# Integral element

In commutative algebra, an element b of a commutative ring B is said to be integral over A, a subring of B, if there are n ≥ 1 and $a_{j}\in A$ such that

$b^{n}+a_{n-1}b^{n-1}+\cdots +a_{1}b+a_{0}=0.$ That is to say, b is a root of a monic polynomial over A. If every element of B is integral over A, then it is said that B is integral over A, or equivalently B is an integral extension of A. If A, B are fields, then the notions of "integral over" and of an "integral extension" are precisely "algebraic over" and "algebraic extensions" in field theory (since the root of any polynomial is the root of a monic polynomial).

The special case of an integral element of greatest interest in number theory is that of complex numbers integral over Z; in this context, they are usually called algebraic integers (e.g., ${\sqrt {2}}$ ). The algebraic integers in a finite extension field k of the rationals Q form a subring of k, called the ring of integers of k, a central object of study in algebraic number theory.

The set of elements of B that are integral over A is called the integral closure of A in B. It is a subring of B containing A.

In this article, the term ring will be understood to mean commutative ring with a unity.

## Examples

1. u−1 is integral over R if and only if u−1R[u].
2. $R[u]\cap R[u^{-1}]$ is integral over R.

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$\bigoplus \nolimits _{n\geq 0}\operatorname {H} ^{0}(X,{\mathcal {O}}_{X}(n)).$ ## Equivalent definitions

Let B be a ring, and let A be a subring of B. Given an element b in B, the following conditions are equivalent:

(i) b is integral over A;
(ii) the subring A[b] of B generated by A and b is a finitely generated A-module;
(iii) there exists a subring C of B containing A[b] and which is a finitely-generated A-module;
(iv) there exists a finitely generated A-submodule M of B with bMM and the annihilator of M in B is zero.

The usual proof of this uses the following variant of the Cayley–Hamilton theorem on determinants:

Theorem Let u be an endomorphism of an A-module M generated by n elements and I an ideal of A such that $u(M)\subset IM$ . Then there is a relation:
$u^{n}+a_{1}u^{n-1}+\cdots +a_{n-1}u+a_{n}=0,a_{i}\in I^{i}.$ This theorem (with I = A and u multiplication by b) gives (iv) ⇒ (i) and the rest is easy. Coincidentally, Nakayama's lemma is also an immediate consequence of this theorem.

It follows from the above that the set of elements of B that are integral over A forms a subring of B containing A. (Indeed, if x, y are elements of B that are integral over A, then $x+y,xy,-x$ are integral over A since they stabilize $A[x]A[y]$ , which is a finitely generated module over A and is annihilated only by zero.) It is called the integral closure of A in B. If A happens to be the integral closure of A in B, then A is said to be integrally closed in B. If B is the total ring of fractions of A (e.g., the field of fractions when A is an integral domain), then one sometimes drops qualification "in B" and simply says "integral closure" and "integrally closed." Let A be an integral domain with the field of fractions K and A' the integral closure of A in an algebraic field extension L of K. Then the field of fractions of A' is L. In particular, A' is an integrally closed domain.

Similarly, "integrality" is transitive. Let C be a ring containing B and c in C. If c is integral over B and B integral over A, then c is integral over A. In particular, if C is itself integral over B and B is integral over A, then C is also integral over A.

Note that (iii) implies that if B is integral over A, then B is a union (equivalently an inductive limit) of subrings that are finitely generated A-modules.

If A is noetherian, (iii) can be weakened to:

(iii) bis There exists a finitely generated A-submodule of B that contains A[b].

Finally, the assumption that A be a subring of B can be modified a bit. If f: AB is a ring homomorphism, then one says f is integral if B is integral over f(A). In the same way one says f is finite (B finitely generated A-module) or of finite type (B finitely generated A-algebra). In this viewpoint, one says that

f is finite if and only if f is integral and of finite-type.

Or more explicitly,

B is a finitely generated A-module if and only if B is generated as A-algebra by a finite number of elements integral over A.

## Integral extensions

An integral extension AB has the going-up property, the lying over property, and the incomparability property (Cohen-Seidenberg theorems). Explicitly, given a chain of prime ideals ${\mathfrak {p}}_{1}\subset \cdots \subset {\mathfrak {p}}_{n}$ in A there exists a ${\mathfrak {p}}'_{1}\subset \cdots \subset {\mathfrak {p}}'_{n}$ in B with ${\mathfrak {p}}_{i}={\mathfrak {p}}'_{i}\cap A$ (going-up and lying over) and two distinct prime ideals with inclusion relation cannot contract to the same prime ideal (incomparability). In particular, the Krull dimensions of A and B are the same. Furthermore, if A is an integrally closed domain, then the going-down holds (see below).

In general, the going-up implies the lying-over. Thus, in the below, we simply say the "going-up" to mean "going-up" and "lying-over".

When A, B are domains such that B is integral over A, A is a field if and only if B is a field. As a corollary, one has: given a prime ideal ${\mathfrak {q}}$ of B, ${\mathfrak {q}}$ is a maximal ideal of B if and only if ${\mathfrak {q}}\cap A$ is a maximal ideal of A. Another corollary: if L/K is an algebraic extension, then any subring of L containing K is a field.

Let B be a ring that is integral over a subring A and k an algebraically closed field. If $f:A\to k$ is a homomorphism, then f extends to a homomorphism Bk. This follows from the going-up.

Let $f:A\to B$ be an integral extension of rings. Then the induced map

$f^{\#}:\operatorname {Spec} B\to \operatorname {Spec} A,\quad p\mapsto f^{-1}(p)$ is a closed map; in fact, $f^{\#}(V(I))=V(f^{-1}(I))$ for any ideal I and $f^{\#}$ is surjective if f is injective. This is a geometric interpretation of the going-up.

If B is integral over A, then $B\otimes _{A}R$ is integral over R for any A-algebra R. In particular, $\operatorname {Spec} (B\otimes _{A}R)\to \operatorname {Spec} R$ is closed; i.e., the integral extension induces a "universally closed" map. This leads to a geometric characterization of integral extension. Namely, let B be a ring with only finitely many minimal prime ideals (e.g., integral domain or noetherian ring). Then B is integral over a (subring) A if and only if $\operatorname {Spec} (B\otimes _{A}R)\to \operatorname {Spec} R$ is closed for any A-algebra R.

Remark: The same idea in the proof shows that if $L/K$ is a purely inseparable extension (need not be normal), then $\operatorname {Spec} B\to \operatorname {Spec} A$ is bijective.

Let A, K, etc. as before but assume L is only a finite field extension of K. Then

(i) $\operatorname {Spec} B\to \operatorname {Spec} A$ has finite fibers.
(ii) the going-down holds between A and B: given ${\mathfrak {p}}_{1}\subset \cdots \subset {\mathfrak {p}}_{n}={\mathfrak {p}}'_{n}\cap A$ , there exists ${\mathfrak {p}}'_{1}\subset \cdots \subset {\mathfrak {p}}'_{n}$ that contracts to it.

Let B be a ring and A a subring that is a noetherian integrally closed domain (i.e., $\operatorname {Spec} A$ is a normal scheme.) If B is integral over A, then $\operatorname {Spec} B\to \operatorname {Spec} A$ is submersive; i.e., the topology of $\operatorname {Spec} A$ is the quotient topology. The proof uses the notion of constructible sets. (See also: torsor (algebraic geometry).)

## Integral closure

{{#invoke:see also|seealso}} Let AB be rings and A' the integral closure of A in B. (See above for the definition.)

The integral closure of a local ring A in, say, B, need not be local. (If this is the case, the ring is called unibranch.) This is the case for example when A is Henselian and B is a field extension of the field of fractions of A.

If A is a subring of a field K, then the integral closure of A in K is the intersection of all valuation rings of K containing A.

There is also a concept of the integral closure of an ideal. The integral closure of an ideal $I\subset R$ , usually denoted by ${\overline {I}}$ , is the set of all elements $r\in R$ such that there exists a monic polynomial

$x^{n}+a_{1}x^{n-1}+\cdots +a_{n-1}x^{1}+a_{n}$ with $a_{i}\in I^{i}$ with r as a root. Note this is the definition that appears, for example, in Eisenbud and is different from Bourbaki's and Atiyah–MacDonald's definition.

For noetherian rings, there are alternate definitions as well.

The notion of integral closure of an ideal is used in some proofs of the going-down theorem.

## Conductor

Let B be a ring and A a subring of B such that B is integral over A. Then the annihilator of the A-module B/A is called the conductor of A in B. Because the notion has origin in algebraic number theory, the conductor is denoted by ${\mathfrak {f}}={\mathfrak {f}}(B/A)$ . Explicitly, ${\mathfrak {f}}$ consists of elements a in A such that $aB\subset A$ . (cf. idealizer in abstract algebra.) It is the largest ideal of A that is also an ideal of B. If S is a multiplicatively closed subset of A, then

$S^{-1}{\mathfrak {f}}(B/A)={\mathfrak {f}}(S^{-1}B/S^{-1}A)$ .

If B is a subring of the total ring of fractions of A, then we may identify

$\ {\mathfrak {f}}(B/A)=\operatorname {Hom} _{A}(B,A)$ .

## Finiteness of integral closure

An important but difficult question is on the finiteness of the integral closure of a finitely generated algebra. There are several known results.

The integral closure of a Dedekind domain in a finite extension of the field of fractions is a Dedekind domain; in particular, a noetherian ring. This is a consequence of the Krull–Akizuki theorem. In general, the integral closure of a noetherian domain of dimension at most 2 is noetherian; Nagata gave an example of dimension 3 noetherian domain whose integral closure is not noetherian. A nicer statement is this: the integral closure of a noetherian domain is a Krull domain (Mori–Nagata theorem). Nagata also gave an example of dimension 1 noetherian local domain such that the integral closure is not finite over that domain.{{ safesubst:#invoke:Unsubst||date=__DATE__ |\$B= {{#invoke:Category handler|main}}{{#invoke:Category handler|main}}[citation needed] }}

Let A be a noetherian integrally closed domain with field of fractions K. If L/K is a finite separable extension, then the integral closure $A'$ of A in L is a finitely generated A-module. This is easy and standard (uses the fact that the trace defines a non-degenerate bilinear form.)

Let A be a finitely generated algebra over a field k that is an integral domain with field of fractions K. If L is a finite extension of K, then the integral closure $A'$ of A in L is a finitely generated A-module and is also a finitely generated k-algebra. The result is due to Noether and can be shown using the Noether normalization lemma as follows. It is clear that it is enough to show the assertion when L/K is either separable or purely inseparable. The separable case is noted above; thus, assume L/K is purely inseparable. By the normalization lemma, A is integral over the polynomial ring $S=k[x_{1},...,x_{d}]$ . Since L/K is a finite purely inseparable extension, there is a power q of a prime number such that every element of L is a q-th root of an element in K. Let $k'$ be a finite extension of k containing all q-th roots of coefficients of finitely many rational functions that generate L. Then we have: $L\subset k'(x_{1}^{1/q},...,x_{d}^{1/q}).$ The ring on the right is the field of fractions of $k'[x_{1}^{1/q},...,x_{d}^{1/q}]$ , which is the integral closure of S; thus, contains $A'$ . Hence, $A'$ is finite over S; a fortiori, over A. The result remains true if we replace k by Z.

The integral closure of a complete local noetherian domain A in a finite extension of the field of fractions of A is finite over A. More precisely, for a local noetherian ring R, we have the following chains of implications:

(i) A complete $\Rightarrow$ A is a Nagata ring
(ii) A is a Nagata domain $\Rightarrow$ A analytically unramified $\Rightarrow$ the integral closure of the completion ${\widehat {A}}$ is finite over ${\widehat {A}}$ $\Rightarrow$ the integral closure of A is finite over A.

## Noether's normalization lemma

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Noether's normalisation lemma is a theorem in commutative algebra. Given a field K and a finitely generated K-algebra A, the theorem says it is possible to find elements y1, y2, ..., ym in A that are algebraically independent over K such that A is finite (and hence integral) over B = K[y1,..., ym]. Thus the extension KA can be written as a composite KBA where KB is a purely transcendental extension and BA is finite.