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In algebra, an analytically irreducible ring is a local ring whose completion has no zero divisors. Geometrically this corresponds to a variety with only one analytic branch at a point.

Zariski (1948) proved that if a local ring of an algebraic variety is a normal ring, then it is analytically irreducible. There are many examples of reduced and irreducible local rings that are analytically reducible, such as the local ring of a node of an irreducible curve, but it is hard to find examples that are also normal. Nagata (1958, 1962, Appendix A1, example 7) gave such an example of a normal Noetherian local ring that is analytically reducible.

Nagata's example

Suppose that K is a field of characteristic not 2, and K ] is the formal power series ring over K in 2 variables. Let R be the subring of K ] generated by x, y, and the elements z_n and localized at these elements, where

${\displaystyle w=\sum _{m>0}a_{m}x^{m}}$ is transcendental over K(x)

${\displaystyle z_{1}=(y+w)^{2}}$

${\displaystyle z_{n+1}=(z_{1}-(y+\sum _{0<m<n}a_{m}x^{m})^{2})/x^{n}}$.

Then R/(X–z₁) is a normal Noetherian local ring that is analytically reducible.

References

• Nagata, Masayoshi (1958), "An example of a normal local ring which is analytically reducible", Mem. Coll. Sci. Univ. Kyoto. Ser. A Math., 31: 83–85, MR 0097395
• Nagata, Masayoshi (1962), Local rings, Interscience Tracts in Pure and Applied Mathematics, vol. 13, New York-London: Interscience Publishers
• Zariski, Oscar (1948), "Analytical irreducibility of normal varieties", Ann. of Math., 2, 49: 352–361, doi:10.2307/1969284, MR 0024158
• Zariski, Oscar; Samuel, Pierre (1975) , Commutative algebra. Vol. II, Berlin, New York: Springer-Verlag, ISBN 978-0-387-90171-8, MR 0389876

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