Singular chain complex functor

Definition

The singular chain complex functor is a functor from the category of topological spaces with continuous maps to the category of chain complexes with chain maps defined as follows.

Aspect	Input	Output
Objects	topological space ${\displaystyle X}$	the singular chain complex ${\displaystyle C_{*}(X)}$
Morphisms	continuous map ${\displaystyle f:X\to Y}$	We first define an induced map ${\displaystyle S_{n}(X)\to S_{n}(Y)}$ between the sets of singular n-simplices. The map is defined as follows: ${\displaystyle g\in S_{n}(X)}$ (a continuous map from the standard n-simplex to ${\displaystyle X}$) is sent to ${\displaystyle f\circ g}$, which is an element of ${\displaystyle S_{n}(Y)}$. We extend this to a group homomorphism from ${\displaystyle C_{n}(X)}$ to ${\displaystyle C_{n}(Y)}$ using the fact that ${\displaystyle C_{n}(X)}$ and ${\displaystyle C_{n}(Y)}$ are the free abelian groups on ${\displaystyle S_{n}(X)}$ and ${\displaystyle S_{n}(Y)}$ respectively. This homomorphism is what we denote by ${\displaystyle C_{n}(f)}$ ${\displaystyle C(f)}$ is the bunch of ${\displaystyle C_{n}(f)}$ maps.

To show that this is well-defined, we need to show the following:

Compatibility condition in broad terms	Compatibility condition in explicit terms	Why it is true
well defined, i.e., ${\displaystyle C(f)}$ is a chain map	${\displaystyle \partial _{n}\circ C_{n}(f)=C_{n-1}(f)\circ \partial _{n}}$	See continuous map of topological spaces induces chain map of corresponding singular chain complexes
identity goes to identity	${\displaystyle C_{n}(id)=id}$ for all ${\displaystyle n}$, where ${\displaystyle id}$ represents the identity map.	Direct from definition
composites go to composites	${\displaystyle C_{n}(f\circ g)=C_{n}(f)\circ C_{n}(g)}$ where ${\displaystyle f,g}$ are composable continuous maps.	composite of continuous maps induces composite of chain maps