Prime element

Template:Short description In mathematics, specifically in abstract algebra, a prime element of a commutative ring is an object satisfying certain properties similar to the prime numbers in the integers and to irreducible polynomials. Care should be taken to distinguish prime elements from irreducible elements, a concept that is the same in UFDs but not the same in general.

DefinitionEdit

An element Template:Mvar of a commutative ring Template:Mvar is said to be prime if it is not the zero element or a unit and whenever Template:Mvar divides Template:Mvar for some Template:Mvar and Template:Mvar in Template:Mvar, then Template:Mvar divides Template:Mvar or Template:Mvar divides Template:Mvar. With this definition, Euclid's lemma is the assertion that prime numbers are prime elements in the ring of integers. Equivalently, an element Template:Mvar is prime if, and only if, the principal ideal Template:Math generated by Template:Mvar is a nonzero prime ideal.<ref>Template:Harvnb, as indicated in the remark below the theorem and the proof, the result holds in full generality.</ref> (Note that in an integral domain, the ideal Template:Math is a prime ideal, but Template:Math is an exception in the definition of 'prime element'.)

Interest in prime elements comes from the fundamental theorem of arithmetic, which asserts that each nonzero integer can be written in essentially only one way as 1 or −1 multiplied by a product of positive prime numbers. This led to the study of unique factorization domains, which generalize what was just illustrated in the integers.

Being prime is relative to which ring an element is considered to be in; for example, 2 is a prime element in Template:Math but it is not in Template:Math, the ring of Gaussian integers, since Template:Math and 2 does not divide any factor on the right.

Connection with prime idealsEdit

{{#invoke:Labelled list hatnote|labelledList|Main article|Main articles|Main page|Main pages}} An ideal Template:Math in the ring Template:Math (with unity) is prime if the factor ring Template:Math is an integral domain. Equivalently, Template:Math is prime if whenever <math>ab \in I</math> then either <math>a \in I</math> or <math>b \in I</math>.

In an integral domain, a nonzero principal ideal is prime if and only if it is generated by a prime element.

Irreducible elementsEdit

{{#invoke:Labelled list hatnote|labelledList|Main article|Main articles|Main page|Main pages}} Prime elements should not be confused with irreducible elements. In an integral domain, every prime is irreducible<ref>Template:Harvnb</ref> but the converse is not true in general. However, in unique factorization domains,<ref>Template:Harvnb</ref> or more generally in GCD domains, primes and irreducibles are the same.

ExamplesEdit

The following are examples of prime elements in rings:

The integers Template:Math, Template:Math, Template:Math, Template:Math, Template:Math, ... in the ring of integers Template:Math
the complex numbers Template:Math, Template:Math, and Template:Math in the ring of Gaussian integers Template:Math
the polynomials Template:Math and Template:Math in Template:Math, the ring of polynomials over Template:Math.
2 in the quotient ring Template:Math
Template:Math is prime but not irreducible in the ring Template:Math
In the ring Template:Math of pairs of integers, Template:Math is prime but not irreducible (one has Template:Math).
In the ring of algebraic integers <math>\mathbf Z[\sqrt{-5}],</math> the element Template:Math is irreducible but not prime (as 3 divides <math>9=(2+\sqrt{-5})(2-\sqrt{-5})</math> and 3 does not divide any factor on the right).

ReferencesEdit

Notes

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Sources