Data.Traversable
- Package
- purescript-foldable-traversable
- Repository
- purescript/purescript-foldable-traversable
#Traversable Source
class Traversable :: (Type -> Type) -> Constraint
class (Functor t, Foldable t) <= Traversable t where
Traversable
represents data structures which can be traversed,
accumulating results and effects in some Applicative
functor.
traverse
runs an action for every element in a data structure, and accumulates the results.sequence
runs the actions contained in a data structure, and accumulates the results.
import Data.Traversable
import Data.Maybe
import Data.Int (fromNumber)
sequence [Just 1, Just 2, Just 3] == Just [1,2,3]
sequence [Nothing, Just 2, Just 3] == Nothing
traverse fromNumber [1.0, 2.0, 3.0] == Just [1,2,3]
traverse fromNumber [1.5, 2.0, 3.0] == Nothing
traverse logShow [1,2,3]
-- prints:
1
2
3
traverse (\x -> [x, 0]) [1,2,3] == [[1,2,3],[1,2,0],[1,0,3],[1,0,0],[0,2,3],[0,2,0],[0,0,3],[0,0,0]]
The traverse
and sequence
functions should be compatible in the
following sense:
traverse f xs = sequence (f <$> xs)
sequence = traverse identity
Traversable
instances should also be compatible with the corresponding
Foldable
instances, in the following sense:
foldMap f = runConst <<< traverse (Const <<< f)
Default implementations are provided by the following functions:
traverseDefault
sequenceDefault
Members
traverse :: forall a b m. Applicative m => (a -> m b) -> t a -> m (t b)
sequence :: forall a m. Applicative m => t (m a) -> m (t a)
Instances
Traversable Array
Traversable Maybe
Traversable First
Traversable Last
Traversable Additive
Traversable Dual
Traversable Conj
Traversable Disj
Traversable Multiplicative
Traversable (Either a)
Traversable (Tuple a)
Traversable Identity
Traversable (Const a)
(Traversable f, Traversable g) => Traversable (Product f g)
(Traversable f, Traversable g) => Traversable (Coproduct f g)
(Traversable f, Traversable g) => Traversable (Compose f g)
(Traversable f) => Traversable (App f)
#traverseDefault Source
traverseDefault :: forall t a b m. Traversable t => Applicative m => (a -> m b) -> t a -> m (t b)
A default implementation of traverse
using sequence
and map
.
#sequenceDefault Source
sequenceDefault :: forall t a m. Traversable t => Applicative m => t (m a) -> m (t a)
A default implementation of sequence
using traverse
.
#for Source
for :: forall a b m t. Applicative m => Traversable t => t a -> (a -> m b) -> m (t b)
A version of traverse
with its arguments flipped.
This can be useful when running an action written using do notation for every element in a data structure:
For example:
for [1, 2, 3] \n -> do
print n
return (n * n)
#scanl Source
scanl :: forall a b f. Traversable f => (b -> a -> b) -> b -> f a -> f b
Fold a data structure from the left, keeping all intermediate results
instead of only the final result. Note that the initial value does not
appear in the result (unlike Haskell's Prelude.scanl
).
scanl (+) 0 [1,2,3] = [1,3,6]
scanl (-) 10 [1,2,3] = [9,7,4]
#scanr Source
scanr :: forall a b f. Traversable f => (a -> b -> b) -> b -> f a -> f b
Fold a data structure from the right, keeping all intermediate results
instead of only the final result. Note that the initial value does not
appear in the result (unlike Haskell's Prelude.scanr
).
scanr (+) 0 [1,2,3] = [6,5,3]
scanr (flip (-)) 10 [1,2,3] = [4,5,7]
#mapAccumL Source
mapAccumL :: forall a b s f. Traversable f => (s -> a -> Accum s b) -> s -> f a -> Accum s (f b)
Fold a data structure from the left, keeping all intermediate results instead of only the final result.
Unlike scanl
, mapAccumL
allows the type of accumulator to differ
from the element type of the final data structure.
#mapAccumR Source
mapAccumR :: forall a b s f. Traversable f => (s -> a -> Accum s b) -> s -> f a -> Accum s (f b)
Fold a data structure from the right, keeping all intermediate results instead of only the final result.
Unlike scanr
, mapAccumR
allows the type of accumulator to differ
from the element type of the final data structure.
Re-exports from Data.Foldable
#Foldable Source
class Foldable :: (Type -> Type) -> Constraint
class Foldable f where
Foldable
represents data structures which can be folded.
foldr
folds a structure from the rightfoldl
folds a structure from the leftfoldMap
folds a structure by accumulating values in aMonoid
Default implementations are provided by the following functions:
foldrDefault
foldlDefault
foldMapDefaultR
foldMapDefaultL
Note: some combinations of the default implementations are unsafe to use together - causing a non-terminating mutually recursive cycle. These combinations are documented per function.
Members
foldr :: forall a b. (a -> b -> b) -> b -> f a -> b
foldl :: forall a b. (b -> a -> b) -> b -> f a -> b
foldMap :: forall a m. Monoid m => (a -> m) -> f a -> m
Instances
Foldable Array
Foldable Maybe
Foldable First
Foldable Last
Foldable Additive
Foldable Dual
Foldable Disj
Foldable Conj
Foldable Multiplicative
Foldable (Either a)
Foldable (Tuple a)
Foldable Identity
Foldable (Const a)
(Foldable f, Foldable g) => Foldable (Product f g)
(Foldable f, Foldable g) => Foldable (Coproduct f g)
(Foldable f, Foldable g) => Foldable (Compose f g)
(Foldable f) => Foldable (App f)
#traverse_ Source
traverse_ :: forall a b f m. Applicative m => Foldable f => (a -> m b) -> f a -> m Unit
Traverse a data structure, performing some effects encoded by an
Applicative
functor at each value, ignoring the final result.
For example:
traverse_ print [1, 2, 3]
#sequence_ Source
sequence_ :: forall a f m. Applicative m => Foldable f => f (m a) -> m Unit
Perform all of the effects in some data structure in the order
given by the Foldable
instance, ignoring the final result.
For example:
sequence_ [ trace "Hello, ", trace " world!" ]
#or Source
or :: forall a f. Foldable f => HeytingAlgebra a => f a -> a
The disjunction of all the values in a data structure. When specialized
to Boolean
, this function will test whether any of the values in a data
structure is true
.
#intercalate Source
intercalate :: forall f m. Foldable f => Monoid m => m -> f m -> m
Fold a data structure, accumulating values in some Monoid
,
combining adjacent elements using the specified separator.
For example:
> intercalate ", " ["Lorem", "ipsum", "dolor"]
= "Lorem, ipsum, dolor"
> intercalate "*" ["a", "b", "c"]
= "a*b*c"
> intercalate [1] [[2, 3], [4, 5], [6, 7]]
= [2, 3, 1, 4, 5, 1, 6, 7]
#for_ Source
for_ :: forall a b f m. Applicative m => Foldable f => f a -> (a -> m b) -> m Unit
A version of traverse_
with its arguments flipped.
This can be useful when running an action written using do notation for every element in a data structure:
For example:
for_ [1, 2, 3] \n -> do
print n
trace "squared is"
print (n * n)
#foldrDefault Source
foldrDefault :: forall f a b. Foldable f => (a -> b -> b) -> b -> f a -> b
A default implementation of foldr
using foldMap
.
Note: when defining a Foldable
instance, this function is unsafe to use
in combination with foldMapDefaultR
.
#foldlDefault Source
foldlDefault :: forall f a b. Foldable f => (b -> a -> b) -> b -> f a -> b
A default implementation of foldl
using foldMap
.
Note: when defining a Foldable
instance, this function is unsafe to use
in combination with foldMapDefaultL
.
#foldMapDefaultR Source
foldMapDefaultR :: forall f a m. Foldable f => Monoid m => (a -> m) -> f a -> m
A default implementation of foldMap
using foldr
.
Note: when defining a Foldable
instance, this function is unsafe to use
in combination with foldrDefault
.
#foldMapDefaultL Source
foldMapDefaultL :: forall f a m. Foldable f => Monoid m => (a -> m) -> f a -> m
A default implementation of foldMap
using foldl
.
Note: when defining a Foldable
instance, this function is unsafe to use
in combination with foldlDefault
.
#any Source
any :: forall a b f. Foldable f => HeytingAlgebra b => (a -> b) -> f a -> b
any f
is the same as or <<< map f
; map a function over the structure,
and then get the disjunction of the results.
#and Source
and :: forall a f. Foldable f => HeytingAlgebra a => f a -> a
The conjunction of all the values in a data structure. When specialized
to Boolean
, this function will test whether all of the values in a data
structure are true
.
#all Source
all :: forall a b f. Foldable f => HeytingAlgebra b => (a -> b) -> f a -> b
all f
is the same as and <<< map f
; map a function over the structure,
and then get the conjunction of the results.