Nose cone design

In mathematics, in particular homotopy theory, a continuous mapping

${\displaystyle i\colon A\to X}$,

where A and X are topological spaces, is a cofibration if it satisfies the homotopy extension property with respect to all spaces Y. The name is because the dual condition, the homotopy lifting property, defines fibrations. For a more general notion of cofibration see the article about model categories.

Basic theorems

• For Hausdorff spaces a cofibration is a closed inclusion (injective with closed image); for suitable spaces, a converse holds
• Every map can be replaced by a cofibration via the mapping cylinder construction
• There is a cofibration (A, X), if and only if there is a retraction from

${\displaystyle X\times I}$

to

${\displaystyle (A\times I)\cup (X\times \{0\})}$,

since this is the pushout and thus induces maps to every space sensible in the diagram.

Examples

• Cofibrations are preserved under push-outs and composition, as one sees from the definition via diagram-chasing.
• A frequently used fact is that a cellular inclusion is a cofibration (so, for instance, if ${\displaystyle (X,A)}$ is a CW pair, then ${\displaystyle A\to X}$ is a cofibration). This follows from the previous fact since ${\displaystyle S^{n-1}\to D^{n}}$ is a cofibration for every ${\displaystyle n}$.

References

• Peter May, "A Concise Course in Algebraic Topology" : chapter 6 defines and discusses cofibrations, and they are used throughout

Template:Topology-stub