In mathematics, an invertible element or a unit in a ring with identity is any element that has an inverse element in the multiplicative monoid of, i.e. an element such that The set of units of any ring is closed undermultiplication, and forms a group for this operation. It never contains the element 0, and is therefore not closed under addition; its complement however might be a group under addition, which happens if and only ifthe ring is a local ring. The term unit is also used to refer to the identity element of the ring, in expressions like ring with a unit or ', and also e.g. unit' matrix''. For this reason, some authors call "unity" or "identity", and say that is a "ring with unity" or a "ring with identity" rather than a "ring with a unit". The multiplicative identity and its additive inverse are always units. Hence, pairs of additive inverse elements and are always associated.
In the ring of integers, the only units are and. Rings of integers in a number fieldF have, in general, more units. For example, in the ring, and in fact the unit group of this ring is infinite. In fact, Dirichlet's unit theorem describes the structure of precisely: it is isomorphic to a group of the form where is the group of roots of unity in R and n, the rank of the unit group is where are the numbers of real embeddings and the number of pairs of complex embeddings of F, respectively. This recovers the above example: the unit group of a real quadratic field is infinite of rank 1, since. In the ring of integers modulo, the units are the congruence classes represented by integers coprime to. They constitute the multiplicative group of integers modulo.
For a commutative ringR, the units of the polynomial ringR are precisely those polynomials such that is a unit in R, and the remaining coefficients are nilpotent elements, i.e., satisfy for some N. In particular, if R is a domain, then the units of R agree with the ones of R. The units of the power series ring are precisely those power series such that is a unit in R.
Matrix rings
The unit group of the ring of matrices over a commutative ring is the group general linear group| of invertible matrices. An element of the matrix ring is invertible if and only if the determinant of the element is invertible in R, with the inverse explicitly given by Cramer's rule.
In general
Let be a ring. For any in, if is invertible, then is invertible with the inverse. The formula for the inverse can be found as follows: thinking formally, suppose is invertible and that the inverse is given by a geometric series:. Then, manipulating it formally, See alsoHua's identity for a similar type of results.
Group of units
The units of a ring form a group under multiplication, the group of units of. Other common notations for are,, and . A commutative ring is a local ring if is a maximal ideal. As it turns out, if is an ideal, then it is necessarily a maximal ideal and R is local since a maximal ideal is disjoint from. If is a finite field, then is a cyclic group of order. The formulation of the group of units defines a functor from the category of rings to the category of groups: every ring homomorphism induces a group homomorphism, since maps units to units. This functor has a left adjoint which is the integral group ring construction.
Associatedness
In a commutative unital ring, the group of units acts on via multiplication. The orbits of this action are called sets of ; in other words, there is an equivalence relation ∼ on called associatedness such that means that there is a unit with. In an integral domain the cardinality of an equivalence class of associates is the same as that of.
