Krull ring

In commutative algebra, a Krull ring, or Krull domain, is a commutative ring with a well behaved theory of prime factorization. They were introduced by Wolfgang Krull in 1931.^[1] They are a higher-dimensional generalization of Dedekind domains, which are exactly the Krull domains of dimension at most 1.

In this article, a ring is commutative and has unity.

Formal definition[edit]

Let $A$ be an integral domain and let $P$ be the set of all prime ideals of $A$ of height one, that is, the set of all prime ideals properly containing no nonzero prime ideal. Then $A$ is a Krull ring if

$A_{\mathfrak {p}}$ is a discrete valuation ring for all ${\mathfrak {p}}\in P$ ,
$A$ is the intersection of these discrete valuation rings (considered as subrings of the quotient field of $A$ ),
any nonzero element of $A$ is contained in only a finite number of height 1 prime ideals.

It is also possible to characterize Krull rings by mean of valuations only:^[2]

An integral domain $A$ is a Krull ring if there exists a family $\{v_{i}\}_{i\in I}$ of discrete valuations on the field of fractions $K$ of $A$ such that:

for any $x\in K\setminus \{0\}$ and all $i$ , except possibly a finite number of them, $v_{i}(x)=0$ ,
for any $x\in K\setminus \{0\}$ , $x$ belongs to $A$ if and only if $v_{i}(x)\geq 0$ for all $i\in I$ .

The valuations $v_{i}$ are called essential valuations of $A$ .

The link between the two definitions is as follows: for every ${\mathfrak {p}}\in P$ , one can associate a unique normalized valuation $v_{\mathfrak {p}}$ of $K$ whose valuation ring is $A_{\mathfrak {p}}$ .^[3] Then the set ${\mathcal {V}}=\{v_{\mathfrak {p}}\}$ satisfies the conditions of the equivalent definition. Conversely, if the set ${\mathcal {V}}'=\{v_{i}\}$ is as above, and the $v_{i}$ have been normalized, then ${\mathcal {V}}'$ may be bigger than ${\mathcal {V}}$ , but it must contain ${\mathcal {V}}$ . In other words, ${\mathcal {V}}$ is the minimal set of normalized valuations satisfying the equivalent definition.

Properties[edit]

With the notations above, let $v_{\mathfrak {p}}$ denote the normalized valuation corresponding to the valuation ring $A_{\mathfrak {p}}$ , $U$ denote the set of units of $A$ , and $K$ its quotient field.

An element $x\in K$ belongs to $U$ if, and only if, $v_{\mathfrak {p}}(x)=0$ for every ${\mathfrak {p}}\in P$ . Indeed, in this case, $x\not \in A_{\mathfrak {p}}{\mathfrak {p}}$ for every ${\mathfrak {p}}\in P$ , hence $x^{-1}\in A_{\mathfrak {p}}$ ; by the intersection property, $x^{-1}\in A$ . Conversely, if $x$ and $x^{-1}$ are in $A$ , then $v_{\mathfrak {p}}(xx^{-1})=v_{\mathfrak {p}}(1)=0=v_{\mathfrak {p}}(x)+v_{\mathfrak {p}}(x^{-1})$ , hence $v_{\mathfrak {p}}(x)=v_{\mathfrak {p}}(x^{-1})=0$ , since both numbers must be $\geq 0$ .
An element $x\in A$ is uniquely determined, up to a unit of $A$ , by the values $v_{\mathfrak {p}}(x)$ , ${\mathfrak {p}}\in P$ . Indeed, if $v_{\mathfrak {p}}(x)=v_{\mathfrak {p}}(y)$ for every ${\mathfrak {p}}\in P$ , then $v_{\mathfrak {p}}(xy^{-1})=0$ , hence $xy^{-1}\in U$ by the above property (q.e.d). This shows that the application $x\ {\rm {mod}}\ U\mapsto \left(v_{\mathfrak {p}}(x)\right)_{{\mathfrak {p}}\in P}$ is well defined, and since $v_{\mathfrak {p}}(x)\not =0$ for only finitely many ${\mathfrak {p}}$ , it is an embedding of $A^{\times }/U$ into the free Abelian group generated by the elements of $P$ . Thus, using the multiplicative notation " $\cdot$ " for the later group, there holds, for every $x\in A^{\times }$ , $x=1\cdot {\mathfrak {p}}_{1}^{\alpha _{1}}\cdot {\mathfrak {p}}_{2}^{\alpha _{2}}\cdots {\mathfrak {p}}_{n}^{\alpha _{n}}\ {\rm {mod}}\ U$ , where the ${\mathfrak {p}}_{i}$ are the elements of $P$ containing $x$ , and $\alpha _{i}=v_{{\mathfrak {p}}_{i}}(x)$ .
The valuations $v_{\mathfrak {p}}$ are pairwise independent.^[4] As a consequence, there holds the so-called weak approximation theorem,^[5] an homologue of the Chinese remainder theorem: if ${\mathfrak {p}}_{1},\ldots {\mathfrak {p}}_{n}$ are distinct elements of $P$ , $x_{1},\ldots x_{n}$ belong to $K$ (resp. $A_{\mathfrak {p}}$ ), and $a_{1},\ldots a_{n}$ are $n$ natural numbers, then there exist $x\in K$ (resp. $x\in A_{\mathfrak {p}}$ ) such that $v_{{\mathfrak {p}}_{i}}(x-x_{i})=n_{i}$ for every $i$ .
A consequence of the weak approximation theorem is a characterization of when Krull rings are noetherian; namely, a Krull ring $A$ is noetherian if and only if all of its quotients $A/{\mathfrak {p}}$ by height-1 primes are noetherian.
Two elements $x$ and $y$ of $A$ are coprime if $v_{\mathfrak {p}}(x)$ and $v_{\mathfrak {p}}(y)$ are not both $>0$ for every ${\mathfrak {p}}\in P$ . The basic properties of valuations imply that a good theory of coprimality holds in $A$ .
Every prime ideal of $A$ contains an element of $P$ .^[6]
Any finite intersection of Krull domains whose quotient fields are the same is again a Krull domain.^[7]
If $L$ is a subfield of $K$ , then $A\cap L$ is a Krull domain.^[8]
If $S\subset A$ is a multiplicatively closed set not containing 0, the ring of quotients $S^{-1}A$ is again a Krull domain. In fact, the essential valuations of $S^{-1}A$ are those valuation $v_{\mathfrak {p}}$ (of $K$ ) for which ${\mathfrak {p}}\cap S=\emptyset$ .^[9]
If $L$ is a finite algebraic extension of $K$ , and $B$ is the integral closure of $A$ in $L$ , then $B$ is a Krull domain.^[10]

Examples[edit]

Any unique factorization domain is a Krull domain. Conversely, a Krull domain is a unique factorization domain if (and only if) every prime ideal of height one is principal.^[11]^[12]
Every integrally closed noetherian domain is a Krull domain.^[13] In particular, Dedekind domains are Krull domains. Conversely, Krull domains are integrally closed, so a Noetherian domain is Krull if and only if it is integrally closed.
If $A$ is a Krull domain then so is the polynomial ring $A[x]$ and the formal power series ring $A[[x]]$ .^[14]
The polynomial ring $R[x_{1},x_{2},x_{3},\ldots ]$ in infinitely many variables over a unique factorization domain $R$ is a Krull domain which is not noetherian.
Let $A$ be a Noetherian domain with quotient field $K$ , and $L$ be a finite algebraic extension of $K$ . Then the integral closure of $A$ in $L$ is a Krull domain (Mori–Nagata theorem).^[15]
Let $A$ be a Zariski ring (e.g., a local noetherian ring). If the completion ${\widehat {A}}$ is a Krull domain, then $A$ is a Krull domain (Mori).^[16]^[17]
Let $A$ be a Krull domain, and $V$ be the multiplicatively closed set consisting in the powers of a prime element $p\in A$ . Then $S^{-1}A$ is a Krull domain (Nagata).^[18]

The divisor class group of a Krull ring[edit]

Assume that $A$ is a Krull domain and $K$ is its quotient field. A prime divisor of $A$ is a height 1 prime ideal of $A$ . The set of prime divisors of $A$ will be denoted $P(A)$ in the sequel. A (Weil) divisor of $A$ is a formal integral linear combination of prime divisors. They form an Abelian group, noted $D(A)$ . A divisor of the form $div(x)=\sum _{p\in P}v_{p}(x)\cdot p$ , for some non-zero $x$ in $K$ , is called a principal divisor. The principal divisors of $A$ form a subgroup of the group of divisors (it has been shown above that this group is isomorphic to $A^{\times }/U$ , where $U$ is the group of unities of $A$ ). The quotient of the group of divisors by the subgroup of principal divisors is called the divisor class group of $A$ ; it is usually denoted $C(A)$ .

Assume that $B$ is a Krull domain containing $A$ . As usual, we say that a prime ideal ${\mathfrak {P}}$ of $B$ lies above a prime ideal ${\mathfrak {p}}$ of $A$ if ${\mathfrak {P}}\cap A={\mathfrak {p}}$ ; this is abbreviated in ${\mathfrak {P}}|{\mathfrak {p}}$ .

Denote the ramification index of $v_{\mathfrak {P}}$ over $v_{\mathfrak {p}}$ by $e({\mathfrak {P}},{\mathfrak {p}})$ , and by $P(B)$ the set of prime divisors of $B$ . Define the application $P(A)\to D(B)$ by

j({\mathfrak {p}})=\sum _{{\mathfrak {P}}|{\mathfrak {p}},\ {\mathfrak {P}}\in P(B)}e({\mathfrak {P}},{\mathfrak {p}}){\mathfrak {P}}

(the above sum is finite since every $x\in {\mathfrak {p}}$ is contained in at most finitely many elements of $P(B)$ ). Let extend the application $j$ by linearity to a linear application $D(A)\to D(B)$ . One can now ask in what cases $j$ induces a morphism ${\bar {j}}:C(A)\to C(B)$ . This leads to several results.^[19] For example, the following generalizes a theorem of Gauss:

The application ${\bar {j}}:C(A)\to C(A[X])$ is bijective. In particular, if $A$ is a unique factorization domain, then so is $A[X]$ .^[20]

The divisor class group of a Krull rings are also used to set up powerful descent methods, and in particular the Galoisian descent.^[21]

Cartier divisor[edit]

A Cartier divisor of a Krull ring is a locally principal (Weil) divisor. The Cartier divisors form a subgroup of the group of divisors containing the principal divisors. The quotient of the Cartier divisors by the principal divisors is a subgroup of the divisor class group, isomorphic to the Picard group of invertible sheaves on Spec(A).

Example: in the ring k[x,y,z]/(xy–z²) the divisor class group has order 2, generated by the divisor y=z, but the Picard subgroup is the trivial group.^[22]

References[edit]

^ Wolfgang Krull (1931).
^ P. Samuel, Lectures on Unique Factorization Domain, Theorem 3.5.
^ A discrete valuation $v$ is said to be normalized if $v(O_{v})=\mathbb {N}$ , where $O_{v}$ is the valuation ring of $v$ . So, every class of equivalent discrete valuations contains a unique normalized valuation.
^ If $v_{{\mathfrak {p}}_{1}}$ and $v_{{\mathfrak {p}}_{2}}$ were both finer than a common valuation $w$ of $K$ , the ideals $A_{{\mathfrak {p}}_{1}}{\mathfrak {p}}_{1}$ and $A_{{\mathfrak {p}}_{2}}{\mathfrak {p}}_{2}$ of their corresponding valuation rings would contain properly the prime ideal ${\mathfrak {p}}_{w}=\{x\in K:\ w(x)>0\},$ hence ${\mathfrak {p}}_{1}$ and ${\mathfrak {p}}_{2}$ would contain the prime ideal ${\mathfrak {p}}_{w}\cap A$ of $A$ , which is forbidden by definition.
^ See Moshe Jarden, Intersections of local algebraic extensions of a Hilbertian field , in A. Barlotti et al., Generators and Relations in Groups and Geometries, Dordrecht, Kluwer, coll., NATO ASI Series C (no 333), 1991, p. 343-405. Read online: archive, p. 17, Prop. 4.4, 4.5 and Rmk 4.6.
^ P. Samuel, Lectures on Unique Factorization Domains, Lemma 3.3.
^ Idem, Prop 4.1 and Corollary (a).
^ Idem, Prop 4.1 and Corollary (b).
^ Idem, Prop. 4.2.
^ Idem, Prop 4.5.
^ P. Samuel, Lectures on Factorial Rings, Thm. 5.3.
^ "Krull ring", Encyclopedia of Mathematics, EMS Press, 2001 [1994], retrieved 2016-04-14
^ P. Samuel, Lectures on Unique Factorization Domains, Theorem 3.2.
^ Idem, Proposition 4.3 and 4.4.
^ Huneke, Craig; Swanson, Irena (2006-10-12). Integral Closure of Ideals, Rings, and Modules. Cambridge University Press. ISBN 9780521688604.
^ Bourbaki, 7.1, no 10, Proposition 16.
^ P. Samuel, Lectures on Unique Factorization Domains, Thm. 6.5.
^ P. Samuel, Lectures on Unique Factorization Domains, Thm. 6.3.
^ P. Samuel, Lectures on Unique Factorization Domains, p. 14-25.
^ Idem, Thm. 6.4.
^ See P. Samuel, Lectures on Unique Factorization Domains, P. 45-64.
^ Hartshorne, GTM52, Example 6.5.2, p.133 and Example 6.11.3, p.142.

N. Bourbaki. Commutative algebra.
"Krull ring", Encyclopedia of Mathematics, EMS Press, 2001 [1994]
Krull, Wolfgang (1931), "Allgemeine Bewertungstheorie", J. Reine Angew. Math., 167: 160–196, archived from the original on January 6, 2013
Hideyuki Matsumura, Commutative Algebra. Second Edition. Mathematics Lecture Note Series, 56. Benjamin/Cummings Publishing Co., Inc., Reading, Mass., 1980. xv+313 pp. ISBN 0-8053-7026-9
Hideyuki Matsumura, Commutative Ring Theory. Translated from the Japanese by M. Reid. Cambridge Studies in Advanced Mathematics, 8. Cambridge University Press, Cambridge, 1986. xiv+320 pp. ISBN 0-521-25916-9
Samuel, Pierre (1964), Murthy, M. Pavman (ed.), Lectures on unique factorization domains, Tata Institute of Fundamental Research Lectures on Mathematics, vol. 30, Bombay: Tata Institute of Fundamental Research, MR 0214579

[1] Wolfgang Krull (1931).

[2] P. Samuel, Lectures on Unique Factorization Domain, Theorem 3.5.

[3] A discrete valuation $v$ is said to be normalized if $v(O_{v})=\mathbb {N}$ , where $O_{v}$ is the valuation ring of $v$ . So, every class of equivalent discrete valuations contains a unique normalized valuation.

[4] If $v_{{\mathfrak {p}}_{1}}$ and $v_{{\mathfrak {p}}_{2}}$ were both finer than a common valuation $w$ of $K$ , the ideals $A_{{\mathfrak {p}}_{1}}{\mathfrak {p}}_{1}$ and $A_{{\mathfrak {p}}_{2}}{\mathfrak {p}}_{2}$ of their corresponding valuation rings would contain properly the prime ideal ${\mathfrak {p}}_{w}=\{x\in K:\ w(x)>0\},$ hence ${\mathfrak {p}}_{1}$ and ${\mathfrak {p}}_{2}$ would contain the prime ideal ${\mathfrak {p}}_{w}\cap A$ of $A$ , which is forbidden by definition.

[5] See Moshe Jarden, Intersections of local algebraic extensions of a Hilbertian field , in A. Barlotti et al., Generators and Relations in Groups and Geometries, Dordrecht, Kluwer, coll., NATO ASI Series C (no 333), 1991, p. 343-405. Read online: archive, p. 17, Prop. 4.4, 4.5 and Rmk 4.6.

[6] P. Samuel, Lectures on Unique Factorization Domains, Lemma 3.3.

[7] Idem, Prop 4.1 and Corollary (a).

[8] Idem, Prop 4.1 and Corollary (b).

[9] Idem, Prop. 4.2.

[10] Idem, Prop 4.5.

[11] P. Samuel, Lectures on Factorial Rings, Thm. 5.3.

[12] "Krull ring", Encyclopedia of Mathematics, EMS Press, 2001 [1994], retrieved 2016-04-14

[13] P. Samuel, Lectures on Unique Factorization Domains, Theorem 3.2.

[14] Idem, Proposition 4.3 and 4.4.

[15] Huneke, Craig; Swanson, Irena (2006-10-12). Integral Closure of Ideals, Rings, and Modules. Cambridge University Press. ISBN 9780521688604.

[16] Bourbaki, 7.1, no 10, Proposition 16.

[17] P. Samuel, Lectures on Unique Factorization Domains, Thm. 6.5.

[18] P. Samuel, Lectures on Unique Factorization Domains, Thm. 6.3.

[19] P. Samuel, Lectures on Unique Factorization Domains, p. 14-25.

[20] Idem, Thm. 6.4.

[21] See P. Samuel, Lectures on Unique Factorization Domains, P. 45-64.

[22] Hartshorne, GTM52, Example 6.5.2, p.133 and Example 6.11.3, p.142.

[1]

[2]

[3]

[4]

[5]

[6]

[7]

[8]

[9]

[10]

[11]

[12]

[13]

[14]

[15]

[16]

[17]

[18]

[19]

[20]

[21]

[22]