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Square-root topological semimetals

Tomonari Mizoguchi, Tsuneya Yoshida, Yasuhiro Hatsugai

2021Physical review. B./Physical review. B47 citationsDOIOpen Access PDF

Abstract

We propose topological semimetals generated by the square-root operation for tight-binding models in two and three dimensions, which we call square-root topological semimetals. The square-root topological semimetals host topological band touching at finite energies, whose topological protection is inherited from the squared Hamiltonian. Such a topological character is also reflected in emergence of boundary modes with finite energies. Specifically, focusing on topological properties of squared Hamiltonian in class AIII, we reveal that a decorated honeycomb (decorated diamond) model hosts finite-energy Dirac cones (nodal lines). We also propose a realization of a square-root topological semimetal in a spring-mass model, where robustness of finite-energy Dirac points against the change of tension is elucidated.

Topics & Concepts

Topology (electrical circuits)Hamiltonian (control theory)PhysicsDirac (video compression format)SemimetalSquare rootTopological quantum numberMathematicsQuantum mechanicsBand gapGeometryCombinatoricsNeutrinoMathematical optimizationTopological Materials and PhenomenaGraphene research and applicationsAdvanced Condensed Matter Physics
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