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(Top) 1 Definition 2 Universal property 3 Augmentation 4 Examples 5 Generalization 6 See also 7 References 8 Further reading

Monoid ring

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Inabstract algebra, a monoid ring is a ring constructed from a ring and a monoid, just as a group ring is constructed from a ring and a group.

Definition

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Let R be a ring and let G be a monoid. The monoid ring or monoid algebraofG over R, denoted R[G] or RG, is the set of formal sums $\sum _{g\in G}r_{g}g$ , where $r_{g}\in R$ for each $g\in G$ and r_g = 0 for all but finitely many g, equipped with coefficient-wise addition, and the multiplication in which the elements of R commute with the elements of G. More formally, R[G] is the free R-module on the set G, endowed with R-linear multiplication defined on the base elements by g·h := gh, where the left-hand side is understood as the multiplication in R[G] and the right-hand side is understood in G.

Alternatively, one can identify the element ${\displaystyle g\in R[$ with the function e_g that maps g to 1 and every other element of G to 0. This way, R[G] is identified with the set of functions φ: G → R such that {g : φ(g) ≠ 0} is finite. equipped with addition of functions, and with multiplication defined by

{\displaystyle (\phi \psi )(

IfG is a group, then R[G] is also called the group ringofG over R.

Universal property

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Given R and G, there is a ring homomorphism α: R → R[G] sending each rtor1 (where 1 is the identity element of G), and a monoid homomorphism β: G → R[G] (where the latter is viewed as a monoid under multiplication) sending each g to 1g (where 1 is the multiplicative identity of R). We have that α(r) commutes with β(g) for all rinR and ginG.

The universal property of the monoid ring states that given a ring S, a ring homomorphism α': R → S, and a monoid homomorphism β': G → S to the multiplicative monoid of S, such that α'(r) commutes with β'(g) for all rinR and ginG, there is a unique ring homomorphism γ: R[G] → S such that composing α and β with γ produces α' and β '.

Augmentation

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The augmentation is the ring homomorphism η: R[G] → R defined by

\eta \left(\sum _{g\in G}r_{g}g\right)=\sum _{g\in G}r_{g}.

The kernelofη is called the augmentation ideal. It is a free R-module with basis consisting of 1 – g for all ginG not equal to 1.

Examples

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Given a ring R and the (additive) monoid of natural numbers N (or {xⁿ} viewed multiplicatively), we obtain the ring R[{xⁿ}] =: R[x] of polynomials over R. The monoid Nⁿ (with the addition) gives the polynomial ring with n variables: R[Nⁿ] =: R[X₁, ..., X_n].

Generalization

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IfG is a semigroup, the same construction yields a semigroup ring R[G].

References

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Lang, Serge (2002). Algebra. Graduate Texts in Mathematics. Vol. 211 (Rev. 3rd ed.). New York: Springer-Verlag. ISBN 0-387-95385-X.