Algebraic structure → Ring theory Ring theory 

In mathematics, a ring homomorphism is a structurepreserving function between two rings. More explicitly, if R and S are rings, then a ring homomorphism is a function that preserves addition, multiplication and multiplicative identity; that is,^{[1]}^{[2]}^{[3]}^{[4]}^{[5]}
for all in
These conditions imply that additive inverses and the additive identity are preserved too.
If in addition f is a bijection, then its inverse f^{−1} is also a ring homomorphism. In this case, f 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 rngs, then the corresponding notion is that of a rng homomorphism,^{[a]} defined as above except without the third condition f(1_{R}) = 1_{S}. A rng 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.
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Abstract Algebra  Ring homomorphisms

28. Ring Homomorphism and Ring Isomorphism  Introduction (Definition & Example)

Ring Homomorphisms and Ideals Part 1

RNT1.3. Ring Homomorphisms

Abstract Algebra  Properties and examples of ring homomorphisms.
Transcription
Properties
Let f : R → S 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 f(a)^{−1} = f(a^{−1}) . 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 ker(f) = {a in R  f(a) = 0_{S}}, is a twosided ideal in R. Every twosided ideal in a ring R is the kernel of some ring homomorphism.
 A homomorphism is injective if and only if 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 R → S 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 f : R → S induces a ring homomorphism f_{p} : R_{p} → S_{p}.
 If R is a field (or more generally a skewfield) and S is not the zero ring, then f 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 f^{−1}(I) is an ideal of R.
 If R and S are commutative and P is a prime ideal of S then f^{−1}(P) is a prime ideal of R.
 If R and S are commutative, M is a maximal ideal of S, and f is surjective, then f^{−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 f is surjective, then ker(f) is a maximal ideal of R.
 If f is surjective, P is prime (maximal) ideal in R and ker(f) ⊆ P, then f(P) is prime (maximal) ideal in S.
Moreover,
 The composition of ring homomorphisms S → T and R → S is a ring homomorphism R → T.
 For each ring R, the identity map R → R is a ring homomorphism.
 Therefore, the class of all rings together with ring homomorphisms forms a category, the category of rings.
 The zero map R → S 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 Z → R. 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.
Examples
 The function f : Z → Z/nZ, defined by f(a) = [a]_{n} = a mod n is a surjective ring homomorphism with kernel nZ (see modular arithmetic).
 The complex conjugation C → C is a ring homomorphism (this is an example of a ring automorphism).
 For a ring R of prime characteristic p, R → R, x → x^{p} 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 rng 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 f : R[X] → C defined by f(p) = p(i) (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 X^{2} + 1.
 If f : R → S is a ring homomorphism between the rings R and S, then f induces a ring homomorphism between the matrix rings M_{n}(R) → M_{n}(S).
 Let V be a vector space over a field k. Then the map ρ : k → End(V) given by ρ(a)v = av 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 R → End(M).
 A unital algebra homomorphism between unital associative algebras over a commutative ring R is a ring homomorphism that is also Rlinear.
Nonexamples
 The function f : Z/6Z → Z/6Z defined by f([a]_{6}) = [4a]_{6} is a rng homomorphism (and rng endomorphism), with kernel 3Z/6Z and image 2Z/6Z (which is isomorphic to Z/3Z).
 There is no ring homomorphism Z/nZ → Z for any n ≥ 1.
 If R and S are rings, the inclusion R → R × S 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 R × S.
Category of rings
Endomorphisms, isomorphisms, and automorphisms
 A ring endomorphism is a ring homomorphism from a ring to itself.
 A ring isomorphism is a ring homomorphism having a 2sided 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 nonisomorphic 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 rngs of order 4.
 A ring automorphism is a ring isomorphism from a ring to itself.
Monomorphisms and epimorphisms
Injective ring homomorphisms are identical to monomorphisms in the category of rings: If f : R → S is a monomorphism that is not injective, then it sends some r_{1} and r_{2} to the same element of S. Consider the two maps g_{1} and g_{2} from Z[x] to R that map x to r_{1} and r_{2}, respectively; f ∘ g_{1} and f ∘ g_{2} are identical, but since f is a monomorphism this is impossible.
However, surjective ring homomorphisms are vastly different from epimorphisms in the category of rings. For example, the inclusion Z ⊆ Q is a ring epimorphism, but not a surjection. However, they are exactly the same as the strong epimorphisms.
See also
Notes
 ^ Some authors use the term "ring" to refer to structures that do not require a multiplicative identity; instead of "rng", "ring", and "rng homomorphism", they use the terms "ring", "ring with identity", and "ring homomorphism", respectively. Because of this, some other authors, to avoid ambiguity, explicitly specify that rings are unital and that homomorphisms preserve the identity.
Citations
 ^ Artin 1991, p. 353
 ^ Eisenbud 1995, p. 12
 ^ Jacobson 1985, p. 103
 ^ Lang 2002, p. 88
 ^ Hazewinkel 2004, p. 3
References
 Artin, Michael (1991). Algebra. Englewood Cliffs, N.J.: Prentice Hall.
 Atiyah, Michael F.; Macdonald, Ian G. (1969), Introduction to commutative algebra, AddisonWesley Publishing Co., Reading, Mass.LondonDon Mills, Ont., MR 0242802
 Bourbaki, N. (1998). Algebra I, Chapters 1–3. Springer.
 Eisenbud, David (1995). Commutative algebra with a view toward algebraic geometry. Graduate Texts in Mathematics. Vol. 150. New York: SpringerVerlag. xvi+785. ISBN 0387942688. MR 1322960.
 Hazewinkel, Michiel (2004). Algebras, rings and modules. SpringerVerlag. ISBN 1402026900.
 Jacobson, Nathan (1985). Basic algebra I (2nd ed.). ISBN 9780486471891.
 Lang, Serge (2002), Algebra, Graduate Texts in Mathematics, vol. 211 (Revised third ed.), New York: SpringerVerlag, ISBN 9780387953854, MR 1878556