Nagata ring

In commutative algebra, an N-1 ring is an integral domain ${\displaystyle A}$ whose integral closure in its quotient field is a finitely generated ${\displaystyle A}$-module. It is called a Japanese ring (or an N-2 ring) if for every finite extension ${\displaystyle L}$ of its quotient field ${\displaystyle K}$, the integral closure of ${\displaystyle A}$ in ${\displaystyle L}$ is a finitely generated ${\displaystyle A}$-module (or equivalently a finite ${\displaystyle A}$-algebra). A ring is called universally Japanese if every finitely generated integral domain over it is Japanese, and is called a Nagata ring, named for Masayoshi Nagata, or a pseudo-geometric ring if it is Noetherian and universally Japanese (or, which turns out to be the same, if it is Noetherian and all of its quotients by a prime ideal are N-2 rings). A ring is called geometric if it is the local ring of an algebraic variety or a completion of such a local ring,^[1] but this concept is not used much.

Fields and rings of polynomials or power series in finitely many indeterminates over fields are examples of Japanese rings. Another important example is a Noetherian integrally closed domain (e.g. a Dedekind domain) having a perfect field of fractions. On the other hand, a principal ideal domain or even a discrete valuation ring is not necessarily Japanese.

Any quasi-excellent ring is a Nagata ring, so in particular almost all Noetherian rings that occur in algebraic geometry are Nagata rings. The first example of a Noetherian domain that is not a Nagata ring was given by Akizuki (1935).

Here is an example of a discrete valuation ring that is not a Japanese ring. Choose a prime ${\displaystyle p}$ and an infinite degree field extension ${\displaystyle K}$ of a characteristic ${\displaystyle p}$ field ${\displaystyle k}$, such that ${\displaystyle K^p\subseteq k}$. Let the discrete valuation ring ${\displaystyle R}$ be the ring of formal power series over ${\displaystyle K}$ whose coefficients generate a finite extension of ${\displaystyle k}$. If ${\displaystyle y}$ is any formal power series not in ${\displaystyle R}$ then the ring ${\displaystyle R[y]}$ is not an N-1 ring (its integral closure is not a finitely generated module) so ${\displaystyle R}$ is not a Japanese ring.

If ${\displaystyle R}$ is the subring of the polynomial ring ${\displaystyle k[x_1,x_2,\mathrm{...}]}$ in infinitely many generators generated by the squares and cubes of all generators, and ${\displaystyle S}$ is obtained from ${\displaystyle R}$ by adjoining inverses to all elements not in any of the ideals generated by some ${\displaystyle x_n}$, then ${\displaystyle S}$ is a 1-dimensional Noetherian domain that is not an N-1 ring, in other words its integral closure in its quotient field is not a finitely generated ${\displaystyle S}$-module. Also ${\displaystyle S}$ has a cusp singularity at every closed point, so the set of singular points is not closed.

• Lua error in Module:Citation/CS1/Configuration at line 2172: attempt to index field '?' (a nil value).
• Bosch, Güntzer, Remmert, Non-Archimedean Analysis, Springer 1984, Lua error in Module:Citation/CS1/Configuration at line 2172: attempt to index field '?' (a nil value).
• Lua error in Module:Citation/CS1/Configuration at line 2172: attempt to index field '?' (a nil value).
• A. Grothendieck, J. Dieudonné, Eléments de géométrie algébrique, Ch. 0_IV § 23, Publ. Math. IHÉS 20, (1964).
• H. Matsumura, Commutative algebra Lua error in Module:Citation/CS1/Configuration at line 2172: attempt to index field '?' (a nil value)., chapter 12.
• Nagata, Masayoshi Local rings. Interscience Tracts in Pure and Applied Mathematics, No. 13 Interscience Publishers a division of John Wiley & Sons, New York-London 1962, reprinted by R. E. Krieger Pub. Co (1975) Lua error in Module:Citation/CS1/Configuration at line 2172: attempt to index field '?' (a nil value).

• http://stacks.math.columbia.edu/tag/032E