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In algebra, an augmentation ideal is an ideal that can be defined in any group ring. If G is a group and R a commutative ring, there is a ring homomorphism ${\displaystyle \varepsilon }$, called the augmentation map, from the group ring

${\displaystyle R[G]}$

to R, defined by taking a sum

${\displaystyle \sum r_{i}g_{i}}$

to

${\displaystyle \sum r_{i}.}$

Here r_i is an element of R and g_i an element of G. The sums are finite, by definition of the group ring. In less formal terms,

${\displaystyle \varepsilon (g)}$

is defined as 1_R whatever the element g in G, and ${\displaystyle \varepsilon }$ is then extended to a homomorphism of R-modules in the obvious way. The augmentation ideal is the kernel of ${\displaystyle \varepsilon }$, and is therefore a two-sided ideal in R[G]. It is generated by the differences

${\displaystyle g-g'}$

of group elements.

Furthermore it is also generated by

${\displaystyle g-1,g\in G}$

which is a basis for the augmentation ideal as a free R module.

For R and G as above, the group ring R[G] is an example of an augmented R-algebra. Such an algebra comes equipped with a ring homomorphism to R. The kernel of this homomorphism is the augmentation ideal of the algebra.

Another class of examples of augmentation ideal can be the kernel of the counit ${\displaystyle \varepsilon }$ of any Hopf algebra.

The augmentation ideal plays a basic role in group cohomology, amongst other applications.

References

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Dummit and Foote, Abstract Algebra