The Product Structure of Matrix Product States under Permutations

Marta Florido-Llinàs; Álvaro M. Alhambra; Rahul Trivedi; Norbert Schuch; David Pérez-García; J. Ignacio Cirac

doi:10.48550/arXiv.2410.19541

The Product Structure of Matrix Product States under Permutations

Marta Florido-Llinàs (Corresponding author)
, Álvaro M. Alhambra
, Rahul Trivedi
, Norbert Schuch
, David Pérez-García
, J. Ignacio Cirac

Publications: Contribution to journal › Article › Peer Reviewed

Abstract

Tensor network methods have proved to be highly effective in addressing a wide variety of physical scenarios, including those lacking an intrinsic one-dimensional geometry. In such contexts, it is possible for the problem to exhibit a weak form of permutational symmetry, in the sense that entanglement behaves similarly across any arbitrary bipartition. In this paper, we show that translationally-invariant (TI) matrix product states (MPSs) with this property are trivial, meaning that they are either product states or superpositions of a few of them. The results also apply to non-TI generic MPSs, as well as further relevant examples of MPSs including the 𝑊 state and the Dicke states in an approximate sense. Our findings motivate the usage of Ansätze simpler than tensor networks in systems whose structure is invariant under permutations.

Original language	English
Article number	040338
Number of pages	19
Journal	PRX Quantum
Volume	6
Issue number	4
Early online date	25 Oct 2024
DOIs	https://doi.org/10.48550/arXiv.2410.19541 https://doi.org/10.1103/8sbs-t24w
Publication status	Published - 17 Nov 2025

Austrian Fields of Science 2012

103025 Quantum mechanics
103036 Theoretical physics
101028 Mathematical modelling

Keywords

quant-ph
cond-mat.str-el
math-ph
math.MP

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10.48550/arXiv.2410.19541Licence: Other
10.1103/8sbs-t24wLicence: CC BY 4.0

1 Finished
3 Active

quantA: Quantum Science Austria
Aspelmeyer, M. (Project Lead), Arndt, M. (Co-Lead), Brukner, C. (Co-Lead), Schuch, N. (Co-Lead), Walther, P. (Co-Lead) & Nunnenkamp, A. (Co-Lead)
1/10/23 → 30/09/28
Project: Research funding
SEQUAM: Symmetries and Entanglement in Quantum Matter
Schuch, N. (Project Lead)
1/10/20 → 30/09/26
Project: Research funding
Beyond C: Quantum Information Systems Beyond Classical Capabilities
Walther, P. (Project Lead), Brukner, C. (Co-Lead), Briegel, H.-J. (Co-Lead), Kirchmair, G. (Co-Lead), Kraus, B. (Co-Lead), Lechner, W. (Co-Lead), Monz, T. (Co-Lead), Weihs, G. (Co-Lead), Roos, C. (Co-Lead), Cirac, J. I. (Co-Lead), Fink, J. (Co-Lead), Paulovics, V. (Admin), Dakic, B. (Co-Lead) & Schuch, N. (Co-Lead)
1/03/19 → 31/08/27
Project: Research funding

Cite this

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abstract = "Tensor network methods have proved to be highly effective in addressing a wide variety of physical scenarios, including those lacking an intrinsic one-dimensional geometry. In such contexts, it is possible for the problem to exhibit a weak form of permutational symmetry, in the sense that entanglement behaves similarly across any arbitrary bipartition. In this paper, we show that translationally-invariant (TI) matrix product states (MPSs) with this property are trivial, meaning that they are either product states or superpositions of a few of them. The results also apply to non-TI generic MPSs, as well as further relevant examples of MPSs including the 𝑊 state and the Dicke states in an approximate sense. Our findings motivate the usage of Ans{\"a}tze simpler than tensor networks in systems whose structure is invariant under permutations.",

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AU - Pérez-García, David

AU - Cirac, J. Ignacio

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The Product Structure of Matrix Product States under Permutations

Abstract

Austrian Fields of Science 2012

Keywords

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Projects

quantA: Quantum Science Austria

SEQUAM: Symmetries and Entanglement in Quantum Matter

Beyond C: Quantum Information Systems Beyond Classical Capabilities

Cite this