module Prelude.Stream import Builtins import Prelude.Basics import Prelude.Functor import Prelude.Applicative import Prelude.Monad import Prelude.Nat import Prelude.List %access public export %default total ||| An infinite stream data Stream : Type -> Type where (::) : (e : a) -> Inf (Stream a) -> Stream a -- Hints for interactive editing %name Stream xs,ys,zs,ws -- Usage hints for erasure analysis %used Stream.(::) e Functor Stream where map f (x::xs) = f x :: map f xs ||| The first element of an infinite stream head : Stream a -> a head (x::xs) = x ||| All but the first element tail : Stream a -> Stream a tail (x::xs) = xs ||| Take precisely n elements from the stream ||| @ n how many elements to take ||| @ xs the stream take : (n : Nat) -> (xs : Stream a) -> List a take Z _ = [] take (S n) (x :: xs) = x :: (take n xs) ||| Drop the first n elements from the stream ||| @ n how many elements to drop %assert_total drop : (n : Nat) -> Stream a -> Stream a drop Z xs = xs drop (S k) (x::xs) = drop k xs ||| An infinite stream of repetitions of the same thing repeat : a -> Stream a repeat x = x :: repeat x ||| Generate an infinite stream by repeatedly applying a function ||| @ f the function to iterate ||| @ x the initial value that will be the head of the stream iterate : (f : a -> a) -> (x : a) -> Stream a iterate f x = x :: iterate f (f x) ||| Get the nth element of a stream index : Nat -> Stream a -> a index Z (x::xs) = x index (S k) (x::xs) = index k xs ||| Combine two streams element-wise using a function. ||| ||| @ f the function to combine elements with ||| @ xs the first stream of elements ||| @ ys the second stream of elements zipWith : (f : a -> b -> c) -> (xs : Stream a) -> (ys : Stream b) -> Stream c zipWith f (x::xs) (y::ys) = f x y :: zipWith f xs ys ||| Combine three streams by applying a function element-wise along them zipWith3 : (a -> b -> c -> d) -> Stream a -> Stream b -> Stream c -> Stream d zipWith3 f (x::xs) (y::ys) (z::zs) = f x y z :: zipWith3 f xs ys zs ||| Create a stream of pairs from two streams zip : Stream a -> Stream b -> Stream (a, b) zip = zipWith (\x,y => (x,y)) ||| Combine three streams into a stream of tuples elementwise zip3 : Stream a -> Stream b -> Stream c -> Stream (a, b, c) zip3 = zipWith3 (\x,y,z => (x,y,z)) ||| Create a pair of streams from a stream of pairs unzip : Stream (a, b) -> (Stream a, Stream b) unzip xs = (map fst xs, map snd xs) ||| Split a stream of three-element tuples into three streams unzip3 : Stream (a, b, c) -> (Stream a, Stream b, Stream c) unzip3 xs = (map (\(x,_,_) => x) xs, map (\(_,x,_) => x) xs, map (\(_,_,x) => x) xs) ||| Return the diagonal elements of a stream of streams diag : Stream (Stream a) -> Stream a diag ((x::xs)::xss) = x :: diag (map tail xss) ||| Produce a Stream of left folds of prefixes of the given Stream ||| @ f the combining function ||| @ acc the initial value ||| @ xs the Stream to process scanl : (f : a -> b -> a) -> (acc : a) -> (xs : Stream b) -> Stream a scanl f acc (x :: xs) = acc :: scanl f (f acc x) xs ||| Produce a Stream repeating a sequence ||| @ xs the sequence to repeat ||| @ ok proof that the list is non-empty cycle : (xs : List a) -> {auto ok : NonEmpty xs} -> Stream a cycle {a} (x :: xs) {ok = IsNonEmpty} = x :: cycle' xs where cycle' : List a -> Stream a cycle' [] = x :: cycle' xs cycle' (y :: ys) = y :: cycle' ys Applicative Stream where pure = repeat (<*>) = zipWith apply Monad Stream where s >>= f = diag (map f s)