Singular chain complex: Difference between revisions

Template:Chain complex

Definition

Symbol-free definition

The singular chain complex (or total singular chain complex, to distinguish it from the normalized singular complex) associated with a topological space is defined as the following chain complex of Abelian groups:

• The ${\displaystyle n^{th}}$ member of this complex is the ${\displaystyle n^{th}}$ chain group, or the group of singular n-chains. This is essentially the free Abelian group on the set of all singular n-simplices.

• The boundary map goes from the ${\displaystyle n^{th}}$ chain group to the ${\displaystyle (n-1{)}^{th}}$ chain group, and it essentially sends each singular simplex to a signed sum of its codimension one faces.

Definition with symbols

Variations

• Augmented singular chain complex
• Normalized singular chain complex
• Relative singular chain complex

Functoriality

On the category of topological spaces

Further information: Total singular complex functor

The total singular complex is a functor from the category of topological spaces with continuous maps to the category of chain complexes with chain maps. The functor associates to a continuous map ${\displaystyle f:X\to Y}$ to a map ${\displaystyle C_n(f):C_n(X)\to C_n(Y)}$ as follows. ${\displaystyle C_n(f)}$ sends a singular ${\displaystyle n}$-simplex ${\displaystyle \sigma <math>to<math>f\circ \sigma }$, and more generally sends ${\displaystyle \sum a_{\sigma }\sigma }$ to ${\displaystyle \sum a_{\sigma }f\circ \sigma }$.

On the 2-category of topological spaces

Further information: Total singular complex 2-functor

Consider the 2-category of topological spaces with continuous maps and homotopies. Then the total singular complex is a 2-functor from this category to the 2-category of chain complexes with chain maps and chain homotopies.

This fact implies in particular that the homology of the total singular complex is homotopy-invariant.