Topological edge states in photonic Floquet insulator with unpaired Dirac cones

Hua Zhong, Yaroslav Kartashov, Yongdong Li, Ming Li, Yiqi Zhang
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引用次数: 1

Abstract

Topological insulators are most frequently constructed using lattices with specific degeneracies in their linear spectra, such as Dirac points. For a broad class of lattices, such as honeycomb ones, these points and associated Dirac cones generally appear in non-equivalent pairs. Simultaneous breakup of the time-reversal and inversion symmetry in systems based on such lattices may result in the formation of the unpaired Dirac cones in bulk spectrum, but the existence of topologically protected edge states in such structures remains an open problem. Here photonic Floquet insulator on honeycomb lattice with unpaired Dirac cones in its spectrum is introduced that can support unidirectional edge states appearing at the edge between two regions with opposite sublattice detuning. Topological properties of this system are characterized by the nonzero valley Chern number. Remarkably, edge states in this system can circumvent sharp corners without inter-valley scattering even though there is no total forbidden gap in the spectrum. Our results reveal unusual interplay between two different physical mechanisms of creation of topological edge states based on simultaneous breakup of different symmetries of the system.
具有非配对狄拉克锥的光子弗洛凯绝缘体中的拓扑边缘态
拓扑绝缘体最常见的构造方式是使用线性谱具有特定退行性的晶格,如狄拉克点。对于蜂窝状晶格等一大类晶格,这些点和相关的狄拉克锥通常以非等价对的形式出现。在基于此类晶格的系统中,时间反转对称性和反转对称性的同时破缺可能导致体谱中非配对狄拉克锥的形成,但此类结构中存在拓扑保护边缘态仍是一个未决问题。本文介绍了在蜂巢晶格上的光子弗洛凯绝缘体,它的光谱中存在未配对的狄拉克锥,可以支持出现在具有相反亚晶格失谐的两个区域之间边缘的单向边缘状态。该系统的拓扑特性以非零谷切尔数为特征。值得注意的是,该系统中的边缘态可以绕过尖角,而不会发生谷间散射,即使频谱中不存在总的禁隙。我们的研究结果揭示了拓扑边缘态产生的两种不同物理机制之间不同寻常的相互作用,这两种机制基于同时打破系统的不同对称性。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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