Group Of Units
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In algebra, a unit of a ring is an invertible element for the multiplication of the ring. That is, an element of a ring is a unit if there exists in such that vu = uv = 1, where is the
multiplicative identity In mathematics, an identity element, or neutral element, of a binary operation operating on a set is an element of the set that leaves unchanged every element of the set when the operation is applied. This concept is used in algebraic structures su ...
; the element is unique for this property and is called the multiplicative inverse of . The set of units of forms a group under multiplication, called the group of units or unit group of . Other notations for the unit group are , , and (from the German term ). Less commonly, the term ''unit'' is sometimes used to refer to the element of the ring, in expressions like ''ring with a unit'' or ''unit ring'', and also unit matrix. Because of this ambiguity, is more commonly called the "unity" or the "identity" of the ring, and the phrases "ring with unity" or a "ring with identity" may be used to emphasize that one is considering a ring instead of a rng.


Examples

The multiplicative identity and its additive inverse are always units. More generally, any root of unity in a ring is a unit: if , then is a multiplicative inverse of . In a nonzero ring, the element 0 is not a unit, so is not closed under addition. A nonzero ring in which every nonzero element is a unit (that is, ) is called a division ring (or a skew-field). A commutative division ring is called a field. For example, the unit group of the field of real numbers is .


Integer ring

In the ring of integers , the only units are and . 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 .


Ring of integers of a number field

In the ring obtained by adjoining the quadratic integer to , one has , so is a unit, and so are its powers, so has infinitely many units. More generally, for the
ring of integers In mathematics, the ring of integers of an algebraic number field K is the ring of all algebraic integers contained in K. An algebraic integer is a root of a monic polynomial with integer coefficients: x^n+c_x^+\cdots+c_0. This ring is often deno ...
in a number field , Dirichlet's unit theorem states that is isomorphic to the group \mathbf Z^n \times \mu_R where \mu_R is the (finite, cyclic) group of roots of unity in and , the rank of the unit group, is n = r_1 + r_2 -1, where r_1, r_2 are the number of real embeddings and the number of pairs of complex embeddings of , respectively. This recovers the example: The unit group of (the ring of integers of) a real quadratic field is infinite of rank 1, since r_1=2, r_2=0.


Polynomials and power series

For a commutative ring , the units of the polynomial ring are the polynomials p(x) = a_0 + a_1 x + \dots + a_n x^n such that a_0 is a unit in and the remaining coefficients a_1, \dots, a_n are nilpotent, i.e., satisfy a_i^N = 0 for some ''N''. In particular, if is a domain, then the units of are the units of . The units of the power series ring R x are the power series p(x)=\sum_^\infty a_i x^i such that a_0 is a unit in .


Matrix rings

The unit group of the ring of matrices over a ring is the group of invertible matrices. For a commutative ring , an element of is invertible if and only if the determinant of is invertible in . In that case, can be given explicitly in terms of the adjugate matrix.


In general

For elements and in a ring , if 1 - xy is invertible, then 1 - yx is invertible with inverse 1 + y(1-xy)^x; this formula can be guessed, but not proved, by the following calculation in a ring of noncommutative power series: (1-yx)^ = \sum_ (yx)^n = 1 + y \left(\sum_ (xy)^n \right)x = 1 + y(1-xy)^x. See Hua's identity for similar results.


Group of units

A
commutative ring In mathematics, a commutative ring is a ring in which the multiplication operation is commutative. The study of commutative rings is called commutative algebra. Complementarily, noncommutative algebra is the study of ring properties that are not sp ...
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 , R, - 1. Every ring homomorphism induces a group homomorphism , since maps units to units. In fact, the formation of the unit group defines a functor from the category of rings to the category of groups. This functor has a left adjoint which is the integral group ring construction.Exercise 10 in § 2.2. of The group scheme \operatorname_1 is isomorphic to the
multiplicative group scheme In mathematics, a group scheme is a type of object from algebraic geometry equipped with a composition law. Group schemes arise naturally as symmetries of schemes, and they generalize algebraic groups, in the sense that all algebraic groups ha ...
\mathbb_m over any base, so for any commutative ring , the groups \operatorname_1(R) and \mathbb_m(R) are canonically isomorphic to U(R). Note that the functor \mathbb_m (that is, R \mapsto U(R)) is representable in the sense: \mathbb_m(R) \simeq \operatorname(\mathbb
, t^ The comma is a punctuation mark that appears in several variants in different languages. It has the same shape as an apostrophe or single closing quotation mark () in many typefaces, but it differs from them in being placed on the baseline o ...
R) for commutative rings (this for instance follows from the aforementioned adjoint relation with the group ring construction). Explicitly this means that there is a natural bijection between the set of the ring homomorphisms \mathbb
, t^ The comma is a punctuation mark that appears in several variants in different languages. It has the same shape as an apostrophe or single closing quotation mark () in many typefaces, but it differs from them in being placed on the baseline o ...
\to R and the set of unit elements of (in contrast, \mathbb /math> represents the additive group \mathbb_a, the forgetful functor from the category of commutative rings to the category of abelian groups).


Associatedness

Suppose that is commutative. Elements and of are called ' if there exists a unit in such that ; then write . In any ring, pairs of
additive inverse In mathematics, the additive inverse of a number is the number that, when added to , yields zero. This number is also known as the opposite (number), sign change, and negation. For a real number, it reverses its sign: the additive inverse (opp ...
elements and are associate. For example, 6 and −6 are associate in . In general, is an
equivalence relation In mathematics, an equivalence relation is a binary relation that is reflexive, symmetric and transitive. The equipollence relation between line segments in geometry is a common example of an equivalence relation. Each equivalence relation ...
on . Associatedness can also be described in terms of the Group action (mathematics), action of on via multiplication: Two elements of are associate if they are in the same -orbit (group theory), orbit. In an integral domain, the set of associates of a given nonzero element has the same cardinality as . The equivalence relation can be viewed as any one of Green's relations, Green's semigroup relations specialized to the multiplicative semigroup of a commutative ring .


See also

* S-units * Localization of a ring and a module


Notes


Citations


Sources

* * * * * {{DEFAULTSORT:Unit (Ring Theory) 1 (number) Algebraic number theory Group theory Ring theory Algebraic properties of elements