Rational orbits in some prehomogeneous vector spaces associated to Sp6 revisited
Abstract
Let k be a field with char(k)≠ 2. We prove that all maximal flags of composition algebras over k, appear as the k-rational Sp6-orbits in a Zariski-dense Sp6-invariant subset Vss⊂ V=3V6, where V6 is the standard 6-dimensional irreducible representation of Sp6. This gives an arithmetic interpretation for the orbit spaces of the semi-stable sets in the prehomogeneous vector spaces (Sp6× GL12,V) and (GSp6× GL12,V). We also get all reduced Freudenthal algebras of dimensions 6 and 9, represented by the same orbit spaces.
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