$\mathbb{Z}_2$ Topologically Obstructed Superconducting Order
Abstract
We propose a class of topological superconductivity in which the pairing order is topologically obstructed in a three-dimensional time-reversal invariant system. When two Fermi surfaces are related by time-reversal and mirror symmetries, such as those in a Dirac semimetal, the inter-Fermi-surface pairing in the weak-coupling regime inherits the band topological obstruction. As a result, the pairing order cannot be well-defined over the entire Fermi surface and forms a time-reversal invariant generalization of U() monopole harmonic pairing. A tight-binding model of the topologically obstructed superconductor is constructed based on a doped Dirac semimetal and exhibits nodal pairings. At an open boundary, the system exhibits a time-reversal pair of topologically protected surface states.
Cite
@article{arxiv.2009.07263,
title = {$\mathbb{Z}_2$ Topologically Obstructed Superconducting Order},
author = {Canon Sun and Yi Li},
journal= {arXiv preprint arXiv:2009.07263},
year = {2020}
}
Comments
8 pages, 6 figures