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arxiv: 2202.13789 · v1 · pith:P4SK3KAInew · submitted 2022-02-25 · ❄️ cond-mat.mes-hall · cond-mat.str-el· quant-ph

Bulk-edge correspondence in the trimer Su-Schrieffer-Heeger model

classification ❄️ cond-mat.mes-hall cond-mat.str-elquant-ph
keywords modelsymmetryabsencebulkbulk-edgecasechainscorrespondence
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A remarkable feature of the trimer Su-Schrieffer-Heeger (SSH3) model is that it supports localized edge states. Although Zak's phase remains quantized for the case of a mirror-symmetric chain, it is known that it fails to take integer values in the absence of this symmetry and thus it cannot play the role of a well-defined bulk invariant in the general case. Attempts to establish a bulk-edge correspondence have been made via Green's functions or through extensions to a synthetic dimension. Here we propose a simple alternative for SSH3, utilizing the previously introduced sublattice Zak's phase, which also remains valid in the absence of mirror symmetry and for non-commensurate chains. The defined bulk quantity takes integer values, is gauge invariant, and can be interpreted as the difference of the number of edge states between a reference and a target Hamiltonian. Our derivation further predicts the exact corrections for finite open chains, is straightforwadly generalizable, and invokes a chiral-like symmetry present in this model.

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