mirror of
https://github.com/idris-lang/Idris2.git
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d5167a0108
Since `[a..b]` uses `takeUntil`/`takeBefore` indirectly those too had to be changed to `public export` clashing with `Data.Stream` definitions. A small readability refactor was made with the `compare` function from `EqOrd`.
186 lines
5.5 KiB
Idris
186 lines
5.5 KiB
Idris
module Data.Stream
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import Data.List
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import Data.List1
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import public Data.Zippable
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%default total
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||| Drop the first n elements from the stream
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||| @ n how many elements to drop
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public export
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drop : (n : Nat) -> Stream a -> Stream a
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drop Z xs = xs
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drop (S k) (x::xs) = drop k xs
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||| An infinite stream of repetitions of the same thing
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public export
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repeat : a -> Stream a
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repeat x = x :: repeat x
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||| Generate an infinite stream by repeatedly applying a function
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||| @ f the function to iterate
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||| @ x the initial value that will be the head of the stream
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public export
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iterate : (f : a -> a) -> (x : a) -> Stream a
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iterate f x = x :: iterate f (f x)
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public export
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unfoldr : (b -> (a, b)) -> b -> Stream a
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unfoldr f c = let (a, n) = f c in a :: unfoldr f n
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||| All of the natural numbers, in order
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public export
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nats : Stream Nat
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nats = iterate S Z
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||| Get the nth element of a stream
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public export
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index : Nat -> Stream a -> a
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index Z (x::xs) = x
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index (S k) (x::xs) = index k xs
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---------------------------
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-- Zippable --
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---------------------------
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public export
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Zippable Stream where
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zipWith f (x :: xs) (y :: ys) = f x y :: zipWith f xs ys
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zipWith3 f (x :: xs) (y :: ys) (z :: zs) = f x y z :: zipWith3 f xs ys zs
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unzipWith f xs = unzip (map f xs)
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unzip xs = (map fst xs, map snd xs)
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unzipWith3 f xs = unzip3 (map f xs)
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unzip3 xs = (map (\(x, _, _) => x) xs, map (\(_, x, _) => x) xs, map (\(_, _, x) => x) xs)
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export
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zipWithIndexLinear : (0 f : _) -> (xs, ys : Stream a) -> (i : Nat) -> index i (zipWith f xs ys) = f (index i xs) (index i ys)
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zipWithIndexLinear f (_::xs) (_::ys) Z = Refl
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zipWithIndexLinear f (_::xs) (_::ys) (S k) = zipWithIndexLinear f xs ys k
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export
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zipWith3IndexLinear : (0 f : _) -> (xs, ys, zs : Stream a) -> (i : Nat) -> index i (zipWith3 f xs ys zs) = f (index i xs) (index i ys) (index i zs)
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zipWith3IndexLinear f (_::xs) (_::ys) (_::zs) Z = Refl
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zipWith3IndexLinear f (_::xs) (_::ys) (_::zs) (S k) = zipWith3IndexLinear f xs ys zs k
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||| Return the diagonal elements of a stream of streams
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export
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diag : Stream (Stream a) -> Stream a
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diag ((x::xs)::xss) = x :: diag (map tail xss)
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||| Produce a Stream of left folds of prefixes of the given Stream
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||| @ f the combining function
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||| @ acc the initial value
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||| @ xs the Stream to process
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export
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scanl : (f : a -> b -> a) -> (acc : a) -> (xs : Stream b) -> Stream a
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scanl f acc (x :: xs) = acc :: scanl f (f acc x) xs
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||| Produce a Stream repeating a sequence
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||| @ xs the sequence to repeat
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||| @ ok proof that the list is non-empty
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export
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cycle : (xs : List a) -> {auto 0 ok : NonEmpty xs} -> Stream a
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cycle (x :: xs) = x :: cycle' xs
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where cycle' : List a -> Stream a
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cycle' [] = x :: cycle' xs
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cycle' (y :: ys) = y :: cycle' ys
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--------------------------------------------------------------------------------
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-- Interleavings
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--------------------------------------------------------------------------------
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-- zig, zag, and cantor are taken from the paper
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-- Applications of Applicative Proof Search
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-- by Liam O'Connor
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public export
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zig : List1 (Stream a) -> Stream (Stream a) -> Stream a
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public export
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zag : List1 a -> List1 (Stream a) -> Stream (Stream a) -> Stream a
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zig xs = zag (head <$> xs) (tail <$> xs)
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zag (x ::: []) zs (l :: ls) = x :: zig (l ::: forget zs) ls
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zag (x ::: (y :: xs)) zs ls = x :: zag (y ::: xs) zs ls
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public export
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cantor : Stream (Stream a) -> Stream a
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cantor (l :: ls) = zig (l ::: []) ls
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-- Exploring the Nat*Nat top right quadrant of the plane
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-- using Cantor's zig-zag traversal:
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example :
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let quadrant : Stream (Stream (Nat, Nat))
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quadrant = map (\ i => map (i,) Stream.nats) Stream.nats
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in
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take 10 (cantor quadrant)
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=== [ (0, 0)
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, (1, 0), (0, 1)
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, (2, 0), (1, 1), (0, 2)
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, (3, 0), (2, 1), (1, 2), (0, 3)
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]
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example = Refl
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namespace DPair
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||| Explore the plane corresponding to all possible pairings
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||| using Cantor's zig zag traversal
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public export
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planeWith : {0 p : a -> Type} ->
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((x : a) -> p x -> c) ->
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Stream a -> ((x : a) -> Stream (p x)) ->
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Stream c
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planeWith k as f = cantor (map (\ x => map (k x) (f x)) as)
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||| Explore the plane corresponding to all possible pairings
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||| using Cantor's zig zag traversal
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public export
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plane : {0 p : a -> Type} ->
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Stream a -> ((x : a) -> Stream (p x)) ->
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Stream (x : a ** p x)
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plane = planeWith (\ x, prf => (x ** prf))
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namespace Pair
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||| Explore the plane corresponding to all possible pairings
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||| using Cantor's zig zag traversal
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public export
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planeWith : (a -> b -> c) ->
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Stream a -> (a -> Stream b) ->
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Stream c
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planeWith k as f = cantor (map (\ x => map (k x) (f x)) as)
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||| Explore the plane corresponding to all possible pairings
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||| using Cantor's zig zag traversal
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public export
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plane : Stream a -> (a -> Stream b) -> Stream (a, b)
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plane = Pair.planeWith (,)
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--------------------------------------------------------------------------------
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-- Implementations
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--------------------------------------------------------------------------------
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export
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Applicative Stream where
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pure = repeat
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(<*>) = zipWith apply
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export
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Monad Stream where
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s >>= f = diag (map f s)
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--------------------------------------------------------------------------------
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-- Properties
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--------------------------------------------------------------------------------
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lengthTake : (n : Nat) -> (xs : Stream a) -> length (take n xs) = n
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lengthTake Z _ = Refl
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lengthTake (S n) (x :: xs) = cong S (lengthTake n xs)
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