mirror of
https://github.com/idris-lang/Idris2.git
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883 lines
27 KiB
Idris
883 lines
27 KiB
Idris
module Data.Vect
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import Data.DPair
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import Data.List
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import Data.Nat
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import public Data.Fin
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import public Data.Zippable
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import Decidable.Equality
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%default total
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public export
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data Vect : (len : Nat) -> (elem : Type) -> Type where
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||| Empty vector
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Nil : Vect Z elem
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||| A non-empty vector of length `S len`, consisting of a head element and
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||| the rest of the list, of length `len`.
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(::) : (x : elem) -> (xs : Vect len elem) -> Vect (S len) elem
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-- Hints for interactive editing
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%name Vect xs, ys, zs, ws
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public export
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length : (xs : Vect len elem) -> Nat
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length [] = 0
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length (_::xs) = 1 + length xs
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||| Show that the length function on vectors in fact calculates the length
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export
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lengthCorrect : (xs : Vect len elem) -> length xs = len
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lengthCorrect [] = Refl
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lengthCorrect (_ :: xs) = rewrite lengthCorrect xs in Refl
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||| If two vectors are equal, their heads and tails are equal
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export
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vectInjective : {0 xs : Vect n a} -> {0 ys : Vect m b} -> x::xs = y::ys -> (x = y, xs = ys)
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vectInjective Refl = (Refl, Refl)
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--------------------------------------------------------------------------------
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-- Indexing into vectors
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--------------------------------------------------------------------------------
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||| All but the first element of the vector
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|||
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||| ```idris example
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||| tail [1,2,3,4]
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||| ```
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public export
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tail : Vect (S len) elem -> Vect len elem
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tail (_::xs) = xs
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||| Only the first element of the vector
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||| ```idris example
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||| head [1,2,3,4]
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||| ```
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public export
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head : Vect (S len) elem -> elem
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head (x::_) = x
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||| The last element of the vector
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||| ```idris example
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||| last [1,2,3,4]
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||| ```
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public export
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last : Vect (S len) elem -> elem
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last [x] = x
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last (_::y::ys) = last $ y::ys
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||| All but the last element of the vector
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||| ```idris example
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||| init [1,2,3,4]
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||| ```
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public export
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init : Vect (S len) elem -> Vect len elem
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init [_] = []
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init (x::y::ys) = x :: init (y::ys)
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||| Extract the first `n` elements of a Vect.
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public export
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take : (n : Nat)
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-> ( xs : Vect (n + m) type)
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-> Vect n type
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take 0 xs = Nil
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take (S k) (x :: xs) = x :: take k xs
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||| Extract a particular element from a vector
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|||
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||| ```idris example
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||| index 1 [1,2,3,4]
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||| ```
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public export
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index : Fin len -> Vect len elem -> elem
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index FZ (x::_) = x
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index (FS k) (_::xs) = index k xs
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||| Insert an element at a particular index
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|||
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||| ```idris example
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||| insertAt 1 8 [1,2,3,4]
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||| ```
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public export
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insertAt : (idx : Fin (S len)) -> (x : elem) -> (xs : Vect len elem) -> Vect (S len) elem
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insertAt FZ y xs = y :: xs
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insertAt (FS k) y (x::xs) = x :: insertAt k y xs
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||| Construct a new vector consisting of all but the indicated element
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|||
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||| ```idris example
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||| deleteAt 1 [1,2,3,4]
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||| ```
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public export
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deleteAt : Fin (S len) -> Vect (S len) elem -> Vect len elem
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deleteAt FZ (_::xs) = xs
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deleteAt (FS k) [x] = absurd k
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deleteAt (FS k) (x::xs@(_::_)) = x :: deleteAt k xs
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||| Replace an element at a particlar index with another
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|||
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||| ```idris example
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||| replaceAt 1 8 [1,2,3,4]
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||| ```
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public export
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replaceAt : Fin len -> elem -> Vect len elem -> Vect len elem
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replaceAt FZ y (_::xs) = y :: xs
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replaceAt (FS k) y (x::xs) = x :: replaceAt k y xs
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||| Replace the element at a particular index with the result of applying a function to it
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||| @ i the index to replace at
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||| @ f the update function
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||| @ xs the vector to replace in
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||| ```idris example
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||| updateAt 1 (+10) [1,2,3,4]
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||| ```
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public export
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updateAt : (i : Fin len) -> (f : elem -> elem) -> (xs : Vect len elem) -> Vect len elem
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updateAt FZ f (x::xs) = f x :: xs
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updateAt (FS k) f (x::xs) = x :: updateAt k f xs
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||| Append two vectors
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|||
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||| ```idris example
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||| [1,2,3,4] ++ [5,6]
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||| ```
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public export
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(++) : (xs : Vect m elem) -> (ys : Vect n elem) -> Vect (m + n) elem
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(++) [] ys = ys
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(++) (x::xs) ys = x :: xs ++ ys
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||| Add an element at the end of the vector.
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||| The main use case for it is to get the expected type signature
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||| `Vect n a -> a -> Vect (S n) a` instead of
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||| `Vect n a -> a -> Vect (n + 1) a` which you get by using `++ [x]`
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||| Snoc gets its name by reversing `cons`, indicating we are
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||| tacking on the element at the end rather than the begining.
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||| `append` would also be a suitable name.
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||| @ xs The vector to be appended
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||| @ v The value to append
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public export
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snoc : (xs : Vect n a) -> (v : a) -> Vect (S n) a
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snoc [] v = [v]
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snoc (x :: xs) v = x :: snoc xs v
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||| Repeate some value some number of times.
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||| @ len the number of times to repeat it
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||| @ x the value to repeat
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||| ```idris example
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||| replicate 4 1
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||| ```
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public export
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replicate : (len : Nat) -> (x : elem) -> Vect len elem
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replicate Z _ = []
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replicate (S k) x = x :: replicate k x
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||| Merge two ordered vectors
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|||
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||| ```idris example
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||| mergeBy compare (fromList [1,3,5]) (fromList [2,3,4,5,6])
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||| ```
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export
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mergeBy : (elem -> elem -> Ordering) -> (xs : Vect n elem) -> (ys : Vect m elem) -> Vect (n + m) elem
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mergeBy _ [] ys = ys
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mergeBy _ xs [] = rewrite plusZeroRightNeutral n in xs
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mergeBy {n = S k} {m = S k'} order (x :: xs) (y :: ys)
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= case order x y of
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LT => x :: mergeBy order xs (y :: ys)
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_ => rewrite sym (plusSuccRightSucc k k') in
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y :: mergeBy order (x :: xs) ys
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export
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merge : Ord elem => Vect n elem -> Vect m elem -> Vect (n + m) elem
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merge = mergeBy compare
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-- Properties for functions in this section --
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export
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replaceAtSameIndex : (xs : Vect n a) -> (i : Fin n) -> (0 y : a) -> index i (replaceAt i y xs) = y
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replaceAtSameIndex (_::_) FZ _ = Refl
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replaceAtSameIndex (_::_) (FS _) _ = replaceAtSameIndex _ _ _
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export
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replaceAtDiffIndexPreserves : (xs : Vect n a) -> (i, j : Fin n) -> Not (i = j) -> (0 y : a) -> index i (replaceAt j y xs) = index i xs
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replaceAtDiffIndexPreserves (_::_) FZ FZ co _ = absurd $ co Refl
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replaceAtDiffIndexPreserves (_::_) FZ (FS _) _ _ = Refl
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replaceAtDiffIndexPreserves (_::_) (FS _) FZ _ _ = Refl
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replaceAtDiffIndexPreserves (_::_) (FS z) (FS w) co y = replaceAtDiffIndexPreserves _ z w (co . cong FS) y
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--------------------------------------------------------------------------------
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-- Transformations
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--------------------------------------------------------------------------------
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||| Reverse the order of the elements of a vector
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||| ```idris example
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||| reverse [1,2,3,4]
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||| ```
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public export
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reverse : (xs : Vect len elem) -> Vect len elem
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reverse xs = go [] xs
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where go : Vect n elem -> Vect m elem -> Vect (n+m) elem
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go {n} acc [] = rewrite plusZeroRightNeutral n in acc
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go {n} {m=S m} acc (x :: xs) = rewrite sym $ plusSuccRightSucc n m
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in go (x::acc) xs
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||| Alternate an element between the other elements of a vector
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||| @ sep the element to intersperse
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||| @ xs the vector to separate with `sep`
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|||
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||| ```idris example
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||| intersperse 0 [1,2,3,4]
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||| ```
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export
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intersperse : (sep : elem) -> (xs : Vect len elem) -> Vect (len + pred len) elem
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intersperse sep [] = []
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intersperse sep (x::xs) = x :: intersperse' sep xs
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where
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intersperse' : elem -> Vect n elem -> Vect (n + n) elem
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intersperse' sep [] = []
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intersperse' {n=S n} sep (x::xs) = rewrite sym $ plusSuccRightSucc n n
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in sep :: x :: intersperse' sep xs
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--------------------------------------------------------------------------------
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-- Conversion from list (toList is provided by Foldable)
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--------------------------------------------------------------------------------
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public export
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toVect : (n : Nat) -> List a -> Maybe (Vect n a)
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toVect Z [] = Just []
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toVect (S k) (x :: xs)
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= do xs' <- toVect k xs
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pure (x :: xs')
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toVect _ _ = Nothing
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public export
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fromList' : (xs : Vect len elem) -> (l : List elem) -> Vect (length l + len) elem
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fromList' ys [] = ys
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fromList' ys (x::xs) =
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rewrite (plusSuccRightSucc (length xs) len) in
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fromList' (x::ys) xs
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||| Convert a list to a vector.
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||| The length of the list should be statically known.
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||| ```idris example
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||| fromList [1,2,3,4]
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||| ```
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public export
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fromList : (xs : List elem) -> Vect (length xs) elem
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fromList l =
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rewrite (sym $ plusZeroRightNeutral (length l)) in
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reverse $ fromList' [] l
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--------------------------------------------------------------------------------
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-- Equality
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--------------------------------------------------------------------------------
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public export
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Eq a => Eq (Vect n a) where
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(==) [] [] = True
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(==) (x::xs) (y::ys) = x == y && xs == ys
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public export
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DecEq a => DecEq (Vect n a) where
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decEq [] [] = Yes Refl
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decEq (x::xs) (y::ys) with (decEq x y, decEq xs ys)
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decEq (x::xs) (x::xs) | (Yes Refl, Yes Refl) = Yes Refl
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decEq (x::xs) (y::ys) | (No nhd, _) = No $ nhd . fst . vectInjective
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decEq (x::xs) (y::ys) | (_, No ntl) = No $ ntl . snd . vectInjective
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--------------------------------------------------------------------------------
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-- Order
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--------------------------------------------------------------------------------
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public export
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implementation Ord elem => Ord (Vect len elem) where
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compare [] [] = EQ
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compare (x::xs) (y::ys)
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= case compare x y of
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EQ => compare xs ys
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x => x
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--------------------------------------------------------------------------------
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-- Maps
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--------------------------------------------------------------------------------
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public export
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implementation Functor (Vect n) where
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map f [] = []
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map f (x::xs) = f x :: map f xs
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||| Map a partial function across a vector, returning those elements for which
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||| the function had a value.
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||| The first projection of the resulting pair (ie the length) will always be
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||| at most the length of the input vector. This is not, however, guaranteed
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||| by the type.
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||| @ f the partial function (expressed by returning `Maybe`)
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||| @ xs the vector to check for results
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||| ```idris example
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||| mapMaybe ((find (=='a')) . unpack) (fromList ["abc","ade","bgh","xyz"])
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||| ```
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export
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mapMaybe : (f : a -> Maybe b) -> (xs : Vect len a) -> (m : Nat ** Vect m b)
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mapMaybe f [] = (_ ** [])
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mapMaybe f (x::xs) =
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let (len ** ys) = mapMaybe f xs
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in case f x of
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Just y => (S len ** y :: ys)
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Nothing => ( len ** ys)
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--------------------------------------------------------------------------------
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-- Folds
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--------------------------------------------------------------------------------
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public export
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foldrImpl : (t -> acc -> acc) -> acc -> (acc -> acc) -> Vect n t -> acc
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foldrImpl f e go [] = go e
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foldrImpl f e go (x::xs) = foldrImpl f e (go . (f x)) xs
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public export
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implementation Foldable (Vect n) where
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foldr f e xs = foldrImpl f e id xs
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null [] = True
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null _ = False
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--------------------------------------------------------------------------------
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-- Special folds
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--------------------------------------------------------------------------------
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||| Flatten a vector of equal-length vectors
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||| ```idris example
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||| concat [[1,2,3], [4,5,6]]
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||| ```
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public export
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concat : (xss : Vect m (Vect n elem)) -> Vect (m * n) elem
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concat [] = []
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concat (v::vs) = v ++ Vect.concat vs
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||| Foldr without seeding the accumulator
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||| ```idris example
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||| foldr1 (-) (fromList [1,2,3])
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||| ```
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public export
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foldr1 : (t -> t -> t) -> Vect (S n) t -> t
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foldr1 f [x] = x
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foldr1 f (x::y::xs) = f x (foldr1 f (y::xs))
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||| Foldl without seeding the accumulator
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|||
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||| ```idris example
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||| foldl1 (-) (fromList [1,2,3])
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||| ```
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public export
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foldl1 : (t -> t -> t) -> Vect (S n) t -> t
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foldl1 f (x::xs) = foldl f x xs
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--------------------------------------------------------------------------------
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-- Scans
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--------------------------------------------------------------------------------
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||| The scanl function is similar to foldl, but returns all the intermediate
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||| accumulator states in the form of a vector.
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|||
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||| ```idris example
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||| scanl (-) 0 (fromList [1,2,3])
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||| ```
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public export
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scanl : (res -> elem -> res) -> res -> Vect len elem -> Vect (S len) res
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scanl f q [] = [q]
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scanl f q (x::xs) = q :: scanl f (f q x) xs
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||| The scanl1 function is a variant of scanl that doesn't require an explicit
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||| starting value.
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||| It assumes the first element of the vector to be the starting value and then
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||| starts the fold with the element following it.
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|||
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||| ```idris example
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||| scanl1 (-) (fromList [1,2,3])
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||| ```
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public export
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scanl1 : (elem -> elem -> elem) -> Vect len elem -> Vect len elem
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scanl1 f [] = []
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scanl1 f (x::xs) = scanl f x xs
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--------------------------------------------------------------------------------
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-- Membership tests
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--------------------------------------------------------------------------------
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||| Search for an item using a user-provided test
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||| @ p the equality test
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||| @ e the item to search for
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||| @ xs the vector to search in
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|||
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||| ```idris example
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||| elemBy (==) 2 [1,2,3,4]
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||| ```
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public export
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elemBy : (p : elem -> elem -> Bool) -> (e : elem) -> (xs : Vect len elem) -> Bool
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elemBy p e [] = False
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elemBy p e (x::xs) = p e x || elemBy p e xs
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||| Use the default Boolean equality on elements to search for an item
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||| @ x what to search for
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||| @ xs where to search
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|||
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||| ```idris example
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||| elem 3 [1,2,3,4]
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||| ```
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public export
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elem : Eq elem => (x : elem) -> (xs : Vect len elem) -> Bool
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elem = elemBy (==)
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||| Find the association of some key with a user-provided comparison
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||| @ p the comparison operator for keys (True if they match)
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||| @ e the key to look for
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|||
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||| ```idris example
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||| lookupBy (==) 2 [(1, 'a'), (2, 'b'), (3, 'c')]
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||| ```
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public export
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lookupBy : (p : key -> key -> Bool) -> (e : key) -> (xs : Vect n (key, val)) -> Maybe val
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lookupBy p e [] = Nothing
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lookupBy p e ((l, r)::xs) = if p e l then Just r else lookupBy p e xs
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||| Find the assocation of some key using the default Boolean equality test
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|||
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||| ```idris example
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||| lookup 3 [(1, 'a'), (2, 'b'), (3, 'c')]
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||| ```
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public export
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lookup : Eq key => key -> Vect n (key, val) -> Maybe val
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lookup = lookupBy (==)
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||| Check if any element of xs is found in elems by a user-provided comparison
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||| @ p the comparison operator
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||| @ elems the vector to search
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||| @ xs what to search for
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|||
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||| ```idris example
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||| hasAnyBy (==) [2,5] [1,2,3,4]
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||| ```
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public export
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hasAnyBy : (p : elem -> elem -> Bool) -> (elems : Vect m elem) -> (xs : Vect len elem) -> Bool
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hasAnyBy p elems [] = False
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hasAnyBy p elems (x::xs) = elemBy p x elems || hasAnyBy p elems xs
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||| Check if any element of xs is found in elems using the default Boolean equality test
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|||
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||| ```idris example
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||| hasAny [2,5] [1,2,3,4]
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||| ```
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public export
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hasAny : Eq elem => Vect m elem -> Vect len elem -> Bool
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hasAny = hasAnyBy (==)
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--------------------------------------------------------------------------------
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-- Searching with a predicate
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--------------------------------------------------------------------------------
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||| Find the first element of the vector that satisfies some test
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|
||| @ p the test to satisfy
|
|
|||
|
|
||| ```idris example
|
|
||| find (== 3) [1,2,3,4]
|
|
||| ```
|
|
public export
|
|
find : (p : elem -> Bool) -> (xs : Vect len elem) -> Maybe elem
|
|
find p [] = Nothing
|
|
find p (x::xs) = if p x then Just x else find p xs
|
|
|
|
||| Find the index of the first element of the vector that satisfies some test
|
|
|||
|
|
||| ```idris example
|
|
||| findIndex (== 3) [1,2,3,4]
|
|
||| ```
|
|
public export
|
|
findIndex : (elem -> Bool) -> Vect len elem -> Maybe (Fin len)
|
|
findIndex p [] = Nothing
|
|
findIndex p (x :: xs) = if p x then Just FZ else map FS (findIndex p xs)
|
|
|
|
||| Find the indices of all elements that satisfy some test
|
|
|||
|
|
||| ```idris example
|
|
||| findIndices (< 3) [1,2,3,4]
|
|
||| ```
|
|
public export
|
|
findIndices : (elem -> Bool) -> Vect m elem -> List (Fin m)
|
|
findIndices p [] = []
|
|
findIndices p (x :: xs)
|
|
= let is = map FS $ findIndices p xs in
|
|
if p x then FZ :: is else is
|
|
|
|
||| Find the index of the first element of the vector that satisfies some test
|
|
|||
|
|
||| ```idris example
|
|
||| elemIndexBy (==) 3 [1,2,3,4]
|
|
||| ```
|
|
public export
|
|
elemIndexBy : (elem -> elem -> Bool) -> elem -> Vect m elem -> Maybe (Fin m)
|
|
elemIndexBy p e = findIndex $ p e
|
|
|
|
||| Find the index of the first element of the vector equal to the given one.
|
|
|||
|
|
||| ```idris example
|
|
||| elemIndex 3 [1,2,3,4]
|
|
||| ```
|
|
public export
|
|
elemIndex : Eq elem => elem -> Vect m elem -> Maybe (Fin m)
|
|
elemIndex = elemIndexBy (==)
|
|
|
|
||| Find the indices of all elements that satisfy some test
|
|
|||
|
|
||| ```idris example
|
|
||| elemIndicesBy (<=) 3 [1,2,3,4]
|
|
||| ```
|
|
public export
|
|
elemIndicesBy : (elem -> elem -> Bool) -> elem -> Vect m elem -> List (Fin m)
|
|
elemIndicesBy p e = findIndices $ p e
|
|
|
|
||| Find the indices of all elements uquals to the given one
|
|
|||
|
|
||| ```idris example
|
|
||| elemIndices 3 [1,2,3,4,3]
|
|
||| ```
|
|
public export
|
|
elemIndices : Eq elem => elem -> Vect m elem -> List (Fin m)
|
|
elemIndices = elemIndicesBy (==)
|
|
|
|
--------------------------------------------------------------------------------
|
|
-- Filters
|
|
--------------------------------------------------------------------------------
|
|
|
|
||| Find all elements of a vector that satisfy some test
|
|
|||
|
|
||| ```idris example
|
|
||| filter (< 3) (fromList [1,2,3,4])
|
|
||| ```
|
|
public export
|
|
filter : (elem -> Bool) -> Vect len elem -> (p ** Vect p elem)
|
|
filter p [] = ( _ ** [] )
|
|
filter p (x::xs) =
|
|
let (_ ** tail) = filter p xs
|
|
in if p x then
|
|
(_ ** x::tail)
|
|
else
|
|
(_ ** tail)
|
|
|
|
||| Make the elements of some vector unique by some test
|
|
|||
|
|
||| ```idris example
|
|
||| nubBy (==) (fromList [1,2,2,3,4,4])
|
|
||| ```
|
|
public export
|
|
nubBy : (elem -> elem -> Bool) -> Vect len elem -> (p ** Vect p elem)
|
|
nubBy = nubBy' []
|
|
where
|
|
nubBy' : forall len . Vect m elem -> (elem -> elem -> Bool) -> Vect len elem -> (p ** Vect p elem)
|
|
nubBy' acc p [] = (_ ** [])
|
|
nubBy' acc p (x::xs) with (elemBy p x acc)
|
|
nubBy' acc p (x :: xs) | True = nubBy' acc p xs
|
|
nubBy' acc p (x :: xs) | False with (nubBy' (x::acc) p xs)
|
|
nubBy' acc p (x :: xs) | False | (_ ** tail) = (_ ** x::tail)
|
|
|
|
||| Make the elements of some vector unique by the default Boolean equality
|
|
|||
|
|
||| ```idris example
|
|
||| nub (fromList [1,2,2,3,4,4])
|
|
||| ```
|
|
public export
|
|
nub : Eq elem => Vect len elem -> (p ** Vect p elem)
|
|
nub = nubBy (==)
|
|
|
|
||| Delete first element from list according to some test
|
|
|||
|
|
||| ```idris example
|
|
||| deleteBy (<) 3 (fromList [1,2,2,3,4,4])
|
|
||| ```
|
|
public export
|
|
deleteBy : {len : _} -> -- needed for the dependent pair
|
|
(elem -> elem -> Bool) -> elem -> Vect len elem -> (p ** Vect p elem)
|
|
deleteBy _ _ [] = (_ ** [])
|
|
deleteBy eq x (y::ys) =
|
|
let (len ** zs) = deleteBy eq x ys
|
|
in if x `eq` y then (_ ** ys) else (S len ** y ::zs)
|
|
|
|
||| Delete first element from list equal to the given one
|
|
|||
|
|
||| ```idris example
|
|
||| delete 2 (fromList [1,2,2,3,4,4])
|
|
||| ```
|
|
public export
|
|
delete : {len : _} ->
|
|
Eq elem => elem -> Vect len elem -> (p ** Vect p elem)
|
|
delete = deleteBy (==)
|
|
|
|
--------------------------------------------------------------------------------
|
|
-- Splitting and breaking lists
|
|
--------------------------------------------------------------------------------
|
|
|
|
||| A tuple where the first element is a `Vect` of the `n` first elements and
|
|
||| the second element is a `Vect` of the remaining elements of the original.
|
|
||| It is equivalent to `(take n xs, drop n xs)` (`splitAtTakeDrop`),
|
|
||| but is more efficient.
|
|
|||
|
|
||| @ n the index to split at
|
|
||| @ xs the `Vect` to split in two
|
|
|||
|
|
||| ```idris example
|
|
||| splitAt 2 (fromList [1,2,3,4])
|
|
||| ```
|
|
public export
|
|
splitAt : (n : Nat) -> (xs : Vect (n + m) elem) -> (Vect n elem, Vect m elem)
|
|
splitAt Z xs = ([], xs)
|
|
splitAt (S k) (x :: xs) with (splitAt k {m} xs)
|
|
splitAt (S k) (x :: xs) | (tk, dr) = (x :: tk, dr)
|
|
|
|
||| A tuple where the first element is a `Vect` of the `n` elements passing given test
|
|
||| and the second element is a `Vect` of the remaining elements of the original.
|
|
|||
|
|
||| ```idris example
|
|
||| partition (== 2) (fromList [1,2,3,2,4])
|
|
||| ```
|
|
public export
|
|
partition : (elem -> Bool) -> Vect len elem -> ((p ** Vect p elem), (q ** Vect q elem))
|
|
partition p [] = ((_ ** []), (_ ** []))
|
|
partition p (x::xs) =
|
|
let ((leftLen ** lefts), (rightLen ** rights)) = partition p xs in
|
|
if p x then
|
|
((S leftLen ** x::lefts), (rightLen ** rights))
|
|
else
|
|
((leftLen ** lefts), (S rightLen ** x::rights))
|
|
|
|
--------------------------------------------------------------------------------
|
|
-- Predicates
|
|
--------------------------------------------------------------------------------
|
|
|
|
||| Verify vector prefix
|
|
|||
|
|
||| ```idris example
|
|
||| isPrefixOfBy (==) (fromList [1,2]) (fromList [1,2,3,4])
|
|
||| ```
|
|
public export
|
|
isPrefixOfBy : (elem -> elem -> Bool) -> Vect m elem -> Vect len elem -> Bool
|
|
isPrefixOfBy p [] right = True
|
|
isPrefixOfBy p left [] = False
|
|
isPrefixOfBy p (x::xs) (y::ys) = p x y && isPrefixOfBy p xs ys
|
|
|
|
||| Verify vector prefix
|
|
|||
|
|
||| ```idris example
|
|
||| isPrefixOf (fromList [1,2]) (fromList [1,2,3,4])
|
|
||| ```
|
|
public export
|
|
isPrefixOf : Eq elem => Vect m elem -> Vect len elem -> Bool
|
|
isPrefixOf = isPrefixOfBy (==)
|
|
|
|
||| Verify vector suffix
|
|
|||
|
|
||| ```idris example
|
|
||| isSuffixOfBy (==) (fromList [3,4]) (fromList [1,2,3,4])
|
|
||| ```
|
|
public export
|
|
isSuffixOfBy : (elem -> elem -> Bool) -> Vect m elem -> Vect len elem -> Bool
|
|
isSuffixOfBy p left right = isPrefixOfBy p (reverse left) (reverse right)
|
|
|
|
||| Verify vector suffix
|
|
|||
|
|
||| ```idris example
|
|
||| isSuffixOf (fromList [3,4]) (fromList [1,2,3,4])
|
|
||| ```
|
|
public export
|
|
isSuffixOf : Eq elem => Vect m elem -> Vect len elem -> Bool
|
|
isSuffixOf = isSuffixOfBy (==)
|
|
|
|
--------------------------------------------------------------------------------
|
|
-- Conversions
|
|
--------------------------------------------------------------------------------
|
|
|
|
||| Convert Maybe type into Vect
|
|
|||
|
|
||| ```idris example
|
|
||| maybeToVect (Just 2)
|
|
||| ```
|
|
public export
|
|
maybeToVect : Maybe elem -> (p ** Vect p elem)
|
|
maybeToVect Nothing = (_ ** [])
|
|
maybeToVect (Just j) = (_ ** [j])
|
|
|
|
||| Convert first element of Vect (if exists) into Maybe.
|
|
|||
|
|
||| ```idris example
|
|
||| vectToMaybe [2]
|
|
||| ```
|
|
public export
|
|
vectToMaybe : Vect len elem -> Maybe elem
|
|
vectToMaybe [] = Nothing
|
|
vectToMaybe (x::xs) = Just x
|
|
|
|
--------------------------------------------------------------------------------
|
|
-- Misc
|
|
--------------------------------------------------------------------------------
|
|
|
|
||| Filter out Nothings from Vect and unwrap the Justs
|
|
|||
|
|
||| ```idris example
|
|
||| catMaybes [Just 1, Just 2, Nothing, Nothing, Just 5]
|
|
||| ```
|
|
public export
|
|
catMaybes : (xs : Vect n (Maybe elem)) -> (p ** Vect p elem)
|
|
catMaybes [] = (_ ** [])
|
|
catMaybes (Nothing::xs) = catMaybes xs
|
|
catMaybes ((Just j)::xs) =
|
|
let (_ ** tail) = catMaybes xs
|
|
in (_ ** j::tail)
|
|
|
|
||| Get diagonal elements
|
|
|||
|
|
||| ```idris example
|
|
||| diag [[1,2,3], [4,5,6], [7,8,9]]
|
|
||| ```
|
|
public export
|
|
diag : Vect len (Vect len elem) -> Vect len elem
|
|
diag [] = []
|
|
diag ((x::xs)::xss) = x :: diag (map tail xss)
|
|
|
|
namespace Fin
|
|
|
|
public export
|
|
tabulate : {len : Nat} -> (Fin len -> a) -> Vect len a
|
|
tabulate {len = Z} f = []
|
|
tabulate {len = S _} f = f FZ :: tabulate (f . FS)
|
|
|
|
public export
|
|
range : {len : Nat} -> Vect len (Fin len)
|
|
range = tabulate id
|
|
|
|
namespace Subset
|
|
|
|
public export
|
|
tabulate : {len : Nat} -> (Subset Nat (`LT` len) -> a) -> Vect len a
|
|
tabulate {len = Z} f = []
|
|
tabulate {len = S _} f
|
|
= f (Element Z ltZero)
|
|
:: Subset.tabulate (\ (Element n prf) => f (Element (S n) (LTESucc prf)))
|
|
|
|
public export
|
|
range : {len : Nat} -> Vect len (Subset Nat (`LT` len))
|
|
range = tabulate id
|
|
|
|
--------------------------------------------------------------------------------
|
|
-- Zippable
|
|
--------------------------------------------------------------------------------
|
|
|
|
public export
|
|
Zippable (Vect k) where
|
|
zipWith _ [] [] = []
|
|
zipWith f (x :: xs) (y :: ys) = f x y :: zipWith f xs ys
|
|
|
|
zipWith3 _ [] [] [] = []
|
|
zipWith3 f (x :: xs) (y :: ys) (z :: zs) = f x y z :: zipWith3 f xs ys zs
|
|
|
|
unzipWith f [] = ([], [])
|
|
unzipWith f (x :: xs) = let (b, c) = f x
|
|
(bs, cs) = unzipWith f xs in
|
|
(b :: bs, c :: cs)
|
|
|
|
unzipWith3 f [] = ([], [], [])
|
|
unzipWith3 f (x :: xs) = let (b, c, d) = f x
|
|
(bs, cs, ds) = unzipWith3 f xs in
|
|
(b :: bs, c :: cs, d :: ds)
|
|
|
|
export
|
|
zipWithIndexLinear : (0 f : _) -> (xs, ys : Vect n a) -> (i : Fin n) -> index i (zipWith f xs ys) = f (index i xs) (index i ys)
|
|
zipWithIndexLinear _ (_::xs) (_::ys) FZ = Refl
|
|
zipWithIndexLinear f (_::xs) (_::ys) (FS i) = zipWithIndexLinear f xs ys i
|
|
|
|
export
|
|
zipWith3IndexLinear : (0 f : _) -> (xs, ys, zs : Vect n a) -> (i : Fin n) -> index i (zipWith3 f xs ys zs) = f (index i xs) (index i ys) (index i zs)
|
|
zipWith3IndexLinear _ (_::xs) (_::ys) (_::zs) FZ = Refl
|
|
zipWith3IndexLinear f (_::xs) (_::ys) (_::zs) (FS i) = zipWith3IndexLinear f xs ys zs i
|
|
|
|
--------------------------------------------------------------------------------
|
|
-- Matrix transposition
|
|
--------------------------------------------------------------------------------
|
|
||| Transpose a `Vect` of `Vect`s, turning rows into columns and vice versa.
|
|
|||
|
|
||| This is like zipping all the inner `Vect`s together and is equivalent to `traverse id` (`transposeTraverse`).
|
|
|||
|
|
||| As the types ensure rectangularity, this is an involution, unlike `Prelude.List.transpose`.
|
|
|||
|
|
||| ```idris example
|
|
||| transpose [[1,2], [3,4], [5,6], [7,8]]
|
|
||| ```
|
|
public export
|
|
transpose : {n : _} -> (array : Vect m (Vect n elem)) -> Vect n (Vect m elem)
|
|
transpose [] = replicate _ [] -- = [| [] |]
|
|
transpose (x :: xs) = zipWith (::) x (transpose xs) -- = [| x :: xs |]
|
|
|
|
--------------------------------------------------------------------------------
|
|
-- Applicative/Monad/Traversable
|
|
--------------------------------------------------------------------------------
|
|
-- These only work if the length is known at run time!
|
|
|
|
public export
|
|
implementation {k : Nat} -> Applicative (Vect k) where
|
|
pure = replicate _
|
|
fs <*> vs = zipWith apply fs vs
|
|
|
|
-- ||| This monad is different from the List monad, (>>=)
|
|
-- ||| uses the diagonal.
|
|
implementation {k : Nat} -> Monad (Vect k) where
|
|
m >>= f = diag (map f m)
|
|
|
|
public export
|
|
implementation Traversable (Vect k) where
|
|
traverse f [] = pure []
|
|
traverse f (x :: xs) = [| f x :: traverse f xs |]
|
|
|
|
--------------------------------------------------------------------------------
|
|
-- Show
|
|
--------------------------------------------------------------------------------
|
|
|
|
export
|
|
implementation Show elem => Show (Vect len elem) where
|
|
show = show . toList
|
|
|
|
-- Some convenience functions for testing lengths
|
|
|
|
-- Needs to be Maybe rather than Dec, because if 'n' is unequal to m, we
|
|
-- only know we don't know how to make a Vect n a, not that one can't exist.
|
|
export
|
|
exactLength : {m : Nat} -> -- expected at run-time
|
|
(len : Nat) -> (xs : Vect m a) -> Maybe (Vect len a)
|
|
exactLength {m} len xs with (decEq m len)
|
|
exactLength {m = m} m xs | (Yes Refl) = Just xs
|
|
exactLength {m = m} len xs | (No contra) = Nothing
|
|
|
|
||| If the given Vect is at least the required length, return a Vect with
|
|
||| at least that length in its type, otherwise return Nothing
|
|
||| @len the required length
|
|
||| @xs the vector with the desired length
|
|
export
|
|
overLength : {m : Nat} -> -- expected at run-time
|
|
(len : Nat) -> (xs : Vect m a) -> Maybe (p ** Vect (plus p len) a)
|
|
overLength n xs with (cmp m n)
|
|
overLength {m} (plus m (S y)) xs | (CmpLT y) = Nothing
|
|
overLength {m} m xs | CmpEQ = Just (0 ** xs)
|
|
overLength {m = plus n (S x)} n xs | (CmpGT x)
|
|
= Just (S x ** rewrite plusCommutative (S x) n in xs)
|