Divisibility (ring theory)

Last updated October 29, 2023

In mathematics, the notion of a divisor originally arose within the context of arithmetic of whole numbers. With the development of abstract rings, of which the integers are the archetype, the original notion of divisor found a natural extension.

Definition

Let R be a ring,^{[lower-alpha 1]} and let a and b be elements of R. If there exists an element x in R with ax = b, one says that a is a left divisor of b and that b is a right multiple of a.^[1] Similarly, if there exists an element y in R with ya = b, one says that a is a right divisor of b and that b is a left multiple of a. One says that a is a two-sided divisor of b if it is both a left divisor and a right divisor of b; the x and y above are not required to be equal.

When R is commutative, the notions of left divisor, right divisor, and two-sided divisor coincide, so one says simply that a is a divisor of b, or that b is a multiple of a, and one writes $a\mid b$ . Elements a and b of an integral domain are associates if both $a\mid b$ and $b\mid a$ . The associate relationship is an equivalence relation on R, so it divides R into disjoint equivalence classes.

Note: Although these definitions make sense in any magma, they are used primarily when this magma is the multiplicative monoid of a ring.

Properties

Statements about divisibility in a commutative ring $R$ can be translated into statements about principal ideals. For instance,

One has $a\mid b$ if and only if $(b)\subseteq (a)$ .
Elements a and b are associates if and only if $(a)=(b)$ .
An element u is a unit if and only if u is a divisor of every element of R.
An element u is a unit if and only if $(u)=R$ .
If $a=bu$ for some unit u, then a and b are associates. If R is an integral domain, then the converse is true.
Let R be an integral domain. If the elements in R are totally ordered by divisibility, then R is called a valuation ring.

In the above, $(a)$ denotes the principal ideal of $R$ generated by the element $a$ .

Zero as a divisor, and zero divisors

If one interprets the definition of divisor literally, every a is a divisor of 0, since one can take x = 0. Because of this, it is traditional to abuse terminology by making an exception for zero divisors: one calls an element a in a commutative ring a zero divisor if there exists a nonzerox such that ax = 0.^[2]
Some texts apply the term 'zero divisor' to a nonzero element x where the multiplier a is additionally required to be nonzero where x solves the expression ax = 0, but such a definition is both more complicated and lacks some of the above properties.

Notes

↑ In this article, rings are assumed to have a 1.

Citations

↑ Bourbaki 1989, p. 97
↑ Bourbaki 1989, p. 98

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References

Bourbaki, N. (1989) [1970], Algebra I, Chapters 1–3, Springer-Verlag, ISBN 9783540642435

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[1] In this article, rings are assumed to have a 1.

[FOOTNOTEBourbaki198997-2] Bourbaki 1989, p. 97

[FOOTNOTEBourbaki198998-3] Bourbaki 1989, p. 98

[lower-alpha 1]

[1]

[2]