Section4.2Chain Complexes

Definition4.2.1Chain complex of a simplicial set

Let \(A \in S(\cA)\) and define the associated chain complex \(CA\) to have \(CA_n = A_n\) with differential \(\rd_n = \sum (-1)^i \dd_i\).

Example4.2.2

\(C_\bullet(X; \ZZ) = C\ZZ\Sing X\).

Remark4.2.3

Kozul complexes and Cech complexes can be seen as coming from semi-simplicial sets, i.e. those without degeneracies.

Definition4.2.4Normalised chain complexes

The normalised chain complex\(NA\) of a simplicial object is \(NA_n = \bigcap_{i=0}^{n-1} \ker(\dd_i)\) with \(\rd_n = (-1)^n \dd_n\).

In fact we have \(NA \simeq CA\). And then we have:

Theorem4.2.5Dold-Kan

\(N\) induces an equivalence of categories \(s(\cA) \to \Ch_{\ge 0}(\cA)\).

Proof