Characteristic (algebra)

In mathematics, the characteristic of a ring , often denoted , is defined to be the smallest positive number of copies of the ring's multiplicative identity () that will sum to the additive identity (). If no such number exists, the ring is said to have characteristic zero.

That is, is the smallest positive number such that:
: $\underbrace_ = 0$
if such a number exists, and otherwise.

Motivation

The special definition of the characteristic zero is motivated by the equivalent definitions characterized in the next section, where the characteristic zero is not required to be considered separately.

The characteristic may also be taken to be the exponent of the ring's additive group, that is, the smallest positive integer such that:

: $\underbrace_ = 0$
for every element of the ring (again, if exists; otherwise zero). This definition applies in the more general class of rngs (see '); for (unital) rings the two definitions are equivalent due to their distributive law.

Equivalent characterizations

* The characteristic of a ring is the natural number such that is the kernel of the unique ring homomorphism from $\mathbb$ to .
* The characteristic is the natural number such that contains a subring isomorphic to the factor ring $\mathbb/n\mathbb$, which is the image of the above homomorphism.
* When the non-negative integers are partially ordered by divisibility, then is the smallest and is the largest. Then the characteristic of a ring is the smallest value of for which . If nothing "smaller" (in this ordering) than will suffice, then the characteristic is . This is the appropriate partial ordering because of such facts as that is the least common multiple of and , and that no ring homomorphism exists unless divides .
* The characteristic of a ring is precisely if the statement for all implies that is a multiple of .

Case of rings

If and are rings and there exists a ring homomorphism , then the characteristic of divides the characteristic of . This can sometimes be used to exclude the possibility of certain ring homomorphisms. The only ring with characteristic is the zero ring, which has only a single element . If a nontrivial ring does not have any nontrivial zero divisors, then its characteristic is either or prime. In particular, this applies to all fields, to all integral domains, and to all division rings. Any ring of characteristic zero is infinite.

The ring $\mathbb/n\mathbb$ of integers modulo has characteristic . If is a subring of , then and have the same characteristic. For example, if is prime and is an irreducible polynomial with coefficients in the field $\mathbb F_p$ with elements, then the quotient ring \mathbb F_p (q(X)) is a field of characteristic . Another example: The field $\mathbb$ of complex numbers contains $\mathbb$, so the characteristic of $\mathbb$ is .

A $\mathbb/n\mathbb$-algebra is equivalently a ring whose characteristic divides . This is because for every ring there is a ring homomorphism $\mathbb\to R$, and this map factors through $\mathbb/n\mathbb$ if and only if the characteristic of divides . In this case for any in the ring, then adding to itself times gives .

If a commutative ring has ''prime characteristic'' , then we have for all elements and in – the normally incorrect " freshman's dream" holds for power .
The map then defines a ring homomorphism , which is called the '' Frobenius homomorphism''. If is an integral domain it is injective.

Case of fields

As mentioned above, the characteristic of any field is either or a prime number. A field of non-zero characteristic is called a field of ''finite characteristic'' or ''positive characteristic'' or ''prime characteristic''. The ''characteristic exponent'' is defined similarly, except that it is equal to when the characteristic is ; otherwise it has the same value as the characteristic.

Any field has a unique minimal subfield, also called its prime field. This subfield is isomorphic to either the rational number field $\mathbb$ or a finite field $\mathbb F_p$ of prime order. Two prime fields of the same characteristic are isomorphic, and this isomorphism is unique. In other words, there is essentially a unique prime field in each characteristic.

Fields of characteristic zero

The fields of ''characteristic zero'' are those that have a subfield isomorphic to the field of the rational numbers. The most common of such fields are the subfields of the field of the complex numbers; this includes the real numbers $\mathbb$ and all algebraic number fields.

Other fields of characteristic zero are the p-adic fields that are widely used in number theory.

Fields of rational fractions over the integers or a field of characteristic zero are other common examples.

Ordered fields always have characteristic zero; they include $\mathbb$ and $\mathbb.$

Fields of prime characteristic

The finite field has characteristic .

There exist infinite fields of prime characteristic. For example, the field of all rational functions over $\mathbb/p\mathbb$, the algebraic closure of $\mathbb/p\mathbb$ or the field of formal Laurent series $\mathbb/p\mathbb((T))$.

The size of any finite ring of prime characteristic is a power of . Since in that case it contains $\mathbb/p\mathbb$ it is also a vector space over that field, and from linear algebra we know that the sizes of finite vector spaces over finite fields are a power of the size of the field. This also shows that the size of any finite vector space is a prime power.

See also

* Ring of mixed characteristic

Notes

References

Sources

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Ring theory
Field (mathematics)