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225 lines
5.7 KiB
Idris
225 lines
5.7 KiB
Idris
||| General purpose two-end finite sequences.
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||| This is implemented by finger tree.
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module Data.Seq.Unsized
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import Control.WellFounded
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import public Data.Zippable
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import Data.Seq.Internal
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%default total
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||| A two-end finite sequences.
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export
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data Seq : Type -> Type where
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MkSeq : FingerTree (Elem e) -> Seq e
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||| O(1). The empty sequence.
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export
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empty : Seq e
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empty = MkSeq Empty
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||| O(1). A singleton sequence.
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export
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singleton : e -> Seq e
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singleton a = MkSeq (Single (MkElem a))
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||| O(n). A sequence of length n with a the value of every element.
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export
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replicate : (n : Nat) -> (a : e) -> Seq e
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replicate n a = MkSeq (replicate' n a)
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||| O(1). The number of elements in the sequence.
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export
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length : Seq a -> Nat
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length (MkSeq tr) = length' tr
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||| O(n). Reverse the sequence.
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export
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reverse : Seq a -> Seq a
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reverse (MkSeq tr) = MkSeq (reverseTree id tr)
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infixr 5 `cons`
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||| O(1). Add an element to the left end of a sequence.
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export
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cons : e -> Seq e -> Seq e
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a `cons` MkSeq tr = MkSeq (MkElem a `consTree` tr)
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infixl 5 `snoc`
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||| O(1). Add an element to the right end of a sequence.
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export
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snoc : Seq e -> e -> Seq e
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MkSeq tr `snoc` a = MkSeq (tr `snocTree` MkElem a)
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||| O(log(min(m, n))). Concatenate two sequences.
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export
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(++) : Seq e -> Seq e -> Seq e
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MkSeq t1 ++ MkSeq t2 = MkSeq (addTree0 t1 t2)
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||| O(1). View from the left of the sequence.
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export
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viewl : Seq a -> Maybe (a, Seq a)
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viewl (MkSeq tr) = case viewLTree tr of
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Just (MkElem a, tr') => Just (a, MkSeq tr')
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Nothing => Nothing
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||| O(1). The first element of the sequence.
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export
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head : Seq a -> Maybe a
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head s = fst <$> viewl s
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||| O(1). The elements after the head of the sequence.
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||| Returns an empty sequence when the sequence is empty.
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export
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tail : Seq a -> Seq a
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tail s = case viewl s of
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Just (_, s') => s'
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Nothing => empty
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||| O(1). View from the right of the sequence.
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export
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viewr : Seq a -> Maybe (Seq a, a)
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viewr (MkSeq tr) = case viewRTree tr of
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Just (tr', MkElem a) => Just (MkSeq tr', a)
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Nothing => Nothing
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||| O(1). The elements before the last element of the sequence.
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||| Returns an empty sequence when the sequence is empty.
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export
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init : Seq a -> Seq a
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init s = case viewr s of
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Just (s', _) => s'
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Nothing => empty
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||| O(1). The last element of the sequence.
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export
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last : Seq a -> Maybe a
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last s = snd <$> viewr s
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||| O(n). Turn a list into a sequence.
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export
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fromList : List a -> Seq a
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fromList xs = MkSeq (foldr (\x, t => MkElem x `consTree` t) Empty xs)
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||| O(log(min(i, n-i))). The element at the specified position.
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export
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index : Nat -> Seq a -> Maybe a
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index i (MkSeq t) = if i < length' t
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then let (_, MkElem a) = lookupTree i t in Just a
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else Nothing
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||| O(log(min(i, n-i))). Update the element at the specified position.
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||| If the position is out of range, the original sequence is returned.
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export
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adjust : (a -> a) -> Nat -> Seq a -> Seq a
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adjust f i s@(MkSeq t) = if i < length' t
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then MkSeq $ adjustTree (const (map f)) i t
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else s
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||| O(log(min(i, n-i))). Replace the element at the specified position.
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||| If the position is out of range, the original sequence is returned.
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export
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update : Nat -> a -> Seq a -> Seq a
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update i a t = adjust (const a) i t
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||| O(log(min(i, n-i))). Split a sequence at a given position.
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||| splitAt i s = (take i s, drop i s)
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export
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splitAt : Nat -> Seq a -> (Seq a, Seq a)
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splitAt i s@(MkSeq t) = if i < length' t
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then let (l, r) = split i t
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in (MkSeq l, MkSeq r)
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else (s, empty)
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||| O(log(min(i,n-i))). The first i elements of a sequence.
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||| If the sequence contains fewer than i elements, the whole sequence is returned.
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export
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take : Nat -> Seq a -> Seq a
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take i seq = fst (splitAt i seq)
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||| O(log(min(i,n-i))). Elements of a sequence after the first i.
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||| If the sequence contains fewer than i elements, the empty sequence is returned.
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export
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drop : Nat -> Seq a -> Seq a
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drop i seq = snd (splitAt i seq)
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||| Dump the internal structure of the finger tree.
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export
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show' : Show a => Seq a -> String
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show' (MkSeq tr) = showPrec Open tr
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public export
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implementation Eq a => Eq (Seq a) where
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MkSeq x == MkSeq y = x == y
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public export
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implementation Ord a => Ord (Seq a) where
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compare (MkSeq x) (MkSeq y) = compare x y
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public export
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implementation Functor Seq where
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map f (MkSeq tr) = MkSeq (map (map f) tr)
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public export
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implementation Foldable Seq where
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foldr f z (MkSeq tr) = foldr (f . unElem) z tr
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foldl f z (MkSeq tr) = foldl (\acc, (MkElem elem) => f acc elem) z tr
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toList (MkSeq tr) = toList' tr
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null (MkSeq Empty) = True
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null _ = False
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public export
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implementation Traversable Seq where
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traverse f (MkSeq tr) = MkSeq <$> traverse (map MkElem . f . unElem) tr
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public export
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implementation Show a => Show (Seq a) where
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showPrec p = showPrec p . toList
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public export
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implementation Zippable Seq where
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zipWith f (MkSeq x) (MkSeq y) = MkSeq (zipWith' f x y)
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zipWith3 f (MkSeq x) (MkSeq y) (MkSeq z) = MkSeq (zipWith3' f x y z)
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unzipWith f (MkSeq zs) = let (xs, ys) = unzipWith' f zs in (MkSeq xs, MkSeq ys)
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unzipWith3 f (MkSeq ws) = let (xs, ys, zs) = unzipWith3' f ws in (MkSeq xs, MkSeq ys, MkSeq zs)
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public export
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implementation Semigroup (Seq a) where
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(<+>) = (++)
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public export
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implementation Monoid (Seq a) where
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neutral = empty
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||| This implementation is differnt from that of Seq.
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public export
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implementation Applicative Seq where
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pure = singleton
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fs <*> xs = foldMap (\f => map f xs) fs
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public export
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[ListLike] Alternative Seq where
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empty = empty
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a <|> b = a ++ b
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public export
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[MaybeLike] Alternative Seq where
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empty = empty
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MkSeq Empty <|> b = b
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a <|> _ = a
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public export
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implementation Monad Seq where
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xs >>= f = foldMap f xs
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public export
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implementation Sized (Seq a) where
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size (MkSeq s) = size s
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