TY - JOUR
T1 - Topological Correspondence between Hermitian and Non-Hermitian Systems
T2 - Anomalous Dynamics
AU - Lee, Jong Yeon
AU - Ahn, Junyeong
AU - Zhou, Hengyun
AU - Vishwanath, Ashvin
N1 - Publisher Copyright:
© 2019 American Physical Society.
PY - 2019/11/13
Y1 - 2019/11/13
N2 - The hallmark of symmetry-protected topological phases is the existence of anomalous boundary states, which can only be realized with the corresponding bulk system. In this work, we show that for every Hermitian anomalous boundary mode of the ten Altland-Zirnbauer classes, a non-Hermitian counterpart can be constructed, whose long-time dynamics provides a realization of the anomalous boundary state. We prove that the non-Hermitian counterpart is characterized by a point-gap topological invariant, and furthermore, that the invariant exactly matches that of the corresponding Hermitian anomalous boundary mode. We thus establish a correspondence between the topological classifications of (d+1)-dimensional gapped Hermitian systems and d-dimensional point-gapped non-Hermitian systems. We illustrate this general result with a number of examples in different dimensions. This work provides a new perspective on point-gap topological invariants in non-Hermitian systems.
AB - The hallmark of symmetry-protected topological phases is the existence of anomalous boundary states, which can only be realized with the corresponding bulk system. In this work, we show that for every Hermitian anomalous boundary mode of the ten Altland-Zirnbauer classes, a non-Hermitian counterpart can be constructed, whose long-time dynamics provides a realization of the anomalous boundary state. We prove that the non-Hermitian counterpart is characterized by a point-gap topological invariant, and furthermore, that the invariant exactly matches that of the corresponding Hermitian anomalous boundary mode. We thus establish a correspondence between the topological classifications of (d+1)-dimensional gapped Hermitian systems and d-dimensional point-gapped non-Hermitian systems. We illustrate this general result with a number of examples in different dimensions. This work provides a new perspective on point-gap topological invariants in non-Hermitian systems.
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U2 - 10.1103/PhysRevLett.123.206404
DO - 10.1103/PhysRevLett.123.206404
M3 - Article
C2 - 31809078
AN - SCOPUS:85075106641
SN - 0031-9007
VL - 123
JO - Physical review letters
JF - Physical review letters
IS - 20
M1 - 206404
ER -