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Main Authors: Moola, R., Mckenna, A., Hilke, M.
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2507.01846
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author Moola, R.
Mckenna, A.
Hilke, M.
author_facet Moola, R.
Mckenna, A.
Hilke, M.
contents Topological invariants, such as the winding number, the Chern number, and the Zak phase, characterize the topological phases of bulk materials. Through the bulk-boundary correspondence, these topological phases have a one-to-one correspondence to topological edge states, which are robust to certain classes of disorder. For simple models like the Su-Schrieffer-Heeger (SSH) model, the computation of the winding number and Zak phase are straightforward, however, in multiband systems, this is no longer the case. In this work, we introduce the unwrapped Wilson line across the Brillouin zone to compute the bulk topological invariant. This method can efficiently be implemented numerically to evaluate multiband SSH-type models, including models that have a large number of distinct topological phases. This approach accurately captures all topological edge states, including those overlooked by traditional invariants, such as the winding number and Zak phase. To make a connection to experiments, we determine the sign of the topological invariant by considering a Hall-like configuration. We further introduce different classes of disorder that leave certain edge states protected, while suppressing other edge states, depending on their symmetry properties. Our approach is illustrated using different one-dimensional models, providing a robust framework for understanding topological properties in one-dimensional systems.
format Preprint
id arxiv_https___arxiv_org_abs_2507_01846
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Wilson Line and Disorder Invariants of Topological One-Dimensional Multiband Models
Moola, R.
Mckenna, A.
Hilke, M.
Disordered Systems and Neural Networks
Mesoscale and Nanoscale Physics
Quantum Physics
Topological invariants, such as the winding number, the Chern number, and the Zak phase, characterize the topological phases of bulk materials. Through the bulk-boundary correspondence, these topological phases have a one-to-one correspondence to topological edge states, which are robust to certain classes of disorder. For simple models like the Su-Schrieffer-Heeger (SSH) model, the computation of the winding number and Zak phase are straightforward, however, in multiband systems, this is no longer the case. In this work, we introduce the unwrapped Wilson line across the Brillouin zone to compute the bulk topological invariant. This method can efficiently be implemented numerically to evaluate multiband SSH-type models, including models that have a large number of distinct topological phases. This approach accurately captures all topological edge states, including those overlooked by traditional invariants, such as the winding number and Zak phase. To make a connection to experiments, we determine the sign of the topological invariant by considering a Hall-like configuration. We further introduce different classes of disorder that leave certain edge states protected, while suppressing other edge states, depending on their symmetry properties. Our approach is illustrated using different one-dimensional models, providing a robust framework for understanding topological properties in one-dimensional systems.
title Wilson Line and Disorder Invariants of Topological One-Dimensional Multiband Models
topic Disordered Systems and Neural Networks
Mesoscale and Nanoscale Physics
Quantum Physics
url https://arxiv.org/abs/2507.01846