Homotopy Type Theory map in a dagger 2-poset > history (Rev #3, changes)

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Definition

A morphism f:hom A(a,b)f:hom_A(a,b) of a dagger 2-poset AA is a map if it is a functional and entire dagger morphism.

The type of all maps in hom A(a,b)hom_A(a,b) is defined as

Map(a,b) f:hom A(a,b)isFunctional(f)×isEntire(f)Map(a, b) \coloneqq \sum_{f:hom_A(a,b)} isFunctional(f) \times isEntire(f)

Map(a,b) f:hom A(a,b)isFunctional(f)×isEntire(f)Map(a, b) \coloneqq \sum_{f:hom_A(a,b)} isFunctional(f) \times isEntire(f)

See also

category: category theory

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