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Autore principale: Hategan-Marandiuc, Mihael
Natura: Preprint
Pubblicazione: 2024
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Accesso online:https://arxiv.org/abs/2404.05851
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author Hategan-Marandiuc, Mihael
author_facet Hategan-Marandiuc, Mihael
contents Entanglement entropy, taken here to be geometric, requires a geometrically separable Hilbert space. In lattice gauge theories, it is not immediately clear if the physical Hilbert space is geometrically separable. In a previous paper we have shown that the physical Hilbert space in pure gauge abelian lattice theories exhibits some form of geometric scaling with the lattice volume, which suggest that the space is locally factorizable and, therefore, geometrically separable. In this paper, we provide strong evidence that indicates that this scaling is not present when the group is non-abelian. We do so by looking at the scaling of the dimension of the physical Hilbert space of theories with certain discrete groups. The lack of an appropriate scaling implies that the physical Hilbert space of such a theory does not admit a local factorization. We then extend the reasoning, as sensibly possible, to SU(2) and SU(N) to reach the same conclusion. Lastly, we show that the addition of matter fields to non-abelian lattice gauge theories makes the resulting physical Hilbert space locally factorizable.
format Preprint
id arxiv_https___arxiv_org_abs_2404_05851
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Entanglement entropy in lattices with non-abelian gauge groups
Hategan-Marandiuc, Mihael
High Energy Physics - Theory
High Energy Physics - Lattice
Entanglement entropy, taken here to be geometric, requires a geometrically separable Hilbert space. In lattice gauge theories, it is not immediately clear if the physical Hilbert space is geometrically separable. In a previous paper we have shown that the physical Hilbert space in pure gauge abelian lattice theories exhibits some form of geometric scaling with the lattice volume, which suggest that the space is locally factorizable and, therefore, geometrically separable. In this paper, we provide strong evidence that indicates that this scaling is not present when the group is non-abelian. We do so by looking at the scaling of the dimension of the physical Hilbert space of theories with certain discrete groups. The lack of an appropriate scaling implies that the physical Hilbert space of such a theory does not admit a local factorization. We then extend the reasoning, as sensibly possible, to SU(2) and SU(N) to reach the same conclusion. Lastly, we show that the addition of matter fields to non-abelian lattice gauge theories makes the resulting physical Hilbert space locally factorizable.
title Entanglement entropy in lattices with non-abelian gauge groups
topic High Energy Physics - Theory
High Energy Physics - Lattice
url https://arxiv.org/abs/2404.05851