Polynomial identity ring - AbsoluteAstronomy.com

Mathematics

Mathematics is the study of quantity, space, structure, and change. Mathematicians seek out patterns and formulate new conjectures. Mathematicians resolve the truth or falsity of conjectures by mathematical proofs, which are arguments sufficient to convince other mathematicians of their validity...

, in the subfield of ring theory

Ring theory

In abstract algebra, ring theory is the study of rings—algebraic structures in which addition and multiplication are defined and have similar properties to those familiar from the integers...

, a ring R is a polynomial identity ring if there is, for some N > 0, an element P other than 0 of the free algebra

Free algebra

In mathematics, especially in the area of abstract algebra known as ring theory, a free algebra is the noncommutative analogue of a polynomial ring .-Definition:...

, Z1, X₂, ..., X_N>, over the ring of integers

Ring of integers

In mathematics, the ring of integers is the set of integers making an algebraic structure Z with the operations of integer addition, negation, and multiplication...

in N variables X₁, X₂, ..., X_N such that for all N-tuple

Tuple

In mathematics and computer science, a tuple is an ordered list of elements. In set theory, an n-tuple is a sequence of n elements, where n is a positive integer. There is also one 0-tuple, an empty sequence. An n-tuple is defined inductively using the construction of an ordered pair...

s r₁, r₂, ..., r_N taken from R it happens that

Strictly the X_i here are "non-commuting indeterminates", and so "polynomial identity" is a slight abuse of language

Abuse of notation

In mathematics, abuse of notation occurs when an author uses a mathematical notation in a way that is not formally correct but that seems likely to simplify the exposition or suggest the correct intuition . Abuse of notation should be contrasted with misuse of notation, which should be avoided...

, since "polynomial" here stands for what is usually called a "non-commutative polynomial". The abbreviation PI-ring is common. More generally, the free algebra over any ring S may be used, and gives the concept of PI-algebra.

If the degree of the polynomial P is defined in the usual way, the polynomial P is called monic if at least one of its terms of highest degree has coefficient equal to 1. The PI-rings are usually taken as close generalizations of commutative rings. If the ring has characteristic

Characteristic (algebra)

In mathematics, the characteristic of a ring R, often denoted char, is defined to be the smallest number of times one must use the ring's multiplicative identity element in a sum to get the additive identity element ; the ring is said to have characteristic zero if this repeated sum never reaches...

p different from zero then it satisfies the polynomial pX = 0. To exclude these examples, sometimes it is defined that PI-rings must satisfy a monic polynomial identity.

Examples

For example if R is a commutative ring
Commutative ring
In ring theory, a branch of abstract algebra, a commutative ring is a ring in which the multiplication operation is commutative. The study of commutative rings is called commutative algebra....

it is a PI-ring: this is true with

P(X₁, X₂) = X₁X₂ − X₂X₁.

A major role is played in the theory by the standard identity s_N, of length N, which generalises the example given for commutative rings (N = 2). It derives from the Leibniz formula for determinants

by replacing each product in the summand by the product of the X_i in the order given by the permutation σ. In other words each of the N! orders is summed, and the coefficient is 1 or −1 according to the signature.

The k×k matrix ring

Matrix ring

In abstract algebra, a matrix ring is any collection of matrices forming a ring under matrix addition and matrix multiplication. The set of n×n matrices with entries from another ring is a matrix ring, as well as some subsets of infinite matrices which form infinite matrix rings...

over any commutative ring satisfies a standard identity; the Amitsur–Levitzki theorem states that it satisfies s_2k. The degree of this identity is optimal since the matrix ring can not satisfy any monic polynomial of degree less than 2k.

Given a field k of characteristic zero, take R to be the exterior algebra
Exterior algebra
In mathematics, the exterior product or wedge product of vectors is an algebraic construction used in Euclidean geometry to study areas, volumes, and their higher-dimensional analogs...

over a countably infinite-dimensional vector space
Vector space
A vector space is a mathematical structure formed by a collection of vectors: objects that may be added together and multiplied by numbers, called scalars in this context. Scalars are often taken to be real numbers, but one may also consider vector spaces with scalar multiplication by complex...

with basis e₁, e₂, e₃, ... Then R is generated by the elements of this basis and

e_ie_j = −e_je_i.

This ring does not satisfy s_N for any N and therefore can not be embedded in any matrix ring. In fact s_N(e₁,e₂,...,e_N) = N!e₁e₂...e_N ≠ 0. On the other hand it is a PI-ring since it satisfies , y], z] := xyz − xzz − zxy + zyz = 0. It is enough to check this for monomials in the es. Now, a monomial of even degree commutes with every element. Therefore if either x or y is a monomial of even degree [x, y] := xy − yx = 0. If both are of odd degree then [x, y] = xy − yx = 2xy has even degree and therefore commutes with z, i.e. , y], z] = 0.

Properties

Any subring
Subring
In mathematics, a subring of R is a subset of a ring, is itself a ring with the restrictions of the binary operations of addition and multiplication of R, and which contains the multiplicative identity of R...

or homomorphic image
Homomorphism
In abstract algebra, a homomorphism is a structure-preserving map between two algebraic structures . The word homomorphism comes from the Greek language: ὁμός meaning "same" and μορφή meaning "shape".- Definition :The definition of homomorphism depends on the type of algebraic structure under...

of a PI-ring is a PI-ring.
A finite direct product
Direct product
In mathematics, one can often define a direct product of objectsalready known, giving a new one. This is generally the Cartesian product of the underlying sets, together with a suitably defined structure on the product set....

of PI-rings is a PI-ring.
A direct product of PI-rings, satisfying the same identity, is a PI-ring.
It can always be assumed that the identity that the PI-ring satisfies is multilinear.
If a ring is finitely generated by n elements as a module
Module (mathematics)
In abstract algebra, the concept of a module over a ring is a generalization of the notion of vector space, wherein the corresponding scalars are allowed to lie in an arbitrary ring...

over its center
Center (algebra)
The term center or centre is used in various contexts in abstract algebra to denote the set of all those elements that commute with all other elements. It is often denoted Z, from German Zentrum, meaning "center". More specifically:...

then it satisfies every alternating multilinear polynomial of degree larger than n. In particular it satisfies s_N for N > n and therefore it is a PI-ring.
If R and S are PI-rings then their tensor product
Tensor product
In mathematics, the tensor product, denoted by ⊗, may be applied in different contexts to vectors, matrices, tensors, vector spaces, algebras, topological vector spaces, and modules, among many other structures or objects. In each case the significance of the symbol is the same: the most general...

over the integers, , is also a PI-ring.

PI-rings as generalizations of commutative rings

Among noncommutative rings, PI-rings satisfy the Köthe conjecture. Affine

Finitely generated algebra

In mathematics, a finitely generated algebra is an associative algebra A over a field K where there exists a finite set of elements a1,…,an of A such that every element of A can be expressed as a polynomial in a1,…,an, with coefficients in K...

PI-algebras over a field

Field (mathematics)

In abstract algebra, a field is a commutative ring whose nonzero elements form a group under multiplication. As such it is an algebraic structure with notions of addition, subtraction, multiplication, and division, satisfying certain axioms...

satisfy the Kurosh conjecture, the Nullstellensatz and the catenary property

Catenary ring

In mathematics, a commutative ring R is catenary if for any pair of prime idealsany two strictly increasing chainsare contained in maximal strictly increasing chains from p to q of the same length. In other words, there is a well-defined function from pairs of prime ideals to natural numbers,...

for prime ideals.

If R is a PI-ring and K is a subring of its center such that R is integral

Integral

Integration is an important concept in mathematics and, together with its inverse, differentiation, is one of the two main operations in calculus...

over K then the going up and going down properties

Going up and going down

In commutative algebra, a branch of mathematics, going up and going down are terms which refer to certain properties of chains of prime ideals in integral extensions....

for prime ideals of R and K are satisfied. Also the lying over property (If p is a prime ideal of K then there is a prime ideal P of R such that

) and the incomparability property (If P and Q are prime ideals of R and

then

) are satisfied.

The set of identities a PI-ring satisfies

If F := Z1, X₂, ..., X_N> is the free algebra in N variables and R is a PI-ring satisfying the polynomial P in N variables, then P is in the kernel

Kernel (mathematics)

In mathematics, the word kernel has several meanings. Kernel may mean a subset associated with a mapping:* The kernel of a mapping is the set of elements that map to the zero element , as in kernel of a linear operator and kernel of a matrix...

of any homomorphism

R.

An ideal I of F is called T-ideal if

for every endomorphism

Endomorphism

In mathematics, an endomorphism is a morphism from a mathematical object to itself. For example, an endomorphism of a vector space V is a linear map ƒ: V → V, and an endomorphism of a group G is a group homomorphism ƒ: G → G. In general, we can talk about...

f of F.

Given a PI-ring, R, the set of all polynomial identities it satisfies is an ideal

Ideal (ring theory)

In ring theory, a branch of abstract algebra, an ideal is a special subset of a ring. The ideal concept allows the generalization in an appropriate way of some important properties of integers like "even number" or "multiple of 3"....

but even more it is a T-ideal. Conversely, if I is a T-ideal of F then F/I is a PI-ring satisfying all identities in I. It is assumed that I contains monic polynomials when PI-rings are required to satisfy monic polynomial identities.

The source of this article is wikipedia, the free encyclopedia. The text of this article is licensed under the GFDL.