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Coupled-wire construction of static and Floquet second-order topological insulators

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arxiv 1811.02325 v2 pith:56MYUDOH submitted 2018-11-06 cond-mat.mes-hall

Coupled-wire construction of static and Floquet second-order topological insulators

classification cond-mat.mes-hall
keywords topologicalfloquetsotisstatesstaticamplitudeschiralconstruct
verification ladder T0 review T1 audit T2 compute T3 formal T4 reserved
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Second-order topological insulators (SOTI) exhibit protected gapless boundary states at their hinges or corners. In this paper, we propose a generic means to construct SOTIs in static and Floquet systems by coupling one-dimensional topological insulator wires along a second dimension through dimerized hopping amplitudes. The Hamiltonian of such SOTIs admits a Kronecker sum structure, making it possible for obtaining its features by analyzing two constituent one-dimensional lattice Hamiltonians defined separately in two orthogonal dimensions. The resulting topological corner states do not rely on any delicate spatial symmetries, but are solely protected by the chiral symmetry of the system. We further utilize our idea to construct Floquet SOTIs, whose number of topological corner states is arbitrarily tunable via changing the hopping amplitudes of the system. Finally, we propose to detect the topological invariants of static and Floquet SOTIs constructed following our approach in experiments by measuring the mean chiral displacements of wavepackets.

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