Contents

Idea

The free abelian group $\mathbb{Z}[S]$ on a set $S$ is the abelian group whose elements are formal $\mathbb{Z}$-linear combinations of elements of $S$.

Definition

Of course, this notion is meant to be invariant under isomorphism: it doesn’t depend on the left adjoint chosen. Thus, if a functor of the form $\hom_{Set}(S, U-): Ab \to Set$ is representable by an abelian group $A$, then we may say $A$ is a free abelian group on $S$. A specific choice of isomorphism

corresponds, via the Yoneda lemma, to a function $S \to U A$ which exhibits $S$, or rather its image under this function, as a specific basis of $A$. If $A$ is so equipped with such a universal arrow $S \to U A$, then it is harmless to call $A$ “the” free abelian group on $S$.

Explicit descriptions of free abelian groups are discussed below.

Properties

In terms of formal linear combinations

Basic properties

This follows, for instance, from the above expression (Prop. ) of free abelian groups as groups of formal linear combinations.

Subgroups

(e.g. Lang 02, Appendix 2 §2, page 880) For a full proof see at principal ideal domain this theorem.

Examples

• The free abelian group on the singular simplicial complex of a topological space $X$ consists of the singular chains on $X$.

• For $R$ a ring and $S$ a set, the tensor product of abelian groups $\mathbb{Z}[S] \otimes R$ is the free module over $R$ on the basis $S$. If $R = k$ is a field, then this is the vector space over $k$ with basis $S$.

• For $R$ a ring, the tensor product of abelian groups $\mathbb{Z}[\mathbb{N}]\otimes R$ is the abelian group underlying the ring of polynomials over $R$.

Related concepts

• free group

• free commutative monoid

• free simplicial abelian group

References

Textbook accounts:

• Serge Lang, Algebra, Graduate Texts in Mathematics 211 (Revised third ed.), Springer. 2002