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arxiv: 2011.03743 · v1 · pith:EYCDGOJYnew · submitted 2020-11-07 · 🪐 quant-ph · cond-mat.mes-hall

Projectively topological exceptional points in non-Hermitian Rice-Mele model

classification 🪐 quant-ph cond-mat.mes-hall
keywords topologicalsystemnon-hermitianchainchainscoupledexceptionalexhibit
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We study coupled non-Hermitian Rice-Mele chains, which consist of Su-Schrieffer-Heeger (SSH) chain system with staggered on-site imaginary potentials. In two dimensional (2D) thermodynamic limit, the exceptional points (EPs) are shown to exhibit topological feature: EPs correspond to topological defects of a real auxiliary 2D vector field in k space, which is obtained from the Bloch states of the non-Hermitian Hamiltonian. As a topological invariant, the topological charges of EPs can be $\pm$1/2, obtained by the winding number calculation. Remarkably, we find that such a topological characterization remains for a finite number of coupled chains, even a single chain, in which the momentum in one direction is discrete. It shows that the EPs in the quasi-1D system still exhibit topological characteristics and can be an abridged version for a 2D system with symmetry protected EPs that are robust in perturbations, which proves that topological invariants for a quasi-1D system can be extracted from the projection of the corresponding 2D limit system on it.

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