Homology theory

Definition

Let ${\displaystyle C}$ be the category of compact polyhedral pairs. A homology theory on ${\displaystyle C}$ is defined as follows.

Data

• For every nonnegative integer ${\displaystyle n}$, a functor ${\displaystyle H_{n}:C\to Ab}$ where ${\displaystyle Ab}$ denotes the category of Abelian groups
• For every positive integer, a natural transformation ${\displaystyle \partial _{n}:H_{n}\to H_{n-1}\circ R}$ where ${\displaystyle R}$ is the functor that sends ${\displaystyle (X,A)}$ to ${\displaystyle (A,\emptyset )}$.

Axioms

• Homotopy axiom: If ${\displaystyle f_{0},f_{1}:(X,A)\to (Y,B)}$ are homotopic, then ${\displaystyle H_{n}(f_{0})=H_{n}(f_{1})}$
• Exactness axiom: For every pair ${\displaystyle (X,A)}$ with inclusions ${\displaystyle (A,\emptyset )\to (X,\emptyset )\to (X,A)}$, there is a long exact sequence:

${\displaystyle \ldots \to H_{n}(A,\emptyset )\to H_{n}(X,\emptyset )\to H_{n}(X,A)\to H_{n-1}(A,\emptyset )\to \ldots }$

• Excision axiom: For every open subset ${\displaystyle U}$ whose closure lies in the interior of ${\displaystyle A}$, the map of homotopy groups induced by the inclusion ${\displaystyle (X-U,A-U)\to (X,A)}$ is an isomorphism
• Dimension axiom: If ${\displaystyle X}$ is a one-point space, then ${\displaystyle H_{n}(X,\emptyset )}$ is trivial for all ${\displaystyle n>0}$. One calls ${\displaystyle H_{0}(X,\emptyset )}$ the coefficient group of the homology theory.

For a homology theory, the homology of a topological space ${\displaystyle X}$ is defined as the homology of the pair ${\displaystyle (X,\emptyset )}$.