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Auteurs principaux: Yoshitome, Gustavo M., Casasola, Heitor, Corso, Rodrigo, Gomes, Pedro R. S.
Format: Preprint
Publié: 2025
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Accès en ligne:https://arxiv.org/abs/2506.10819
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author Yoshitome, Gustavo M.
Casasola, Heitor
Corso, Rodrigo
Gomes, Pedro R. S.
author_facet Yoshitome, Gustavo M.
Casasola, Heitor
Corso, Rodrigo
Gomes, Pedro R. S.
contents We study $\mathbb{Z}_2$ topological ordered phases in 2+1 dimensions characterized by generalized modulated symmetries. Such phases have explicit realizations in terms of fixed-point Hamiltonians involving commuting projectors with support $h=3,5,7,\ldots$ in the horizontal direction, which dictates the modulation of the generalized symmetries. These symmetries are sensitive to the lattice sizes. For certain sizes, they are spontaneously broken and the ground state is degenerated, while for the remaining ones, the symmetries are explicitly broken and the ground state is unique. The ground state dependence on the lattice sizes is a manifestation of the ultraviolet/infrared (UV/IR) mixing. The structure of the modulated symmetries implies that the anyons can move only in rigid steps of size $h$, leading to the notion of position-dependent anyons. The phases exhibit rich boundary physics with a variety of gapped phases, including trivial, partial and total symmetry-breaking, and SPT phases. Effective field theory descriptions are discussed, making transparent the relation between the generalized modulated symmetries and the restrictions on anyon mobility, incorporating the boundary physics in a natural way, and showing how the short-distance details can be incorporated into the continuum by means of twisted boundary conditions.
format Preprint
id arxiv_https___arxiv_org_abs_2506_10819
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Generalized Modulated Symmetries in $\mathbb{Z}_2$ Topological Ordered Phases
Yoshitome, Gustavo M.
Casasola, Heitor
Corso, Rodrigo
Gomes, Pedro R. S.
Strongly Correlated Electrons
High Energy Physics - Theory
We study $\mathbb{Z}_2$ topological ordered phases in 2+1 dimensions characterized by generalized modulated symmetries. Such phases have explicit realizations in terms of fixed-point Hamiltonians involving commuting projectors with support $h=3,5,7,\ldots$ in the horizontal direction, which dictates the modulation of the generalized symmetries. These symmetries are sensitive to the lattice sizes. For certain sizes, they are spontaneously broken and the ground state is degenerated, while for the remaining ones, the symmetries are explicitly broken and the ground state is unique. The ground state dependence on the lattice sizes is a manifestation of the ultraviolet/infrared (UV/IR) mixing. The structure of the modulated symmetries implies that the anyons can move only in rigid steps of size $h$, leading to the notion of position-dependent anyons. The phases exhibit rich boundary physics with a variety of gapped phases, including trivial, partial and total symmetry-breaking, and SPT phases. Effective field theory descriptions are discussed, making transparent the relation between the generalized modulated symmetries and the restrictions on anyon mobility, incorporating the boundary physics in a natural way, and showing how the short-distance details can be incorporated into the continuum by means of twisted boundary conditions.
title Generalized Modulated Symmetries in $\mathbb{Z}_2$ Topological Ordered Phases
topic Strongly Correlated Electrons
High Energy Physics - Theory
url https://arxiv.org/abs/2506.10819