A proper 𝐺ₐ action on 𝐶⁵ which is not locally trivial

An additive group action on an affine 3-space over a complex Dedekind domain A is said to be twintriangular if it is generated by a locally nilpotent derivation of A[y, z1, z2] of the form r∂y + p1(y)∂z 1 + p2(y)∂z 2 , where r ∈ A and p1, p2 ∈ A[y]. We show that these actions are translations if and only if they are proper. Our approach avoids the computation of rings of invariants and focuses more on the nature of geometric quotients for such actions.

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A proper 𝐺ₐ action on 𝐶⁵ which is not locally trivial

Cited by 2 publications

References 11 publications

Free affine actions of unipotent groups on Cn

Free affine actions of unipotent groups on Cn

Proper twin-triangular $\mathbb {G}_{a}$-actions on $\mathbb {A}^{4}$ are translations

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