Berry连接和曲率
物理
几何相位
Chern类
朗道量子化
拓扑序
拓扑(电路)
量子霍尔效应
量子
量子力学
磁场
凝聚态物理
几何学
数学
组合数学
作者
Jia‐Xin Yin,Wenlong Ma,Tyler A. Cochran,Xitong Xu,Songtian S. Zhang,Hung‐Ju Tien,Nana Shumiya,Guangming Cheng,Kun Jiang,Biao Lian,Zhida Song,Guoqing Chang,Ilya Belopolski,Daniel Multer,Maksim Litskevich,Zi‐Jia Cheng,Xiàn Yáng,Bianca Swidler,Huibin Zhou,Hsin Lin
出处
期刊:Cornell University - arXiv
日期:2020-06-08
被引量:38
标识
DOI:10.48550/arxiv.2006.04881
摘要
The quantum level interplay between geometry, topology, and correlation is at the forefront of fundamental physics. Owing to the unusual lattice geometry and breaking of time-reversal symmetry, kagome magnets are predicted to support intrinsic Chern quantum phases. However, quantum materials hosting ideal spin-orbit coupled kagome lattices with strong out-of-plane magnetization have been lacking. Here we use scanning tunneling microscopy to discover a new topological kagome magnet TbMn6Sn6, which is close to satisfying the above criteria. We visualize its effectively defect-free purely Mn-based ferromagnetic kagome lattice with atomic resolution. Remarkably, its electronic state exhibits distinct Landau quantization upon the application of a magnetic field, and the quantized Landau fan structure features spin-polarized Dirac dispersion with a large Chern gap. We further demonstrate the bulk-boundary correspondence between the Chern gap and topological edge state, as well as the Berry curvature field correspondence of Chern gapped Dirac fermions. Our results point to the realization of a quantum-limit Chern phase in TbMn6Sn6, opening up an avenue for discovering topological quantum phenomena in the RMn6Sn6 (R = rare earth element) family with a variety of magnetic structures. Our visualization of the magnetic bulk-boundary-Berry correspondence covering real and momentum space demonstrates a proof-of-principle method revealing topological magnets.
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