Abstract
We investigate the topological properties of a Kitaev ladder, i.e., a system made of two Kitaev chains coupled together by transversal hopping and pairing term, t1 and Δ1, respectively. Using the Chern number invariant, we present the topological phase diagram of the system. It is shown that beyond a non-topological phase, the system exhibits a topological phase either with four or two Majorana (zero energy) modes. In particular, we find that for some critical values of the transversal hopping t1, and at a given transversal paring Δ1, the topological phase survives also when the Kitaev criterion for the single chain (Δ > 0, |μ| < 2t) is violated. Using a tight-binding analysis for a finite-size system we numerically check the bulk-edge correspondence.
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Maiellaro, A., Romeo, F. & Citro, R. Topological phase diagram of a Kitaev ladder. Eur. Phys. J. Spec. Top. 227, 1397–1404 (2018). https://doi.org/10.1140/epjst/e2018-800090-y
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DOI: https://doi.org/10.1140/epjst/e2018-800090-y