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Types
Paolo G. Giarrusso edited this page Jul 13, 2014
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8 revisions
Type | Equivalent to | Notes |
---|---|---|
type Lens s t a b = ∀f. Functor f => (a -> f b) -> s -> f t |
s -> (a, b -> t) |
|
type Traversal s t a b = ∀f. Applicative f => (a -> f b) -> s -> f t |
s -> ∃n. (a^n, b^n -> t) |
X |
type Getter s a = ∀f. Gettable f => (a -> f a) -> s -> f s |
s -> a |
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type Setter s t a b = ∀f. Settable f => (a -> f b) -> s -> f t |
(a -> b) -> s -> t |
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type Fold s a = ∀f. (Gettable f, Applicative f) => (a -> f a) -> s -> f s |
s -> [a] |
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type Iso s t a b = ∀f k. (Isomorphic k, Functor f) => k (a -> f b) (s -> f t) |
(s -> a, b -> t) |
|
Indexed | ||
type IndexedLens i s t a b = ∀f k. (Indexed i k, Functor f) => k (a -> f b) (s -> f t) |
s -> ((i, a), b -> t) |
|
type IndexedTraversal i s t a b = ∀f k. (Indexed i k, Applicative f) => k (a -> f b) (s -> f t) |
s -> ∃n. ((i, a)^n, b^n -> t) |
X |
type IndexedGetter i s a = ∀f k. (Indexed i k, Gettable f) => k (a -> f a) (s -> f s) |
s -> (i, a) |
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type IndexedSetter i s t a b = ∀f k. (Indexed i k, Settable f) => k (a -> f b) (s -> f t) |
((i, a) -> b) -> s -> t |
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type IndexedFold i s a = ∀f. (Indexed i k, Gettable f, Applicative f) => k (a -> f a) (s -> f s) |
s -> [(i, a)] |
|
Monadic | ||
type Action m s a = ∀f. Effective m r f => (a -> f a) -> s-> f s |
s -> m a |
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type MonadicFold m s a = ∀f. (Effective m r f, Applicative f) => (a -> f a) -> s -> f s |
s -> m [a] |
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Hypothetical | ||
type PartialLens s t a b = ∀f. Pointed f => (a -> f b) -> s -> f t |
s -> Either t (a, b -> t) |
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type NonEmptyTraversal s t a b = ∀f. Apply f => (a -> f b) -> s -> f t |
s -> ∃n. (a^(n+1), b^(n+1) -> t) |
X |
-
a^n
means "a list ofn
values of typea
".