Layer-dependent zero-line modes in antiferromagnetic topological insulators

Liang, Wenhao; Hou, Tao; Zeng, Junjie; Liu, Zheng; Han, Yulei; Qiao, Zhenhua

doi:10.1103/physrevb.107.075303

Cited by 5 publications

(2 citation statements)

References 52 publications

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“…We expect that our results will also be relevant in this platform. Theoretical predictions for layer-dependent zero-line modes in antiferromagnetic topological insulator multilayer structures based on MnBi 2 Te 4 [56] suggest that our theory can also be applied in that context. An important caveat when comparing our results to experiments concerns the idealized step-like mass term considered here.…”

Section: Discussionmentioning

confidence: 85%

Two-dimensional Dirac fermions in a mass superlattice

et al. 2023

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We study two-dimensional (2D) Dirac fermions in the presence of a periodic mass term alternating between positive and negative values along one direction. This scenario could be realized for a graphene monolayer or for the surface states of topological insulators. The low-energy physics is governed by chiral Jackiw-Rebbi modes propagating along zero-mass lines, with the energy dispersion of the Bloch states given by an anisotropic Dirac cone. By means of the transfer matrix approach, we obtain exact results for a piece-wise constant mass superlattice. On top of Bloch states, two different classes of boundary and/or interface modes can exist in a finite-size geometry or in a nonuniform electrostatic potential, respectively. We compute the dispersion relation for both types of boundary and interface modes, which originate either from states close to the superlattice Brillouin zone (BZ) center or, via a Lifshitz transition, from states near the BZ boundary. In the presence of a potential step, we predict that the interface modes, the Bloch wave functions, and the electrical conductance will sensitively depend on the step position relative to the mass superlattice.

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Section: Discussionmentioning

confidence: 85%

Two-dimensional Dirac fermions in a mass superlattice

et al. 2023

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“…It has been found that graphene-like materials can exhibit abundant topological phases under different external fields applied to the whole system, [11][12][13][14][15] and the side potential applied to the boundary of the system is also crucial for generating and manipulating topological phases and corresponding edge states. [16,17] In particular, a large number of zero-line modes (ZLMs) [18][19][20] that can arise from the interface separating different topological phases have been found in addition to outer edge states [11,[21][22][23] induced at the interface between topological phases and the topologically trivial vacuum. In particular, ZLMs are related not only to the Chern numbers but also to the valley Chern numbers, which are also known as kink states and inner edge states, respectively.…”

Section: Introductionmentioning

confidence: 99%

Fully spin-polarized, valley-polarized and spin-valley-polarized electron beam splitters utilizing zero-line modes in a three-terminal device

Lü 吕,

Yang 杨,

Xie 谢

2024

Chinese Phys. B

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Topological zero-line modes (ZLMs) with spin and valley degrees of freedom gives rise to the spin, valley and spin-valley transports, which support a platform to explore the quantum transport physics and potential applications in the spintonic/valleytronic devices. In this work, we investigate the beam-splitting behaviors of the charge current devoted by the ZLMs in a three-terminal system. It shows that with special combinations of the ZLMs, the incident charge current along the interface between different topological phases can be divided into different polarized currents with unit transmittance in two outgoing terminals. As a result, the fully spin-polarized, valley-polarized and spin-valley-polarized electron beam splitters are generated. And the mechanism of these splitters is attributed to the cooperative effects of the distribution of the ZLMs, and the intervalley and intravalley scatterings that are modulated by the wave-vector mismatch and group velocity mismatch. Interestingly, a half-quantized transmittance of these scatterings is found in a fully spin-valley-polarized electron beam splitter. Furthermore, the results indicate that these splitters can be applicable to graphene, silicene, germanene and stanene due to the robustness against the spin-orbit coupling. Our findings offer a new view to understand the transport mechanism and investigate the promising applications of the ZLMs.

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