Octonionic structure operator and its right spectrum

Abstract

We study a canonical G2-equivariant operator h:ORV ORV defined using only octonion multiplication, where V is the standard 7-dimensional G2-module. We first compute its ordinary real spectrum using the G2-decomposition of ORV. We then analyze the octonionic right-eigenvalue problem h( w)= wλ, λ∈O. After fixing a complex slice R u⊂O, the problem becomes a real spectral problem for Hu,Q=h-Q R u, whose residual symmetry is SU(3). The resulting SU(3)-block decomposition yields two explicit spectral loci in each slice: a quartic curve and a circle. The equations defining these loci are independent of the slice, and the full right spectrum is obtained by allowing u to vary over the unit sphere in ImO.