Free abelian group: Difference between revisions

Definition

Expressive definition

This is not the rigorous definition, but is the one that is most useful for explicit expressions and computations.

Suppose ${\displaystyle A}$ is a set (with no additional structure necessary). The free abelian group on ${\displaystyle A}$ (or the free abelian group with generating set ${\displaystyle A}$) is a group whose elements are defined as formal finite ${\displaystyle \mathbb {Z} }$-linear combinations of elements of ${\displaystyle A}$, i.e., finite sums of the form:

${\displaystyle m=\sum _{a\in A}m_{a}a}$

where ${\displaystyle m_{a}\in \mathbb {Z} }$ for all ${\displaystyle a}$ and ${\displaystyle m_{a}\neq 0}$ for only finitely many ${\displaystyle a\in A}$. The addition rule is as follows: we group together coefficients of the same element of ${\displaystyle A}$. Thus, if ${\displaystyle m=\sum _{a\in A}m_{a}a}$ and ${\displaystyle n=\sum _{a\in A}n_{a}a}$, then ${\displaystyle m+n=\sum _{a\in A}(m_{a}+n_{a})a}$.

When writing a formal sum, we ignore all the terms with zero coefficient, and use subtraction to denote the addition of something with a negative coefficient (so ${\displaystyle a+(-1)b}$ is written as ${\displaystyle a-b}$).

Note that if ${\displaystyle A}$ already had an additive structure, that structure is ignored for our purposes. A more precise formulation of this would be to not use the elements of ${\displaystyle A}$ themselves but a generating set equipped with a bijection to ${\displaystyle A}$; however, this extra layer of formality is often unnecessary.

Examples

Group	Freely generating set for which it can be viewed as a free abelian group	Proof/explanation
group ${\displaystyle C_{n}(X)}$ of singular n-chains in the singular chain complex of a topological space ${\displaystyle X}$	set ${\displaystyle S_{n}(X)}$ of singular n-simplices	by definition
group ${\displaystyle C_{0}(X)}$ of singular 0-chains of a topological space ${\displaystyle X}$	underlying set of ${\displaystyle X}$	by definition plus the observation that ${\displaystyle S_{0}(X)}$ is canonically identified with ${\displaystyle X}$.
zeroth homology group	set of path components	zeroth homology group is free on set of path components