
Oops! Sorry for the typos! Fixing that below. Hi All, My understanding is that a functor in Haskell is made of two "maps". One that maps objects to objects that in Hask means types into types (i.e. a type constructor) And one that maps arrows into arrows, i.e. fmap. My understanding is that a functor F in category theory is required to preserve the domain and codomain of arrows, but it doesn't have to be injective. In other words, two objects X and Y of category C (i.e. two types in Hask) can be mapped into the same object Z (same type) in category D. As long as the "homomorphism" law holds: F(f:X->Y) = F(f):F(X)->F(Y) However, I don't think there is any way this mapping of types cannot be injective in Haskell. It seems that a type constructor, when called with two distinct type will always yield another two *distinct* types. (E.g. Int and Double yield Maybe Int and Maybe Double) So, it seems that Functors in Haskell are actually more restrictive than functors can be in general. Is this observation correct or did I misunderstand something? Thanks! Dimitri Em 05/07/14 02:42, Dimitri DeFigueiredo escreveu:
Hi All,
My understanding is that a functor in Haskell is made of two "maps". One that maps objects to objects that in Hask means types into types (i.e. a type constructor) And one that maps arrows into arrows, i.e. fmap.
My understanding is that a functor F in category theory is required to preserve the domain and codomain of arrows, but it doesn't have to be injective. In other words, two objects X and Y of category C (i.e. two types in Hask) can be mapped into the same object Z (same type) in category Z. As long as the "homomorphism" law holds:
F(f:X->Y) = F(f):F(X)->F(Y)
However, I don't think there is any way this mapping of types cannot be injective in Haskell. It seems that a type constructor, when called with two distinct type will always yield another two *distinct* types. (E.g. Int and Fload yield Maybe Int and Maybe) So, it seems that Functors in Haskell are actually more restrictive than functors can be in general. Is this observation correct or did I misunderstand something?
Thanks!
Dimitri
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