-- | Flow provides operators for writing more understandable Haskell. It is an -- alternative to some common idioms like ('Prelude.$') for function -- application and ('Prelude..') for function composition. -- -- Flow is designed to be imported unqualified. It does not export anything -- that conflicts with the base package. -- -- >>> import Flow -- -- == Rationale -- -- I think that Haskell can be hard to read. It has two operators for applying -- functions. Both are not really necessary and only serve to reduce -- parentheses. But they make code hard to read. People who do not already -- know Haskell have no chance of guessing what @foo $ bar@ or @baz & qux@ -- mean. -- -- Those that do know Haskell are forced to read lines forwards and backwards -- at the same time, thanks to function composition. Even something simple, -- like finding the minimum element, bounces around: @f = head . sort@. -- -- I think we can do better. By using directional operators, we can allow -- readers to move their eye in only one direction, be that left-to-right or -- right-to-left. And by using idioms common in other programming languages, -- we can allow people who aren't familiar with Haskell to guess at the -- meaning. -- -- So instead of ('Prelude.$'), I propose ('<|'). It is a pipe, which anyone -- who has touched a Unix system should be familiar with. And it points in the -- direction it sends arguments along. Similarly, replace ('Prelude.&') with -- ('|>'). And for composition, ('<.') replaces ('Prelude..'). I would have -- preferred @<<@, but its counterpart @>>@ is taken by Haskell's syntax. -- So-called "backwards" composition is normally expressed with -- ('Control.Category.>>>'), which Flow provides as ('.>'). module Flow ( -- * Function application (|>), (<|), apply, -- * Function composition (.>), (<.), compose, -- * Strict function application (!>), (<!), apply', ) where import Prelude (seq) -- | Left-associative 'apply' operator. Read as "apply forward" or "pipe into". -- Use this to create long chains of computation that suggest which direction -- things move in. -- -- >>> 3 |> succ |> recip |> negate -- -0.25 -- -- Or use it anywhere you would use ('Prelude.&'). -- -- prop> \ x -> (x |> f) == f x -- -- prop> \ x -> (x |> f |> g) == g (f x) infixl 0 |> (|>) :: a -> (a -> b) -> b a x |> :: a -> (a -> b) -> b |> a -> b f = a -> (a -> b) -> b forall a b. a -> (a -> b) -> b apply a x a -> b f -- | Right-associative 'apply' operator. Read as "apply backward" or "pipe -- from". Use this to create long chains of computation that suggest which -- direction things move in. You may prefer this operator over ('|>') for -- 'Prelude.IO' actions since it puts the last function first. -- -- >>> print <| negate <| recip <| succ <| 3 -- -0.25 -- -- Or use it anywhere you would use ('Prelude.$'). -- -- Note that ('<|') and ('|>') have the same precedence, so they cannot be used -- together. -- -- >>> -- This doesn't work! -- >>> -- print <| 3 |> succ |> recip |> negate -- -- prop> \ x -> (f <| x) == f x -- -- prop> \ x -> (g <| f <| x) == g (f x) infixr 0 <| (<|) :: (a -> b) -> a -> b a -> b f <| :: (a -> b) -> a -> b <| a x = a -> (a -> b) -> b forall a b. a -> (a -> b) -> b apply a x a -> b f -- | Function application. This function usually isn't necessary, but it can be -- more readable than some alternatives when used with higher-order functions -- like 'Prelude.map'. -- -- >>> map (apply 2) [succ, recip, negate] -- [3.0,0.5,-2.0] -- -- In general you should prefer using an explicit lambda or operator section. -- -- >>> map (\ f -> 2 |> f) [succ, recip, negate] -- [3.0,0.5,-2.0] -- >>> map (2 |>) [succ, recip, negate] -- [3.0,0.5,-2.0] -- >>> map (<| 2) [succ, recip, negate] -- [3.0,0.5,-2.0] -- -- prop> \ x -> apply x f == f x apply :: a -> (a -> b) -> b apply :: a -> (a -> b) -> b apply a x a -> b f = a -> b f a x -- | Left-associative 'compose' operator. Read as "compose forward" or "and -- then". Use this to create long chains of computation that suggest which -- direction things move in. -- -- >>> let f = succ .> recip .> negate -- >>> f 3 -- -0.25 -- -- Or use it anywhere you would use ('Control.Category.>>>'). -- -- prop> \ x -> (f .> g) x == g (f x) -- -- prop> \ x -> (f .> g .> h) x == h (g (f x)) infixl 9 .> (.>) :: (a -> b) -> (b -> c) -> (a -> c) a -> b f .> :: (a -> b) -> (b -> c) -> a -> c .> b -> c g = (a -> b) -> (b -> c) -> a -> c forall a b c. (a -> b) -> (b -> c) -> a -> c compose a -> b f b -> c g -- | Right-associative 'compose' operator. Read as "compose backward" or "but -- first". Use this to create long chains of computation that suggest which -- direction things move in. You may prefer this operator over ('.>') for -- 'Prelude.IO' actions since it puts the last function first. -- -- >>> let f = print <. negate <. recip <. succ -- >>> f 3 -- -0.25 -- -- Or use it anywhere you would use ('Prelude..'). -- -- Note that ('<.') and ('.>') have the same precedence, so they cannot be used -- together. -- -- >>> -- This doesn't work! -- >>> -- print <. succ .> recip .> negate -- -- prop> \ x -> (g <. f) x == g (f x) -- -- prop> \ x -> (h <. g <. f) x == h (g (f x)) infixr 9 <. (<.) :: (b -> c) -> (a -> b) -> (a -> c) b -> c g <. :: (b -> c) -> (a -> b) -> a -> c <. a -> b f = (a -> b) -> (b -> c) -> a -> c forall a b c. (a -> b) -> (b -> c) -> a -> c compose a -> b f b -> c g -- | Function composition. This function usually isn't necessary, but it can be -- more readable than some alternatives when used with higher-order functions -- like 'Prelude.map'. -- -- >>> let fs = map (compose succ) [recip, negate] -- >>> map (apply 3) fs -- [0.25,-4.0] -- -- In general you should prefer using an explicit lambda or operator section. -- -- >>> map (\ f -> f 3) (map (\ f -> succ .> f) [recip, negate]) -- [0.25,-4.0] -- >>> map (\ f -> f 3) (map (succ .>) [recip, negate]) -- [0.25,-4.0] -- >>> map (\ f -> f 3) (map (<. succ) [recip, negate]) -- [0.25,-4.0] -- -- prop> \ x -> compose f g x == g (f x) compose :: (a -> b) -> (b -> c) -> (a -> c) compose :: (a -> b) -> (b -> c) -> a -> c compose a -> b f b -> c g = \ a x -> b -> c g (a -> b f a x) -- | Left-associative 'apply'' operator. Read as "strict apply forward" or -- "strict pipe into". Use this to create long chains of computation that -- suggest which direction things move in. -- -- >>> 3 !> succ !> recip !> negate -- -0.25 -- -- The difference between this and ('|>') is that this evaluates its argument -- before passing it to the function. -- -- >>> undefined |> const True -- True -- >>> undefined !> const True -- *** Exception: Prelude.undefined -- ... -- -- prop> \ x -> (x !> f) == seq x (f x) -- -- prop> \ x -> (x !> f !> g) == let y = seq x (f x) in seq y (g y) infixl 0 !> (!>) :: a -> (a -> b) -> b a x !> :: a -> (a -> b) -> b !> a -> b f = a -> (a -> b) -> b forall a b. a -> (a -> b) -> b apply' a x a -> b f -- | Right-associative 'apply'' operator. Read as "strict apply backward" or -- "strict pipe from". Use this to create long chains of computation that -- suggest which direction things move in. You may prefer this operator over -- ('!>') for 'Prelude.IO' actions since it puts the last function first. -- -- >>> print <! negate <! recip <! succ <! 3 -- -0.25 -- -- The difference between this and ('<|') is that this evaluates its argument -- before passing it to the function. -- -- >>> const True <| undefined -- True -- >>> const True <! undefined -- *** Exception: Prelude.undefined -- ... -- -- Note that ('<!') and ('!>') have the same precedence, so they cannot be used -- together. -- -- >>> -- This doesn't work! -- >>> -- print <! 3 !> succ !> recip !> negate -- -- prop> \ x -> (f <! x) == seq x (f x) -- -- prop> \ x -> (g <! f <! x) == let y = seq x (f x) in seq y (g y) infixr 0 <! (<!) :: (a -> b) -> a -> b a -> b f <! :: (a -> b) -> a -> b <! a x = a -> (a -> b) -> b forall a b. a -> (a -> b) -> b apply' a x a -> b f -- | Strict function application. This function usually isn't necessary, but it -- can be more readable than some alternatives when used with higher-order -- functions like 'Prelude.map'. -- -- >>> map (apply' 2) [succ, recip, negate] -- [3.0,0.5,-2.0] -- -- The different between this and 'apply' is that this evaluates its argument -- before passing it to the function. -- -- >>> apply undefined (const True) -- True -- >>> apply' undefined (const True) -- *** Exception: Prelude.undefined -- ... -- -- In general you should prefer using an explicit lambda or operator section. -- -- >>> map (\ f -> 2 !> f) [succ, recip, negate] -- [3.0,0.5,-2.0] -- >>> map (2 !>) [succ, recip, negate] -- [3.0,0.5,-2.0] -- >>> map (<! 2) [succ, recip, negate] -- [3.0,0.5,-2.0] -- -- prop> \ x -> apply' x f == seq x (f x) apply' :: a -> (a -> b) -> b apply' :: a -> (a -> b) -> b apply' a x a -> b f = a -> b -> b seq a x (a -> (a -> b) -> b forall a b. a -> (a -> b) -> b apply a x a -> b f)