# Braiding of Majorana corner states in electric circuits and its   non-Hermitian generalization

**Authors:** Motohiko Ezawa

arXiv: 1902.03716 · 2019-07-17

## TL;DR

This paper demonstrates the realization of Majorana edge and corner states in electric circuits, including their braiding properties and non-Hermitian generalizations, providing a new platform for topological quantum simulation.

## Contribution

It introduces electric circuit models simulating Majorana states and explores their braiding and non-Hermitian extensions, advancing topological quantum simulation methods.

## Key findings

- Zero-energy edge states detected via impedance measurements.
- Majorana corner states exhibit braiding with $\sigma^2=-1$.
- Braiding persists in certain non-Hermitian models.

## Abstract

We propose to realize Majorana edge and corner states in electric circuits. First, we simulate the Kitaev model by an LC electric circuit and the $p_{x}+ip_{y}$ model by an LC circuit together with operational amplifiers. Zero-energy edge states emerge in the topological phase, which are detectable by measuring impedance. Next, we simulate the Bernevig-Hughes-Zhang model by including an effective magnetic field without breaking the particle-hole symmetry, where zero-energy corner states emerge in the topological phase. It is demonstrated that they are Ising anyons subject to the braiding. Namely we derive $\sigma ^{2}=-1$ for them, where $\sigma $ denotes the single-exchange operation. They may well be called Majorana states. We also study non-Hermitian generalizations of these models by requiring the particle-hole symmetry. It is shown that the braiding holds in certain reciprocal non-Hermitian generalizations.

## Full text

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## Figures

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## References

50 references — full list in the complete paper: https://tomesphere.com/paper/1902.03716/full.md

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Source: https://tomesphere.com/paper/1902.03716