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https://github.com/idris-lang/Idris2.git
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173 lines
5.9 KiB
Idris
173 lines
5.9 KiB
Idris
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module Data.List.Views.Extra
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import Data.List
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import Data.List.Reverse
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import Data.List.Views
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import Data.Nat
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import Data.List.Equalities
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%default total
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||| Proof that two numbers differ by at most one
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public export
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data Balanced : Nat -> Nat -> Type where
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BalancedZ : Balanced Z Z
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BalancedL : Balanced (S Z) Z
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BalancedRec : Balanced n m -> Balanced (S n) (S m)
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%name Balanced bal, b
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Uninhabited (Balanced Z (S k)) where
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uninhabited BalancedZ impossible
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uninhabited BalancedL impossible
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uninhabited (BalancedRec rec) impossible
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export
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balancedPred : Balanced (S x) (S y) -> Balanced x y
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balancedPred (BalancedRec pred) = pred
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export
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mkBalancedEq : {n, m : Nat} -> n = m -> Balanced n m
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mkBalancedEq {n = 0} Refl = BalancedZ
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mkBalancedEq {n = (S k)} Refl = BalancedRec $ mkBalancedEq {n = k} Refl
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export
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mkBalancedL : {n, m : Nat} -> n = S m -> Balanced n m
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mkBalancedL {m = 0} Refl = BalancedL
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mkBalancedL {m = S k} Refl = BalancedRec (mkBalancedL Refl)
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||| View of a list split into two halves
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||| The lengths of the lists are guaranteed to differ by at most one
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public export
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data SplitBalanced : List a -> Type where
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MkSplitBal
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: {xs, ys : List a}
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-> Balanced (length xs) (length ys)
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-> SplitBalanced (xs ++ ys)
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private
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splitBalancedHelper
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: (revLs : List a)
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-> (rs : List a)
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-> (doubleSkip : List a)
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-> (length rs = length revLs + length doubleSkip)
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-> SplitBalanced (reverse revLs ++ rs)
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splitBalancedHelper revLs rs [] prf = MkSplitBal balancedLeftsAndRights
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where
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lengthsEqual : length rs = length revLs
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lengthsEqual =
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rewrite sym (plusZeroRightNeutral (length revLs)) in prf
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balancedLeftsAndRights : Balanced (length (reverse revLs)) (length rs)
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balancedLeftsAndRights =
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rewrite reverseLength revLs in
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rewrite lengthsEqual in
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mkBalancedEq Refl
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splitBalancedHelper revLs [] (x :: xs) prf =
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absurd $
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the (0 = S (plus (length revLs) (length xs)))
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rewrite plusSuccRightSucc (length revLs) (length xs) in
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prf
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splitBalancedHelper revLs (x :: rs) [lastItem] prf =
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rewrite appendAssociative (reverse revLs) [x] rs in
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rewrite sym (reverseCons x revLs) in
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MkSplitBal $
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the (Balanced (length (reverseOnto [x] revLs)) (length rs)) $
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rewrite reverseCons x revLs in
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rewrite lengthSnoc x (reverse revLs) in
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rewrite reverseLength revLs in
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rewrite lengthsEqual in
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mkBalancedL Refl
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where
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lengthsEqual : length rs = length revLs
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lengthsEqual =
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cong pred $
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the (S (length rs) = S (length revLs)) $
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rewrite plusCommutative 1 (length revLs) in prf
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splitBalancedHelper revLs (x :: oneFurther) (_ :: (_ :: twoFurther)) prf =
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rewrite appendAssociative (reverse revLs) [x] oneFurther in
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rewrite sym (reverseCons x revLs) in
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splitBalancedHelper (x :: revLs) oneFurther twoFurther $
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cong pred $
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the (S (length oneFurther) = S (S (plus (length revLs) (length twoFurther)))) $
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rewrite plusSuccRightSucc (length revLs) (length twoFurther) in
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rewrite plusSuccRightSucc (length revLs) (S (length twoFurther)) in
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prf
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||| Covering function for the `SplitBalanced`
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||| Constructs the view in linear time
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export
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splitBalanced : (input : List a) -> SplitBalanced input
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splitBalanced input = splitBalancedHelper [] input input Refl
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||| The `VList` view allows us to recurse on the middle of a list,
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||| inspecting the front and back elements simultaneously.
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public export
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data VList : List a -> Type where
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VNil : VList []
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VOne : VList [x]
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VCons : {x, y : a} -> {xs : List a} -> (rec : Lazy (VList xs)) -> VList (x :: xs ++ [y])
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private
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toVList
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: (xs : List a)
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-> SnocList ys
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-> Balanced (length xs) (length ys)
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-> VList (xs ++ ys)
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toVList [] Empty BalancedZ = VNil
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toVList [x] Empty BalancedL = VOne
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toVList [] (Snoc x zs rec) prf =
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absurd $
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the (Balanced 0 (S (length zs))) $
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rewrite sym (lengthSnoc x zs) in prf
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toVList (x :: xs) (Snoc y ys srec) prf =
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rewrite appendAssociative xs ys [y] in
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VCons $
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toVList xs srec $
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balancedPred $
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rewrite sym (lengthSnoc y ys) in prf
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||| Covering function for `VList`
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||| Constructs the view in linear time.
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export
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vList : (xs : List a) -> VList xs
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vList xs with (splitBalanced xs)
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vList (ys ++ zs) | (MkSplitBal prf) = toVList ys (snocList zs) prf
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||| Lazy filtering of a list based on a predicate.
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public export
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data LazyFilterRec : List a -> Type where
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Exhausted : (skip : List a) -> LazyFilterRec skip
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Found : (skip : List a) -- initial non-matching elements
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-> (head : a) -- first match
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-> Lazy (LazyFilterRec rest)
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-> LazyFilterRec (skip ++ (head :: rest))
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||| Covering function for the LazyFilterRec view.
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||| Constructs the view lazily in linear time.
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total export
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lazyFilterRec : (pred : (a -> Bool)) -> (xs : List a) -> LazyFilterRec xs
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lazyFilterRec pred [] = Exhausted []
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lazyFilterRec pred (x :: xs) with (pred x)
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lazyFilterRec pred (x :: xs) | True = Found [] x (lazyFilterRec pred xs)
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lazyFilterRec pred (x :: []) | False = Exhausted [x]
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lazyFilterRec pred (x :: rest@(_ :: xs)) | False = filterHelper [x] rest
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where
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filterHelper
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: (reverseOfSkipped : List a)
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-> {auto prf1 : NonEmpty reverseOfSkipped}
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-> (rest : List a)
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-> {auto prf2 : NonEmpty rest}
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-> LazyFilterRec (reverse reverseOfSkipped ++ rest)
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filterHelper revSkipped (y :: xs) with (pred y)
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filterHelper revSkipped (y :: xs) | True =
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Found (reverse revSkipped) y (lazyFilterRec pred xs)
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filterHelper revSkipped (y :: []) | False =
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rewrite sym (reverseOntoSpec [y] revSkipped) in
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Exhausted $ reverse (y :: revSkipped)
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filterHelper revSkipped (y :: (z :: zs)) | False =
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rewrite appendAssociative (reverse revSkipped) [y] (z :: zs) in
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rewrite sym (reverseOntoSpec [y] revSkipped) in
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filterHelper (y :: revSkipped) (z :: zs)
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