Difference between revisions of "Category theory/Natural transformation"
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Example:
EndreyMark (talk | contribs) m (→Commutativity of the diagram: Format caption (no more a caption)) |
EndreyMark (talk | contribs) m (Fix empty line tricks at tables) |
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{| Border=2 CellPadding=2 CellSpacing=2 |
{| Border=2 CellPadding=2 CellSpacing=2 |
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| ⚫ | |||
|+ <math>\Phi(f) : \Phi(X) \to \Phi(Y)</math> |
|+ <math>\Phi(f) : \Phi(X) \to \Phi(Y)</math> |
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| ⚫ | |||
| <hask>map even:: Maybe Int -> Maybe Bool</hask> |
| <hask>map even:: Maybe Int -> Maybe Bool</hask> |
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{| Border=2 CellPadding=2 CellSpacing=2 |
{| Border=2 CellPadding=2 CellSpacing=2 |
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|+ <math>\Psi(f) : \Psi(X) \to \Psi(Y)</math> |
|+ <math>\Psi(f) : \Psi(X) \to \Psi(Y)</math> |
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| + | | |
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| <hask>map even:: [Int] -> [Bool]</hask> |
| <hask>map even:: [Int] -> [Bool]</hask> |
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| <hask>[0]</hask> |
| <hask>[0]</hask> |
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| − | | <hask>[ |
+ | | <hask>[True]</hask> |
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|- |
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| <hask>[1]</hask> |
| <hask>[1]</hask> |
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| − | | <hask>[ |
+ | | <hask>[False]</hask> |
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Revision as of 20:10, 2 October 2006
Example: maybeToList
maybeToList map even $ maybeToList $ Just 5
yields the same as
maybeToList $ map even $ Just 5
yields: both yield
[False]
Vertical arrows: sides of objects
… showing the operation of the natural transformation.
maybeToList :: Maybe a -> [a]
Left: side of X object
maybeToList :: Maybe Int -> [Int]
| |
Nothing
|
[]
|
Just 0
|
[0]
|
Just 1
|
[1]
|
Right: side of Y object
maybeToList :: Maybe Bool -> [Bool]
| |
Nothing
|
[]
|
Just True
|
[True]
|
Just False
|
[False]
|
Horizontal arrows: sides of functors
even :: Int -> Bool
Side of functor
map even:: Maybe Int -> Maybe Bool
| |
Nothing
|
Nothing
|
Just 0
|
Just True
|
Just 1
|
Just False
|
Side of functor
map even:: [Int] -> [Bool]
| |
[]
|
[]
|
[0]
|
[True]
|
[1]
|
[False]
|
Commutativity of the diagram
both paths span between
Maybe Int -> [Bool]
| ||
map even . maybeToList
|
maybeToList . map even
| |
Nothing
|
[]
|
[]
|
Just 0
|
[True]
|
[True]
|
Just 1
|
[False]
|
[False]
|
Remarks
evenhas a more general type (Integral a => a -> Bool) than described here- Words “side”, “horizontal”, “vertical”, “left”, “right” serve here only to point to the discussed parts of a diagram, thus, they are not part of the scientific terminology.