Irreducible element

In abstract algebra, a non-zero non-unit element in an integral domain is said to be irreducible if it is not a product of two non-units.

Relationship with prime elements

Irreducible elements should not be confused with prime elements. (A non-zero non-unit element $a$ in a commutative ring $R$ is called prime if, whenever $a|bc$ for some $b$ and $c$ in $R,$ then $a|b$ or $a|c.)$ In an integral domain, every prime element is irreducible,^[1]^[2] but the converse is not true in general. The converse is true for unique factorization domains^[2] (or, more generally, GCD domains.)

Moreover, while an ideal generated by a prime element is a prime ideal, it is not true in general that an ideal generated by an irreducible element is an irreducible ideal. However, if $D$ is a GCD domain, and $x$ is an irreducible element of $D$ , then the ideal generated by $x$ is a prime ideal of $D$ .^[3]

Example

In the quadratic integer ring $\mathbf {Z} [{\sqrt {-5}}],$ it can be shown using norm arguments that the number 3 is irreducible. However, it is not a prime element in this ring since, for example,

3\mid \left(2+{\sqrt {-5}}\right)\left(2-{\sqrt {-5}}\right)=9,

but $3$ does not divide either of the two factors.^[4]

References

↑ Consider $p$ a prime that is reducible: $p=ab.$ Then $p|ab\Rightarrow p|a$ or $p|b.$ Say $p|a\Rightarrow a=pc,$ then we have $p=ab=pcb\Rightarrow p(1-cb)=0.$ Because $R$ is an integral domain we have $cb=1.$ So $b$ is a unit and $p$ is irreducible.
1 2 Sharpe (1987) p.54
↑ http://planetmath.org/encyclopedia/IrreducibleIdeal.html
↑ William W. Adams and Larry Joel Goldstein (1976), Introduction to Number Theory, p. 250, Prentice-Hall, Inc., ISBN 0-13-491282-9

Sharpe, David (1987). Rings and factorization. Cambridge University Press. ISBN 0-521-33718-6. Zbl 0674.13008.

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Irreducible element

Relationship with prime elements

Example

See also

References