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Main Authors: Fedoseev, A. D., Zlotnikov, A. O.
Format: Preprint
Published: 2024
Subjects:
Online Access:https://arxiv.org/abs/2411.14831
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author Fedoseev, A. D.
Zlotnikov, A. O.
author_facet Fedoseev, A. D.
Zlotnikov, A. O.
contents Although the appearance of vortex-localized states with zero energy in first-order topological superconductors is well known, their possibility to form in the higher-order topological phase of 2D systems has not been completely uncovered yet. Here we demonstrate the coexistence of zero-energy vortex modes and Majorana corner modes in the model of a 2D second-order topological superconductor. The model describes an interface between a normal layer supporting the topological insulating phase and a superconducting layer, for which different symmetries of the spin-singlet superconducting order parameter are considered. We show that the gapless vortex modes can appear under certain conditions in the superconducting state with a vortex if the bulk energy spectrum of the normal (non-superconducting) state is gapless and has Dirac cones. The number of pairs of such vortex modes corresponds to the number of Dirac cones. It is essential that if the normal bulk spectrum becomes gapped and the system is in the state of a topological insulator, then the zero-energy vortex modes can not be realized, while Majorana corner modes hold in the superconducting state. The interaction of the vortex modes with the edge and topological corner modes is studied when the vortex appears near the boundaries.
format Preprint
id arxiv_https___arxiv_org_abs_2411_14831
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Coexistence of gapless and gapped vortex modes with Majorana corner states in a 2D second-order topological superconductor
Fedoseev, A. D.
Zlotnikov, A. O.
Superconductivity
Although the appearance of vortex-localized states with zero energy in first-order topological superconductors is well known, their possibility to form in the higher-order topological phase of 2D systems has not been completely uncovered yet. Here we demonstrate the coexistence of zero-energy vortex modes and Majorana corner modes in the model of a 2D second-order topological superconductor. The model describes an interface between a normal layer supporting the topological insulating phase and a superconducting layer, for which different symmetries of the spin-singlet superconducting order parameter are considered. We show that the gapless vortex modes can appear under certain conditions in the superconducting state with a vortex if the bulk energy spectrum of the normal (non-superconducting) state is gapless and has Dirac cones. The number of pairs of such vortex modes corresponds to the number of Dirac cones. It is essential that if the normal bulk spectrum becomes gapped and the system is in the state of a topological insulator, then the zero-energy vortex modes can not be realized, while Majorana corner modes hold in the superconducting state. The interaction of the vortex modes with the edge and topological corner modes is studied when the vortex appears near the boundaries.
title Coexistence of gapless and gapped vortex modes with Majorana corner states in a 2D second-order topological superconductor
topic Superconductivity
url https://arxiv.org/abs/2411.14831