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Main Authors: Srinidhi, S., Agrawal, Aayushi, Bandyopadhyay, Jayendra N.
Format: Preprint
Published: 2024
Subjects:
Online Access:https://arxiv.org/abs/2410.04955
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author Srinidhi, S.
Agrawal, Aayushi
Bandyopadhyay, Jayendra N.
author_facet Srinidhi, S.
Agrawal, Aayushi
Bandyopadhyay, Jayendra N.
contents The topological characteristics of the $p$-wave Kitaev chains on a square lattice with nearest-neighbor and next-nearest-neighbor inter-chains hopping and pairing are investigated. Besides gapless exact zero-energy modes, this model exhibits topological gapless phase hosting edge modes, which do not reside strictly at zero energy. However, these modes can be distinguished from the bulk states. These states are known as pseudo- or quasi-Majorana Modes (qMMs). The exploration of this system's bulk spectrum and Berry curvature reveals singularities and flux-carrying vortices within its Brillouin zone. These vortices indicate the presence of four-fold Dirac points arising from two-fold degenerate bands. Examining the Hamiltonian under a cylindrical geometry uncovers the edge properties, demonstrating the existence of topological edge modes. These modes are a direct topological consequence of the Dirac semimetal characteristics of the system. The system is analyzed under open boundary conditions to distinguish the multiple MZMs and qMMs. This analysis includes a study of the normalized site-dependent local density of states, which pinpoints the presence of localized edge states. Additionally, numerical evidence confirms the robustness of the edge modes against disorder perturbations. The emergence of topological edge states and Dirac points with zero Chern number indicates that this model is a weak topological superconductor.
format Preprint
id arxiv_https___arxiv_org_abs_2410_04955
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Quasi-Majorana modes in the $p$-wave Kitaev chains on a square lattice
Srinidhi, S.
Agrawal, Aayushi
Bandyopadhyay, Jayendra N.
Other Condensed Matter
Quantum Physics
The topological characteristics of the $p$-wave Kitaev chains on a square lattice with nearest-neighbor and next-nearest-neighbor inter-chains hopping and pairing are investigated. Besides gapless exact zero-energy modes, this model exhibits topological gapless phase hosting edge modes, which do not reside strictly at zero energy. However, these modes can be distinguished from the bulk states. These states are known as pseudo- or quasi-Majorana Modes (qMMs). The exploration of this system's bulk spectrum and Berry curvature reveals singularities and flux-carrying vortices within its Brillouin zone. These vortices indicate the presence of four-fold Dirac points arising from two-fold degenerate bands. Examining the Hamiltonian under a cylindrical geometry uncovers the edge properties, demonstrating the existence of topological edge modes. These modes are a direct topological consequence of the Dirac semimetal characteristics of the system. The system is analyzed under open boundary conditions to distinguish the multiple MZMs and qMMs. This analysis includes a study of the normalized site-dependent local density of states, which pinpoints the presence of localized edge states. Additionally, numerical evidence confirms the robustness of the edge modes against disorder perturbations. The emergence of topological edge states and Dirac points with zero Chern number indicates that this model is a weak topological superconductor.
title Quasi-Majorana modes in the $p$-wave Kitaev chains on a square lattice
topic Other Condensed Matter
Quantum Physics
url https://arxiv.org/abs/2410.04955