# Integral domain

In mathematics, and specifically in abstract algebra, an **integral domain** is a nonzero commutative ring in which the product of any two nonzero elements is nonzero.^{[1]}^{[2]} Integral domains are generalizations of the ring of integers and provide a natural setting for studying divisibility.
In an integral domain the cancellation property holds for multiplication by a nonzero element *a*, that is, if a ≠ 0, an equality *ab* = *ac* implies *b* = *c*.

"Integral domain" is defined almost universally as above, but there is some variation. This article follows the convention that rings have a 1, but some authors who do not follow this also do not require integral domains to have a 1.^{[3]}^{[4]} Noncommutative integral domains are sometimes admitted.^{[5]} This article, however, follows the much more usual convention of reserving the term "integral domain" for the commutative case and using "domain" for the general case including noncommutative rings.

Some sources, notably Lang, use the term **entire ring** for integral domain.^{[6]}

Some specific kinds of integral domains are given with the following chain of class inclusions:

**Commutative rings**⊃**integral domains**⊃**integrally closed domains**⊃**unique factorization domains**⊃**principal ideal domains**⊃**Euclidean domains**⊃**fields**

## Contents

## Definitions

There are a number of equivalent definitions of integral domain:

- An integral domain is a nonzero commutative ring in which the product of any two nonzero elements is nonzero.
- An integral domain is a nonzero commutative ring with no nonzero zero divisors.
- An integral domain is a commutative ring in which the zero ideal {0} is a prime ideal.
- An integral domain is a commutative ring for which every non-zero element is cancellable under multiplication.
- An integral domain is a ring for which the set of nonzero elements is a commutative monoid under multiplication (because the monoid is closed under multiplication).
- An integral domain is a ring that is (isomorphic to) a subring of a field. (This implies it is a nonzero commutative ring.)
- An integral domain is a nonzero commutative ring in which for every nonzero element
*r*, the function that maps each element*x*of the ring to the product*xr*is injective. Elements*r*with this property are called*regular*, so it is equivalent to require that every nonzero element of the ring be regular.

## Examples

- The archetypical example is the ring
**Z**of all integers. - Every field is an integral domain. Conversely, every Artinian integral domain is a field. In particular, all finite integral domains are finite fields (more generally, by Wedderburn's little theorem, finite domains are finite fields). The ring of integers
**Z**provides an example of a non-Artinian infinite integral domain that is not a field, possessing infinite descending sequences of ideals such as:

- Rings of polynomials are integral domains if the coefficients come from an integral domain. For instance, the ring
**Z**[*X*] of all polynomials in one variable with integer coefficients is an integral domain; so is the ring**R**[*X*,*Y*] of all polynomials in two variables with real coefficients. - For each integer
*n*> 1, the set of all real numbers of the form*a*+*b*√*n*with*a*and*b*integers is a subring of**R**and hence an integral domain. - For each integer
*n*> 0 the set of all complex numbers of the form*a*+*bi*√*n*with*a*and*b*integers is a subring of**C**and hence an integral domain. In the case*n*= 1 this integral domain is called the Gaussian integers. - The ring of p-adic integers is an integral domain.
- If
*U*is a connected open subset of the complex plane**C**, then the ring H(*U*) consisting of all holomorphic functions*f*:*U*→**C**is an integral domain. The same is true for rings of analytic functions on connected open subsets of analytic manifolds. - A regular local ring is an integral domain. In fact, a regular local ring is a UFD.
^{[7]}^{[8]}

## Non-examples

The following rings are *not* integral domains.

- The ring of
*n*×*n*matrices over any nonzero ring when*n*≥ 2. - The ring of continuous functions on the unit interval.
- The quotient ring
**Z**/*m***Z**when*m*is a composite number. - The product ring
**Z**×**Z**. - The zero ring in which 0=1.
- The tensor product (since, for example, ).
- The quotient ring for any field , since is not a prime ideal.

## Divisibility, prime elements, and irreducible elements

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In this section, *R* is an integral domain.

Given elements *a* and *b* of *R*, we say that *a* **divides** *b*, or that *a* is a **divisor** of *b*, or that *b* is a **multiple** of *a*, if there exists an element *x* in *R* such that *ax* = *b*.

The elements that divide 1 are called the **units** of *R*; these are precisely the invertible elements in *R*. Units divide all other elements.

If *a* divides *b* and *b* divides *a*, then we say *a* and *b* are **associated elements** or **associates**.^{[9]} Equivalently, *a* and *b* are associates if *a*=*ub* for some unit *u*.

If *q* is a nonzero non-unit, we say that *q* is an **irreducible element** if *q* cannot be written as a product of two non-units.

If *p* is a nonzero non-unit, we say that *p* is a **prime element** if, whenever *p* divides a product *ab*, then *p* divides *a* or *p* divides *b*. Equivalently, an element *p* is prime if and only if the principal ideal (*p*) is a nonzero prime ideal. The notion of **prime element** generalizes the ordinary definition of prime number in the ring **Z**, except that it allows for negative prime elements.

Every prime element is irreducible. The converse is not true in general: for example, in the quadratic integer ring the element 3 is irreducible (if it factored nontrivially, the factors would each have to have norm 3, but there are no norm 3 elements since has no integer solutions), but not prime (since 3 divides without dividing either factor). In a unique factorization domain (or more generally, a GCD domain), an irreducible element is a prime element.

While unique factorization does not hold in , there is unique factorization of ideals. See Lasker–Noether theorem.

## Properties

- A commutative ring
*R*is an integral domain if and only if the ideal (0) of*R*is a prime ideal. - If
*R*is a commutative ring and*P*is an ideal in*R*, then the quotient ring*R/P*is an integral domain if and only if*P*is a prime ideal. - Let
*R*be an integral domain. Then there is an integral domain*S*such that*R*⊂*S*and*S*has an element which is transcendental over*R*. - The cancellation property holds in any integral domain: for any
*a*,*b*, and*c*in an integral domain, if*a*≠*0*and*ab*=*ac*then*b*=*c*. Another way to state this is that the function*x*Template:Mapsto*ax*is injective for any nonzero*a*in the domain. - The cancellation property holds for ideals in any integral domain: if
*xI*=*xJ*, then either*x*is zero or*I*=*J*. - An integral domain is equal to the intersection of its localizations at maximal ideals.
- An inductive limit of integral domains is an integral domain.

## Field of fractions

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The field of fractions *K* of an integral domain *R* is the set of fractions *a*/*b* with *a* and *b* in *R* and *b* ≠ 0 modulo an appropriate equivalence relation, equipped with the usual addition and multiplication operations. It is "the smallest field containing *R*" in the sense that there is an injective ring homomorphism *R* → *K* such that any injective ring homomorphism from *R* to a field factors through *K*.
The field of fractions of the ring of integers **Z** is the field of rational numbers **Q**. The field of fractions of a field is isomorphic to the field itself.

## Algebraic geometry

Integral domains are characterized by the condition that they are reduced (that is *x*^{2} = 0 implies *x* = 0) and irreducible (that is there is only one minimal prime ideal). The former condition ensures that the nilradical of the ring is zero, so that the intersection of all the ring's minimal primes is zero. The latter condition is that the ring have only one minimal prime. It follows that the unique minimal prime ideal of a reduced and irreducible ring is the zero ideal, so such rings are integral domains. The converse is clear: an integral domain has no nonzero nilpotent elements, and the zero ideal is the unique minimal prime ideal.

This translates, in algebraic geometry, into the fact that the coordinate ring of an affine algebraic set is an integral domain if and only if the algebraic set is an algebraic variety.

More generally, a commutative ring is an integral domain if and only if its spectrum is an integral affine scheme.

## Characteristic and homomorphisms

The characteristic of an integral domain is either 0 or a prime number.

If *R* is an integral domain of prime characteristic *p*, then the Frobenius endomorphism *f*(*x*) = *x*^{ p} is injective.

## See also

- Integral domains – wikibook link
- Dedekind–Hasse norm – the extra structure needed for an integral domain to be principal
- Zero-product property

## Notes

- ↑ Bourbaki, p. 116.
- ↑ Dummit and Foote, p. 228.
- ↑ B.L. van der Waerden, Algebra Erster Teil, p. 36, Springer-Verlag, Berlin, Heidelberg 1966.
- ↑ I.N. Herstein, Topics in Algebra, p. 88-90, Blaisdell Publishing Company, London 1964.
- ↑ J.C. McConnel and J.C. Robson "Noncommutative Noetherian Rings" (Graduate studies in Mathematics Vol. 30, AMS)
- ↑ Pages 91–92 of Template:Lang Algebra
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- B.L. van der Waerden, Algebra, Springer-Verlag, Berlin Heidelberg, 1966.