# Composite Weyl nodes stabilized by screw symmetry with and without time   reversal

**Authors:** Stepan S. Tsirkin, Ivo Souza, David Vanderbilt

arXiv: 1704.00129 · 2017-07-27

## TL;DR

This paper classifies Weyl nodes in 3D crystals with screw symmetry, revealing how their chiral charges and splitting behaviors depend on symmetry and time-reversal properties, with implications for topological materials.

## Contribution

It provides a comprehensive classification of Weyl nodes in screw-symmetric crystals, including their chiral charges, splitting behaviors, and the effects of time-reversal symmetry, supported by first-principles calculations.

## Key findings

- Double Weyl nodes require n=4 or 6
- Triple nodes require n=6
- Time-reversal symmetry influences node types and locations

## Abstract

We classify the band degeneracies in 3D crystals with screw symmetry $n_m$ and broken $\mathcal P*\mathcal T$ symmetry, where $\mathcal P$ stands for spatial inversion and $\mathcal T$ for time reversal. The generic degeneracies along symmetry lines are Weyl nodes: Chiral contact points between pairs of bands. They can be single nodes with a chiral charge of magnitude $|\chi|=1$ or composite nodes with $|\chi|=2$ or $3$, and the possible $\chi$ values only depend on the order $n$ of the axis, not on the pitch $m/n$ of the screw. Double Weyl nodes require $n=4$ or 6, and triple nodes require $n=6$. In all cases the bands split linearly along the axis, and for composite nodes the splitting is quadratic on the orthogonal plane. This is true for triple as well as double nodes, due to the presence in the effective two-band Hamiltonian of a nonchiral quadratic term that masks the chiral cubic dispersion. If $\mathcal T$ symmetry is present and $\mathcal P$ is broken there may exist on some symmetry lines Weyl nodes pinned to $\mathcal T$-invariant momenta, which in some cases are unavoidable. In the absence of other symmetries their classification depends on $n$, $m$, and the type of $\mathcal T$ symmetry. With spinless $\mathcal T$ such $\mathcal T$-invariant Weyl nodes are always double nodes, while with spinful $\mathcal T$ they can be single or triple nodes. $\mathcal T$-invariant triples nodes can occur not only on 6-fold axes but also on 3-fold ones, and their in-plane band splitting is cubic, not quadratic as in the case of generic triple nodes. These rules are illustrated by means of first-principles calculations for hcp cobalt, a $\mathcal T$-broken, $\mathcal P$-invariant crystal with $6_3$ symmetry, and for trigonal tellurium and hexagonal NbSi$_2$, which are $\mathcal T$-invariant, $\mathcal P$-broken crystals with 3-fold and 6-fold screw symmetry respectively.

## Full text

_Full body text omitted from this summary view._ Fetch the complete paper as Markdown: https://tomesphere.com/paper/1704.00129/full.md

## Figures

10 figures with captions in the complete paper: https://tomesphere.com/paper/1704.00129/full.md

## References

48 references — full list in the complete paper: https://tomesphere.com/paper/1704.00129/full.md

---
Source: https://tomesphere.com/paper/1704.00129