1999
DOI: 10.1007/bf01236662
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Affine modifications and affine hypersurfaces with a very transitive automorphism group

Abstract: International audienc

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Cited by 80 publications
(117 citation statements)
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“…A complete analog of Theorem 7.2 in [19] cited at the beginning holds if the polynomial p ∈ C [4] is linear with respect to two (and not just one) variables. Indeed (3.24) if the 3-fold X, p = a(x, y)u + b(x, y)v + c(x, y) = 0, in C 4 is smooth and acyclic, then p ∈ C [4] is a variable.…”
Section: Abhyankar-sathaye Embedding Problem Is It True That Any Birmentioning
confidence: 99%
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“…A complete analog of Theorem 7.2 in [19] cited at the beginning holds if the polynomial p ∈ C [4] is linear with respect to two (and not just one) variables. Indeed (3.24) if the 3-fold X, p = a(x, y)u + b(x, y)v + c(x, y) = 0, in C 4 is smooth and acyclic, then p ∈ C [4] is a variable.…”
Section: Abhyankar-sathaye Embedding Problem Is It True That Any Birmentioning
confidence: 99%
“…Generalizing a theorem of A. Sathaye [34] it is proven in [19] that if a surface X = p −1 (0) ⊆ C 3 with p = f u + g ∈ C [3] and f, g ∈ C[x, y] is acyclic (that is, H * (X; Z) = 0), then p is a variable of the polynomial ring C [3] , i.e., a coordinate of an automorphism α ∈ Aut C 3 . Thus X can be rectified, and so is isomorphic to C 2 .…”
Section: Introductionmentioning
confidence: 99%
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