Curving the space by non-Hermiticity
Abstract
Quantum systems are often classified into Hermitian and non-Hermitian ones. Extraordinary non-Hermitian phenomena, ranging from the non-Hermitian skin effect to the supersensitivity to boundary conditions, have been widely explored. Whereas these intriguing phenomena have been considered peculiar to non-Hermitian systems, we show that they can be naturally explained by a duality between non-Hermitian models in flat spaces and their counterparts, which could be Hermitian, in curved spaces. For instance, prototypical one-dimensional (1D) chains with uniform chiral tunnelings are equivalent to their duals in two-dimensional (2D) hyperbolic spaces with or without magnetic fields, and non-uniform tunnelings could further tailor local curvatures. Such a duality unfolds deep geometric roots of non-Hermitian phenomena, delivers an unprecedented routine connecting Hermitian and non-Hermitian physics, and gives rise to a theoretical perspective reformulating our understandings of curvatures and distance. In practice, it provides experimentalists with a powerful two-fold application, using non-Hermiticity as a new protocol to engineer curvatures or implementing synthetic curved spaces to explore non-Hermitian quantum physics.
Keywords
Cite
@article{arxiv.2106.02477,
title = {Curving the space by non-Hermiticity},
author = {Chenwei Lv and Ren Zhang and Zhengzheng Zhai and Qi Zhou},
journal= {arXiv preprint arXiv:2106.02477},
year = {2022}
}
Comments
7 pages (3 figures) + 6 pages (3 figures). Added non-Hermitian realizations of quantum Hall states in curved spaces