We develop a matrix-theoretic framework for the natural embedding of the exceptional Lie algebra g2=Der (O) in so (8), use it to make constructive a recent existence result on octonionic triality, and derive geometric applications for moduli spaces of principal bundles. Specifically, the derivation condition for D^∈so (7) is reformulated as a homogeneous linear system in the 21 entries of D^, whose solution space is identified with g2=kerΨ, where Ψ: so (7) →Λ3R7* is the Lie derivative with respect to the associative 3-form φ on Im (O). It is proved that rankΨ=7, and an algorithm is given for computing an orthonormal basis of g2. The image ΨA^σ of the triality generator is computed for all triples, yielding six nonzero components and squared norm 12. As geometric applications, the map Ψ is globalized to a morphism of adjoint bundles, giving an intrinsic characterization of the G2-reductible locus in M (SO (7) ). The orthogonal decomposition of so (8) globalizes to an explicit splitting of the adjoint bundle of any SO (8) -principal bundle admitting a G2-reduction. Finally, M (G2) is identified as a connected component of the triality fixed-point locus in M (Spin (8) ), with an explicit description of the tangent and normal spaces in terms of the Lie-algebraic decomposition.
Álvaro Antón‐Sancho (Thu,) studied this question.
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