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Main Authors: Berthière, Clément, Gaudin, Paul
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2509.00593
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author Berthière, Clément
Gaudin, Paul
author_facet Berthière, Clément
Gaudin, Paul
contents Multi-invariants are local-unitary invariants of state replicas introduced as potential probes of multipartite entanglement and correlations in quantum many-body systems. In this paper, we investigate two multi-invariants for tripartite pure states, namely multientropy and dihedral invariant. We compute the (genuine) multientropy for Lifshitz groundstates, and obtain its analytical continuation to noninteger values of Rényi index. We show that the genuine multientropy can be expressed in terms of mutual information and logarithmic negativity, a relation that also holds for stabilizer states. For general tripartite pure states, we demonstrate that dihedral invariants are related to Rényi reflected entropies. In particular, we show that the dihedral permutations of replicas are equivalent to the reflected construction, or alternatively to the realignment of density matrices.
format Preprint
id arxiv_https___arxiv_org_abs_2509_00593
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Genuine multientropy, dihedral invariants and Lifshitz theory
Berthière, Clément
Gaudin, Paul
High Energy Physics - Theory
Strongly Correlated Electrons
Quantum Physics
Multi-invariants are local-unitary invariants of state replicas introduced as potential probes of multipartite entanglement and correlations in quantum many-body systems. In this paper, we investigate two multi-invariants for tripartite pure states, namely multientropy and dihedral invariant. We compute the (genuine) multientropy for Lifshitz groundstates, and obtain its analytical continuation to noninteger values of Rényi index. We show that the genuine multientropy can be expressed in terms of mutual information and logarithmic negativity, a relation that also holds for stabilizer states. For general tripartite pure states, we demonstrate that dihedral invariants are related to Rényi reflected entropies. In particular, we show that the dihedral permutations of replicas are equivalent to the reflected construction, or alternatively to the realignment of density matrices.
title Genuine multientropy, dihedral invariants and Lifshitz theory
topic High Energy Physics - Theory
Strongly Correlated Electrons
Quantum Physics
url https://arxiv.org/abs/2509.00593