Topology/Deformation Retract

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The purpose of this construction is to shrink down some of the topologically irrelevant wiggles of a space, or otherwise simplify to help find basic properties.

A deformation retraction is a stronger property where a homotopy exists that takes the identity to a retraction.

For example there is a deformation retraction of an open ended cylinder to a circle, despite the fact that they are not homeomorphic. There are some topological properties preserved in this way and they are of interest in algebraic topology.

The disc has a deformation retraction to a point, where ${\displaystyle r}$ maps everything to that point and the embedding ${\displaystyle \iota }$ just fixes that point. Any space that deformation retracts to a point is called contractable.

As just mentioned, ${\displaystyle S^1}$ is a deformation retract of ${\displaystyle [0,1]\times S^1}$. Note that this is a one way statement, since ${\displaystyle [0,1]\times S^1\subset ̸S^1}$. More generally we can say that we can `divide out' by terms that are contractable in a Cartesian product. So the unit n-cube is always contractable.

1. Find, explicitly, a deformation retraction from the unit n-cube to the point.

2. Although deformation retractions are not reflexive, show that they are transitive.

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