to 4 parties, the hypergraph cone is identical to the stabilizer entropy cone, thus demonstrating that the hypergraph framework is broadly applicable to the study of entanglement entropy. We conjecture that this equality continues to hold for higher party numbers and report on partial progress on this direction. To physically motivate this conjectured equivalence, we also propose a plausible method inspired by tensor networks to construct a quantum state from a given hypergraph such that their entropy vectors match.

Topics & Concepts

HypergraphQuantum entanglementMathematicsQuantum relative entropyEntropy (arrow of time)ConjectureGeneralized relative entropyJoint quantum entropyQuantumQuantum stateRényi entropyDiscrete mathematicsPure mathematicsCombinatoricsConditional entropyQuantum informationState (computer science)SigmaVon Neumann entropyTensor productClass (philosophy)Cone (formal languages)Statistical physicsHolographyQuantum many-body systemsQuantum Information and CryptographyQuantum Computing Algorithms and Architecture