Ring homomorphism

Template:Short description Template:Ring theory sidebar

In mathematics, a ring homomorphism is a structure-preserving function between two rings. More explicitly, if R and S are rings, then a ring homomorphism is a function Template:Nowrap that preserves addition, multiplication and multiplicative identity; that is,Template:Sfn Template:Sfn Template:Sfn Template:Sfn Template:Sfn

<math>\begin{align}

f(a+b)&= f(a) + f(b),\\ f(ab) &= f(a)f(b), \\ f(1_R) &= 1_S, \end{align}</math> for all a, b in R.

These conditions imply that additive inverses and the additive identity are also preserved.

If, in addition, Template:Itco is a bijection, then its inverse Template:Itco⁻¹ is also a ring homomorphism. In this case, Template:Itco is called a ring isomorphism, and the rings R and S are called isomorphic. From the standpoint of ring theory, isomorphic rings have exactly the same properties.

If R and S are [[rng (algebra)|Template:Not a typo]]s, then the corresponding notion is that of a Template:Not a typo homomorphism,Template:Efn defined as above except without the third condition f(1_R) = 1_S. A Template:Not a typo homomorphism between (unital) rings need not be a ring homomorphism.

The composition of two ring homomorphisms is a ring homomorphism. It follows that the rings forms a category with ring homomorphisms as morphisms (see Category of rings). In particular, one obtains the notions of ring endomorphism, ring isomorphism, and ring automorphism.

PropertiesEdit

Let Template:Nowrap be a ring homomorphism. Then, directly from these definitions, one can deduce:

f(0_R) = 0_S.
f(−a) = −f(a) for all a in R.
For any unit a in R, f(a) is a unit element such that Template:Nowrap. In particular, f induces a group homomorphism from the (multiplicative) group of units of R to the (multiplicative) group of units of S (or of im(f)).
The image of f, denoted im(f), is a subring of S.
The kernel of f, defined as Template:Nowrap, is a two-sided ideal in R. Every two-sided ideal in a ring R is the kernel of some ring homomorphism.
A homomorphism is injective if and only if its kernel is the zero ideal.
The characteristic of S divides the characteristic of R. This can sometimes be used to show that between certain rings R and S, no ring homomorphism Template:Nowrap exists.
If R_p is the smallest subring contained in R and S_p is the smallest subring contained in S, then every ring homomorphism Template:Nowrap induces a ring homomorphism Template:Nowrap.
If R is a division ring and S is not the zero ring, then Template:Itco is injective.
If both R and S are fields, then im(f) is a subfield of S, so S can be viewed as a field extension of R.
If I is an ideal of S then Template:Itco⁻¹(I) is an ideal of R.
If R and S are commutative and P is a prime ideal of S then Template:Itco⁻¹(P) is a prime ideal of R.
If R and S are commutative, M is a maximal ideal of S, and Template:Itco is surjective, then Template:Itco⁻¹(M) is a maximal ideal of R.
If R and S are commutative and S is an integral domain, then ker(f) is a prime ideal of R.
If R and S are commutative, S is a field, and Template:Itco is surjective, then ker(f) is a maximal ideal of R.
If Template:Itco is surjective, P is prime (maximal) ideal in R and Template:Nowrap, then f(P) is prime (maximal) ideal in S.

Moreover,

The composition of ring homomorphisms Template:Nowrap and Template:Nowrap is a ring homomorphism Template:Nowrap.
For each ring R, the identity map Template:Nowrap is a ring homomorphism.
Therefore, the class of all rings together with ring homomorphisms forms a category, the category of rings.
The zero map Template:Nowrap that sends every element of R to 0 is a ring homomorphism only if S is the zero ring (the ring whose only element is zero).
For every ring R, there is a unique ring homomorphism Template:Nowrap. This says that the ring of integers is an initial object in the category of rings.
For every ring R, there is a unique ring homomorphism from R to the zero ring. This says that the zero ring is a terminal object in the category of rings.
As the initial object is not isomorphic to the terminal object, there is no zero object in the category of rings; in particular, the zero ring is not a zero object in the category of rings.

ExamplesEdit

The function Template:Nowrap, defined by Template:Nowrap is a surjective ring homomorphism with kernel nZ (see Modular arithmetic).
The complex conjugation Template:Nowrap is a ring homomorphism (this is an example of a ring automorphism).
For a ring R of prime characteristic p, Template:Nowrap is a ring endomorphism called the Frobenius endomorphism.
If R and S are rings, the zero function from R to S is a ring homomorphism if and only if S is the zero ring (otherwise it fails to map 1_R to 1_S). On the other hand, the zero function is always a Template:Not a typo homomorphism.
If R[X] denotes the ring of all polynomials in the variable X with coefficients in the real numbers R, and C denotes the complex numbers, then the function Template:Nowrap defined by Template:Nowrap (substitute the imaginary unit i for the variable X in the polynomial p) is a surjective ring homomorphism. The kernel of f consists of all polynomials in R[X] that are divisible by Template:Nowrap.
If Template:Nowrap is a ring homomorphism between the rings R and S, then f induces a ring homomorphism between the matrix rings Template:Nowrap.
Let V be a vector space over a field k. Then the map Template:Nowrap given by Template:Nowrap is a ring homomorphism. More generally, given an abelian group M, a module structure on M over a ring R is equivalent to giving a ring homomorphism Template:Nowrap.
A unital algebra homomorphism between unital associative algebras over a commutative ring R is a ring homomorphism that is also R-linear.

Non-examplesEdit

The function Template:Nowrap defined by Template:Nowrap is not a ring homorphism, but is a Template:Not a typo homomorphism (and Template:Not a typo endomorphism), with kernel 3Z/6Z and image 2Z/6Z (which is isomorphic to Z/3Z).
There is no ring homomorphism Template:Nowrap for any Template:Nowrap.
If R and S are rings, the inclusion Template:Nowrap that sends each r to (r,0) is a rng homomorphism, but not a ring homomorphism (if S is not the zero ring), since it does not map the multiplicative identity 1 of R to the multiplicative identity (1,1) of Template:Nowrap.

Category of ringsEdit

{{#invoke:Labelled list hatnote|labelledList|Main article|Main articles|Main page|Main pages}}

Endomorphisms, isomorphisms, and automorphismsEdit

A ring endomorphism is a ring homomorphism from a ring to itself.
A ring isomorphism is a ring homomorphism having a 2-sided inverse that is also a ring homomorphism. One can prove that a ring homomorphism is an isomorphism if and only if it is bijective as a function on the underlying sets. If there exists a ring isomorphism between two rings R and S, then R and S are called isomorphic. Isomorphic rings differ only by a relabeling of elements. Example: Up to isomorphism, there are four rings of order 4. (This means that there are four pairwise non-isomorphic rings of order 4 such that every other ring of order 4 is isomorphic to one of them.) On the other hand, up to isomorphism, there are eleven [[Rng (algebra)|Template:Not a typo]]s of order 4.
A ring automorphism is a ring isomorphism from a ring to itself.

Monomorphisms and epimorphismsEdit

Injective ring homomorphisms are identical to monomorphisms in the category of rings: If Template:Nowrap is a monomorphism that is not injective, then it sends some r₁ and r₂ to the same element of S. Consider the two maps g₁ and g₂ from Z[x] to R that map x to r₁ and r₂, respectively; Template:Nowrap and Template:Nowrap are identical, but since Template:Itco is a monomorphism this is impossible.

However, surjective ring homomorphisms are vastly different from epimorphisms in the category of rings. For example, the inclusion Template:Nowrap with the identity mapping is a ring epimorphism, but not a surjection. However, every ring epimorphism is also a strong epimorphism, the converse being true in every category.Template:Cn