Multi-Weyl Topological Semimetals Stabilized by Point Group Symmetry

Abstract

We perform a complete classification of two-band ·p theories at band crossing points in 3D semimetals with n-fold rotation symmetry and broken time-reversal symmetry. Using this classification, we show the existence of new 3D topological semimetals characterized by C4,6-protected double-Weyl nodes with quadratic in-plane (along kx,y) dispersion or C6-protected triple-Weyl nodes with cubic in-plane dispersion. We apply this theory to the 3D ferromagnet HgCr2Se4 and confirm it is a double-Weyl metal protected by C4 symmetry. Furthermore, if the direction of the ferromagnetism is shifted away from the [001]- to the [111]-axis, the double-Weyl node splits into four single Weyl nodes, as dictated by the point group S6 of that phase. Finally, we discuss experimentally relevant effects including splitting of multi-Weyl nodes by applying Cn breaking strain and the surface Fermi arcs in these new semimetals.