Homotopy Type Theory
suspension > history (Rev #5, changes)
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Idea
The suspension is the universal way to make points into paths.
Definitions
Def 1
The suspension of a type is the higher inductive type with the following generators
- A point
- A point
- A function
Def 2
The suspension of a type is a the pushout of .
These two definitions are equivalent.
References
Revision on June 8, 2022 at 02:11:54 by
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