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Nagata's conjecture

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Mathematical theorem in algebra For the conjecture about curves, see Nagata's conjecture on curves.
This article may be written in a style that is too abstract to be readily understandable by general audiences. Please improve it by defining technical terminology, and by adding examples. (April 2022)
Nagata's conjecture
FieldAlgebraic geometry
Conjectured byMasayoshi Nagata
Conjectured in1972
First proof byUalbai Umirbaev and Ivan Shestakov
First proof in2004

In algebra, Nagata's conjecture states that Nagata's automorphism of the polynomial ring k is wild. The conjecture was proposed by Nagata (1972) and proved by Ualbai U. Umirbaev and Ivan P. Shestakov (2004).

Nagata's automorphism is given by

ϕ ( x , y , z ) = ( x 2 Δ y Δ 2 z , y + Δ z , z ) , {\displaystyle \phi (x,y,z)=(x-2\Delta y-\Delta ^{2}z,y+\Delta z,z),}

where Δ = x z + y 2 {\displaystyle \Delta =xz+y^{2}} .

For the inverse, let ( a , b , c ) = ϕ ( x , y , z ) {\displaystyle (a,b,c)=\phi (x,y,z)} Then z = c {\displaystyle z=c} and Δ = b 2 + a c {\displaystyle \Delta =b^{2}+ac} . With this y = b Δ c {\displaystyle y=b-\Delta c} and x = a + 2 Δ y + Δ 2 z {\displaystyle x=a+2\Delta y+\Delta ^{2}z} .

References

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