Predicted versatile topological nodal magnons in the icosahedral quasicrystal 1/1 approximants
Abstract: Using a recenly-estabilished band representation analysis, we discover two distinct types of topological nodal magnons in the real-space antiferroic ordering of whirling spin arrangements in the icosahedral quasicrystal 1/1 approximants, both of which originate from a composite band representation $A\uparrow P_In\bar{3}(24)$ and its constituent ${}1E_g\uparrow P_In\bar{3}(8)$ (or ${}2E_g\uparrow P_In\bar{3}(8)$). The first type is doubly-degenerate nodal line network and nodal planes associated with two-dimensional irreducible band representation, while the second type is a nodal line network due to accidental band inversions. Since our analysis, which relies solely on magnetocrystalline symmetry, is valid for a wide range of materials and spin textures belonging to the same magnetic space group irrespective of composition, these findings offer new universal insights into the research of quasicrystals and their approximants as well as a contribution to broadening the range of topological magnon-hosting materials.
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