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Main Authors: Serrano-Ensástiga, Eduardo, Giraud, Olivier, Martin, John
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2507.12680
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author Serrano-Ensástiga, Eduardo
Giraud, Olivier
Martin, John
author_facet Serrano-Ensástiga, Eduardo
Giraud, Olivier
Martin, John
contents Multipartite quantum systems are subject to monogamy relations that impose fundamental constraints on the distribution of quantum correlations between subsystems. These constraints can be studied quantitatively through sector lengths, defined as the average value of $m$-body correlations, which have applications in quantum information theory and coding theory. In this work, we derive a set of monogamy inequalities that complement the shadow inequalities, enabling a complete characterization of the numerical range of sector lengths for systems with $N\leq 5$ qubits in a pure state. This range forms a convex polytope, facilitating the efficient extremization of key physical quantities, such as the linear entropy of entanglement and the quantum shadow enumerators, by a simple evaluation at the polytope vertices. For larger systems ($N\geq 6$), we highlight a significant increase in complexity that neither our inequalities nor the shadow inequalities can fully capture.
format Preprint
id arxiv_https___arxiv_org_abs_2507_12680
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Multiqubit monogamy relations beyond shadow inequalities
Serrano-Ensástiga, Eduardo
Giraud, Olivier
Martin, John
Quantum Physics
Multipartite quantum systems are subject to monogamy relations that impose fundamental constraints on the distribution of quantum correlations between subsystems. These constraints can be studied quantitatively through sector lengths, defined as the average value of $m$-body correlations, which have applications in quantum information theory and coding theory. In this work, we derive a set of monogamy inequalities that complement the shadow inequalities, enabling a complete characterization of the numerical range of sector lengths for systems with $N\leq 5$ qubits in a pure state. This range forms a convex polytope, facilitating the efficient extremization of key physical quantities, such as the linear entropy of entanglement and the quantum shadow enumerators, by a simple evaluation at the polytope vertices. For larger systems ($N\geq 6$), we highlight a significant increase in complexity that neither our inequalities nor the shadow inequalities can fully capture.
title Multiqubit monogamy relations beyond shadow inequalities
topic Quantum Physics
url https://arxiv.org/abs/2507.12680