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Universal transitivity of simple and 2-simple prehomogeneous vector spaces

T. KimuraS. KasaiH. Hosokawa — 1988

Annales de l'institut Fourier

We denote by k a field of characteristic zero satisfying H 1 ( k , Aut ( S L 2 ) ) 0 . Let G be a connected k -split linear algebraic group acting on X = Aff n rationally by ρ with a Zariski-dense G -orbit Y . A prehomogeneous vector space ( G , ρ ,X) is called “universally transitive” if the set of k -rational points Y ( k ) is a single ρ ( G ) ( k ) -orbit for all such k . Such prehomogeneous vector spaces are classified by J. Igusa when ρ is irreducible. We classify them when G is reductive and its commutator subgroup [ G , G ] is either a simple algebraic...

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