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Main Authors: Sarkar, Siddhartha, Wan, Xiaohan, Zhang, Yitong, Sun, Kai
Format: Preprint
Published: 2024
Subjects:
Online Access:https://arxiv.org/abs/2408.12555
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author Sarkar, Siddhartha
Wan, Xiaohan
Zhang, Yitong
Sun, Kai
author_facet Sarkar, Siddhartha
Wan, Xiaohan
Zhang, Yitong
Sun, Kai
contents Recent studies on topological flat bands and their fractional states have revealed increasing similarities between moiré flat bands and Landau levels (LLs). For instance, like the lowest LL, topological exact flat bands with ideal quantum geometry can be constructed using the same holomorphic function structure, $ψ_{\mathbf{k}} = f_{\mathbf{k}-\mathbf{k}_0}(z) ψ_{\mathbf{k}_0}$, where $f_{\mathbf{k}}(z)$ is a holomorphic function. This holomorphic structure has been the foundation of existing knowledge on constructing ideal topological flat bands. In this Letter, we report a new family of ideal topological flat bands where the $f$ function does not need to be holomorphic. We provide both model examples and universal principles, as well as an analytic method to construct the wavefunctions of these flat bands, revealing their universal properties, including ideal quantum geometry and a Chern number of $C = \pm 2$ or higher.
format Preprint
id arxiv_https___arxiv_org_abs_2408_12555
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Ideal topological flat bands in chiral symmetric moiré systems from non-holomorphic functions
Sarkar, Siddhartha
Wan, Xiaohan
Zhang, Yitong
Sun, Kai
Mesoscale and Nanoscale Physics
Recent studies on topological flat bands and their fractional states have revealed increasing similarities between moiré flat bands and Landau levels (LLs). For instance, like the lowest LL, topological exact flat bands with ideal quantum geometry can be constructed using the same holomorphic function structure, $ψ_{\mathbf{k}} = f_{\mathbf{k}-\mathbf{k}_0}(z) ψ_{\mathbf{k}_0}$, where $f_{\mathbf{k}}(z)$ is a holomorphic function. This holomorphic structure has been the foundation of existing knowledge on constructing ideal topological flat bands. In this Letter, we report a new family of ideal topological flat bands where the $f$ function does not need to be holomorphic. We provide both model examples and universal principles, as well as an analytic method to construct the wavefunctions of these flat bands, revealing their universal properties, including ideal quantum geometry and a Chern number of $C = \pm 2$ or higher.
title Ideal topological flat bands in chiral symmetric moiré systems from non-holomorphic functions
topic Mesoscale and Nanoscale Physics
url https://arxiv.org/abs/2408.12555