In mathematics, and more specifically in algebra, a domain is a nonzero ring in which ab = 0 implies a = 0 or b = 0. (Sometimes such a ring is said to "have the zero-product property.") Equivalently, a domain is a ring in which 0 is the only left zero divisor (or equivalently, the only right zero divisor). A commutative domain is called an integral domain. (Warning: The mathematical literature contains some variants of the definition of "domain".)
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Examples and non-examples
Constructions of domains
One way of proving that a ring is a domain is by exhibiting a filtration with special properties.
Theorem: If R is a filtered ring whose associated graded ring gr(R) is a domain, then R itself is a domain.
This theorem needs to be complemented by the analysis of the graded ring gr(R).
Group rings and the zero divisor problem
Suppose that G is a group and K is a field. Is the group ring R = K[G] a domain? The identity
shows that an element g of finite order n > 1 induces a zero divisor 1−g in R. The zero divisor problem asks whether this is the only obstruction; in other words,
Given a field K and a torsion-free group G, is it true that K[G] contains no zero divisors?No counterexamples are known, but the problem remains open in general (as of 2007).
For many special classes of groups, the answer is affirmative. Farkas and Snider proved in 1976 that if G is a torsion-free polycyclic-by-finite group and char K = 0 then the group ring K[G] is a domain. Later (1980) Cliff removed the restriction on the characteristic of the field. In 1988, Kropholler, Linnell and Moody generalized these results to the case of torsion-free solvable and solvable-by-finite groups. Earlier (1965) work of Michel Lazard, whose importance was not appreciated by the specialists in the field for about 20 years, had dealt with the case where K is the ring of p-adic integers and G is the pth congruence subgroup of GL(n,Z).
Spectrum of an integral domain
Zero divisors have a topological interpretation, at least in the case of commutative rings: a ring R is an integral domain if and only if it is reduced and its spectrum Spec R is an irreducible topological space. The first property is often considered to encode some infinitesimal information, whereas the second one is more geometric.
An example: the ring k[x, y]/(xy), where k is a field, is not a domain, since the images of x and y in this ring are zero divisors. Geometrically, this corresponds to the fact that the spectrum of this ring, which is the union of the lines x = 0 and y = 0, is not irreducible. Indeed, these two lines are its irreducible components.