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Main Authors: Paz, Laura Gómez, Schirmann, Justin, Chaou, Adam Yanis, Day, Isidora Araya, Grushin, Adolfo G.
Format: Preprint
Published: 2026
Subjects:
Online Access:https://arxiv.org/abs/2603.02167
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author Paz, Laura Gómez
Schirmann, Justin
Chaou, Adam Yanis
Day, Isidora Araya
Grushin, Adolfo G.
author_facet Paz, Laura Gómez
Schirmann, Justin
Chaou, Adam Yanis
Day, Isidora Araya
Grushin, Adolfo G.
contents Gyromorphs are a new class of disordered systems that combine an amorphous-like absence of translational order with quasi-long-range rotational order. Gyromorphs can outperform quasicrystals or hyperuniform arrangements in forming isotropic band gaps, suggesting an avenue to realize robust disordered topological phases. However, gyromorphs lack exact rotational symmetry, which is only realized on average, posing an obstacle for existing real-space invariants to correctly diagnose topological gyromorphs. In this work we show that gyromorphs can host higher-order topological insulating (HOTI) phases protected by average rotational symmetry, and we develop and systematically compare tools for diagnosing topological phases protected by such symmetry. We introduce symmetry indicators of the effective Hamiltonian based on average rotational symmetries which, when combined with the spectral localizer and a scattering invariant, draw a consistent topological phase diagram. Our work unlocks gyromorphs as a novel platform to study topological phases beyond crystals, quasicrystals, and amorphous materials.
format Preprint
id arxiv_https___arxiv_org_abs_2603_02167
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Topological Gyromorphs
Paz, Laura Gómez
Schirmann, Justin
Chaou, Adam Yanis
Day, Isidora Araya
Grushin, Adolfo G.
Disordered Systems and Neural Networks
Gyromorphs are a new class of disordered systems that combine an amorphous-like absence of translational order with quasi-long-range rotational order. Gyromorphs can outperform quasicrystals or hyperuniform arrangements in forming isotropic band gaps, suggesting an avenue to realize robust disordered topological phases. However, gyromorphs lack exact rotational symmetry, which is only realized on average, posing an obstacle for existing real-space invariants to correctly diagnose topological gyromorphs. In this work we show that gyromorphs can host higher-order topological insulating (HOTI) phases protected by average rotational symmetry, and we develop and systematically compare tools for diagnosing topological phases protected by such symmetry. We introduce symmetry indicators of the effective Hamiltonian based on average rotational symmetries which, when combined with the spectral localizer and a scattering invariant, draw a consistent topological phase diagram. Our work unlocks gyromorphs as a novel platform to study topological phases beyond crystals, quasicrystals, and amorphous materials.
title Topological Gyromorphs
topic Disordered Systems and Neural Networks
url https://arxiv.org/abs/2603.02167