If x′∈ X ′(R) is any R-point, then x′ = u(x′

= ∏n i=1 f (ai)εi

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math.GR · 2023-10-02 · unverdicted · novelty 5.0

Constructs elementary subgroups of all reductive groups of local isotropic rank ≥2 over rings and proves their properties, applicable to automorphism groups of projective modules of rank ≥3 at every prime.

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Locally isotropic elementary groups math.GR · 2023-10-02 · unverdicted · none · ref 2
Constructs elementary subgroups of all reductive groups of local isotropic rank ≥2 over rings and proves their properties, applicable to automorphism groups of projective modules of rank ≥3 at every prime.

If x′∈ X ′(R) is any R-point, then x′ = u(x′

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