2019-06-15 13:54:22 +03:00
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module Data.List
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2019-10-10 19:38:09 +03:00
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import Decidable.Equality
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2019-06-15 13:54:22 +03:00
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public export
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isNil : List a -> Bool
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isNil [] = True
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isNil (x::xs) = False
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public export
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isCons : List a -> Bool
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isCons [] = False
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isCons (x::xs) = True
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public export
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length : List a -> Nat
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length [] = Z
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length (x::xs) = S (length xs)
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public export
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take : Nat -> List a -> List a
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take Z xs = []
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take (S k) [] = []
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take (S k) (x :: xs) = x :: take k xs
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public export
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drop : (n : Nat) -> (xs : List a) -> List a
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drop Z xs = xs
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drop (S n) [] = []
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drop (S n) (x::xs) = drop n xs
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public export
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takeWhile : (p : a -> Bool) -> List a -> List a
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takeWhile p [] = []
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takeWhile p (x::xs) = if p x then x :: takeWhile p xs else []
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public export
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dropWhile : (p : a -> Bool) -> List a -> List a
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dropWhile p [] = []
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dropWhile p (x::xs) = if p x then dropWhile p xs else x::xs
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public export
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filter : (p : a -> Bool) -> List a -> List a
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filter p [] = []
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2019-07-23 10:37:48 +03:00
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filter p (x :: xs)
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2019-06-15 13:54:22 +03:00
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= if p x
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then x :: filter p xs
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else filter p xs
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2019-07-23 10:37:48 +03:00
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||| Find associated information in a list using a custom comparison.
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public export
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lookupBy : (a -> a -> Bool) -> a -> List (a, b) -> Maybe b
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lookupBy p e [] = Nothing
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lookupBy p e (x::xs) =
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let (l, r) = x in
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if p e l then
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Just r
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else
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lookupBy p e xs
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||| Find associated information in a list using Boolean equality.
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public export
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lookup : Eq a => a -> List (a, b) -> Maybe b
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lookup = lookupBy (==)
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2019-10-13 15:59:42 +03:00
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||| Check if something is a member of a list using a custom comparison.
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public export
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elemBy : (a -> a -> Bool) -> a -> List a -> Bool
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elemBy p e [] = False
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elemBy p e (x::xs) =
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if p e x then
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True
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else
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elemBy p e xs
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2020-02-10 00:45:36 +03:00
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public export
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nubBy : (a -> a -> Bool) -> List a -> List a
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nubBy = nubBy' []
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where
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nubBy' : List a -> (a -> a -> Bool) -> List a -> List a
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nubBy' acc p [] = []
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nubBy' acc p (x::xs) =
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if elemBy p x acc then
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nubBy' acc p xs
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else
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x :: nubBy' (x::acc) p xs
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||| O(n^2). The nub function removes duplicate elements from a list. In
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||| particular, it keeps only the first occurrence of each element. It is a
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||| special case of nubBy, which allows the programmer to supply their own
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||| equality test.
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||| ```idris example
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||| nub (the (List _) [1,2,1,3])
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||| ```
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public export
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nub : Eq a => List a -> List a
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nub = nubBy (==)
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2019-06-15 13:54:22 +03:00
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public export
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span : (a -> Bool) -> List a -> (List a, List a)
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span p [] = ([], [])
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span p (x::xs) =
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if p x then
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let (ys, zs) = span p xs in
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(x::ys, zs)
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else
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([], x::xs)
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public export
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break : (a -> Bool) -> List a -> (List a, List a)
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2019-10-27 05:07:01 +03:00
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break p xs = span (not . p) xs
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2019-06-15 13:54:22 +03:00
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public export
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split : (a -> Bool) -> List a -> List (List a)
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split p xs =
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case break p xs of
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(chunk, []) => [chunk]
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(chunk, (c :: rest)) => chunk :: split p rest
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public export
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splitAt : (n : Nat) -> (xs : List a) -> (List a, List a)
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splitAt Z xs = ([], xs)
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splitAt (S k) [] = ([], [])
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2019-07-23 10:37:48 +03:00
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splitAt (S k) (x :: xs)
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2019-06-15 13:54:22 +03:00
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= let (tk, dr) = splitAt k xs in
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(x :: tk, dr)
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public export
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partition : (a -> Bool) -> List a -> (List a, List a)
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partition p [] = ([], [])
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partition p (x::xs) =
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let (lefts, rights) = partition p xs in
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if p x then
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(x::lefts, rights)
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else
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(lefts, x::rights)
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2020-02-01 16:32:30 +03:00
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||| The inits function returns all initial segments of the argument, shortest
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||| first. For example,
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||| ```idris example
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||| inits [1,2,3]
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||| ```
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public export
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inits : List a -> List (List a)
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inits xs = [] :: case xs of
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[] => []
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x :: xs' => map (x ::) (inits xs')
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||| The tails function returns all final segments of the argument, longest
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||| first. For example,
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||| ```idris example
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||| tails [1,2,3] == [[1,2,3], [2,3], [3], []]
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|||```
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public export
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tails : List a -> List (List a)
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tails xs = xs :: case xs of
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[] => []
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_ :: xs' => tails xs'
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||| Split on the given element.
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||| ```idris example
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||| splitOn 0 [1,0,2,0,0,3]
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||| ```
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public export
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splitOn : Eq a => a -> List a -> List (List a)
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splitOn a = split (== a)
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||| Replaces all occurences of the first argument with the second argument in a list.
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||| ```idris example
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||| replaceOn '-' ',' ['1', '-', '2', '-', '3']
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||| ```
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public export
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replaceOn : Eq a => a -> a -> List a -> List a
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replaceOn a b l = map (\c => if c == a then b else c) l
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2019-10-13 15:59:42 +03:00
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public export
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2019-06-15 13:54:22 +03:00
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reverseOnto : List a -> List a -> List a
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reverseOnto acc [] = acc
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reverseOnto acc (x::xs) = reverseOnto (x::acc) xs
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2019-10-13 15:59:42 +03:00
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public export
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2019-06-15 13:54:22 +03:00
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reverse : List a -> List a
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reverse = reverseOnto []
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2019-10-30 02:06:48 +03:00
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||| Construct a list with `n` copies of `x`.
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||| @ n how many copies
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||| @ x the element to replicate
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public export
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replicate : (n : Nat) -> (x : a) -> List a
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replicate Z _ = []
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replicate (S n) x = x :: replicate n x
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2019-10-13 15:59:42 +03:00
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2019-07-24 15:41:20 +03:00
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||| Compute the intersect of two lists by user-supplied equality predicate.
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export
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intersectBy : (a -> a -> Bool) -> List a -> List a -> List a
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intersectBy eq xs ys = [x | x <- xs, any (eq x) ys]
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||| Compute the intersect of two lists according to the `Eq` implementation for the elements.
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export
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intersect : Eq a => List a -> List a -> List a
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intersect = intersectBy (==)
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2019-10-30 01:51:15 +03:00
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||| Combine two lists elementwise using some function.
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||| If the lists are different lengths, the result is truncated to the
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||| length of the shortest list.
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export
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zipWith : (a -> b -> c) -> List a -> List b -> List c
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zipWith _ [] _ = []
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zipWith _ _ [] = []
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zipWith f (x::xs) (y::ys) = f x y :: zipWith f xs ys
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||| Combine two lists elementwise into pairs.
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||| If the lists are different lengths, the result is truncated to the
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||| length of the shortest list.
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export
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zip : List a -> List b -> List (a, b)
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zip = zipWith \x, y => (x, y)
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export
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zipWith3 : (a -> b -> c -> d) -> List a -> List b -> List c -> List d
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zipWith3 _ [] _ _ = []
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zipWith3 _ _ [] _ = []
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zipWith3 _ _ _ [] = []
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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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||| Combine three lists elementwise into tuples.
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||| If the lists are different lengths, the result is truncated to the
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||| length of the shortest list.
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export
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zip3 : List a -> List b -> List c -> List (a, b, c)
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zip3 = zipWith3 \x, y, z => (x, y, z)
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2019-06-15 13:54:22 +03:00
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public export
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data NonEmpty : (xs : List a) -> Type where
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IsNonEmpty : NonEmpty (x :: xs)
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export
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Uninhabited (NonEmpty []) where
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uninhabited IsNonEmpty impossible
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2019-07-02 18:53:41 +03:00
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2019-10-17 01:37:22 +03:00
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||| Get the head of a non-empty list.
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||| @ ok proof the list is non-empty
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public export
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head : (l : List a) -> {auto ok : NonEmpty l} -> a
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head [] impossible
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head (x :: xs) = x
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||| Get the tail of a non-empty list.
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||| @ ok proof the list is non-empty
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public export
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tail : (l : List a) -> {auto ok : NonEmpty l} -> List a
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tail [] impossible
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tail (x :: xs) = xs
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2019-11-12 15:58:21 +03:00
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||| Attempt to get the head of a list. If the list is empty, return `Nothing`.
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head' : List a -> Maybe a
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head' [] = Nothing
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head' (x::xs) = Just x
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||| Attempt to get the tail of a list. If the list is empty, return `Nothing`.
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tail' : List a -> Maybe (List a)
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tail' [] = Nothing
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tail' (x::xs) = Just xs
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2019-07-02 18:53:41 +03:00
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||| Convert any Foldable structure to a list.
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export
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toList : Foldable t => t a -> List a
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toList = foldr (::) []
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2019-10-27 05:07:01 +03:00
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||| Prefix every element in the list with the given element
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||| ```idris example
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||| with List (mergeReplicate '>' ['a', 'b', 'c', 'd', 'e'])
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||| ```
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export
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mergeReplicate : a -> List a -> List a
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mergeReplicate sep [] = []
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mergeReplicate sep (y::ys) = sep :: y :: mergeReplicate sep ys
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2019-07-23 10:37:48 +03:00
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||| Insert some separator between the elements of a list.
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||| ````idris example
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||| with List (intersperse ',' ['a', 'b', 'c', 'd', 'e'])
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||| ````
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export
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intersperse : a -> List a -> List a
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intersperse sep [] = []
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2019-10-27 05:07:01 +03:00
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intersperse sep (x::xs) = x :: mergeReplicate sep xs
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2019-07-23 10:37:48 +03:00
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2019-10-13 15:59:42 +03:00
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||| Apply a partial function to the elements of a list, keeping the ones at which
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||| it is defined.
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export
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mapMaybe : (a -> Maybe b) -> List a -> List b
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mapMaybe f [] = []
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mapMaybe f (x::xs) =
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case f x of
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Nothing => mapMaybe f xs
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Just j => j :: mapMaybe f xs
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2019-07-23 10:37:48 +03:00
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2019-07-06 15:56:57 +03:00
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--------------------------------------------------------------------------------
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-- Sorting
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--------------------------------------------------------------------------------
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||| Check whether a list is sorted with respect to the default ordering for the type of its elements.
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export
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sorted : Ord a => List a -> Bool
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sorted [] = True
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sorted (x::xs) =
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case xs of
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Nil => True
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(y::ys) => x <= y && sorted (y::ys)
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||| Merge two sorted lists using an arbitrary comparison
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||| predicate. Note that the lists must have been sorted using this
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||| predicate already.
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export
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mergeBy : (a -> a -> Ordering) -> List a -> List a -> List a
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mergeBy order [] right = right
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mergeBy order left [] = left
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mergeBy 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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_ => y :: mergeBy order (x::xs) ys
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||| Merge two sorted lists using the default ordering for the type of their elements.
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export
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merge : Ord a => List a -> List a -> List a
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2019-10-27 05:07:01 +03:00
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merge left right = mergeBy compare left right
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2019-07-06 15:56:57 +03:00
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||| Sort a list using some arbitrary comparison predicate.
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|||
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||| @ cmp how to compare elements
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||| @ xs the list to sort
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export
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sortBy : (cmp : a -> a -> Ordering) -> (xs : List a) -> List a
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sortBy cmp [] = []
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sortBy cmp [x] = [x]
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sortBy cmp xs = let (x, y) = split xs in
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mergeBy cmp
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(sortBy cmp (assert_smaller xs x))
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(sortBy cmp (assert_smaller xs y)) -- not structurally smaller, hence assert
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where
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splitRec : List a -> List a -> (List a -> List a) -> (List a, List a)
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splitRec (_::_::xs) (y::ys) zs = splitRec xs ys (zs . ((::) y))
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splitRec _ ys zs = (zs [], ys)
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split : List a -> (List a, List a)
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split xs = splitRec xs xs id
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||| Sort a list using the default ordering for the type of its elements.
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|
export
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|
sort : Ord a => List a -> List a
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|
sort = sortBy compare
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|
2020-02-01 15:57:14 +03:00
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|
export
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|
|
|
isPrefixOfBy : (eq : a -> a -> Bool) -> (left, right : List a) -> Bool
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|
isPrefixOfBy p [] right = True
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|
isPrefixOfBy p left [] = False
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|
isPrefixOfBy p (x::xs) (y::ys) =
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|
if p x y then
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|
isPrefixOfBy p xs ys
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|
else
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|
False
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|
||| The isPrefixOf function takes two lists and returns True iff the first list is a prefix of the second.
|
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|
export
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|
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|
isPrefixOf : Eq a => List a -> List a -> Bool
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|
isPrefixOf = isPrefixOfBy (==)
|
|
|
|
|
2020-02-01 16:32:30 +03:00
|
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|
export
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|
|
|
isSuffixOfBy : (a -> a -> Bool) -> List a -> List a -> Bool
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|
|
isSuffixOfBy p left right = isPrefixOfBy p (reverse left) (reverse right)
|
|
|
|
|
|
|
|
||| The isSuffixOf function takes two lists and returns True iff the first list is a suffix of the second.
|
|
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|
export
|
|
|
|
isSuffixOf : Eq a => List a -> List a -> Bool
|
|
|
|
isSuffixOf = isSuffixOfBy (==)
|
|
|
|
|
|
|
|
||| The isInfixOf function takes two lists and returns True iff the first list
|
|
|
|
||| is contained, wholly and intact, anywhere within the second.
|
|
|
|
|||
|
|
|
|
||| ```idris example
|
|
|
|
||| isInfixOf ['b','c'] ['a', 'b', 'c', 'd']
|
|
|
|
||| ```
|
|
|
|
||| ```idris example
|
|
|
|
||| isInfixOf ['b','d'] ['a', 'b', 'c', 'd']
|
|
|
|
||| ```
|
|
|
|
|||
|
|
|
|
export
|
|
|
|
isInfixOf : Eq a => List a -> List a -> Bool
|
|
|
|
isInfixOf n h = any (isPrefixOf n) (tails h)
|
2020-02-01 15:57:14 +03:00
|
|
|
|
2019-07-07 02:07:59 +03:00
|
|
|
--------------------------------------------------------------------------------
|
|
|
|
-- Properties
|
|
|
|
--------------------------------------------------------------------------------
|
|
|
|
|
2019-07-24 15:41:20 +03:00
|
|
|
export
|
|
|
|
Uninhabited ([] = Prelude.(::) x xs) where
|
|
|
|
uninhabited Refl impossible
|
|
|
|
|
|
|
|
export
|
|
|
|
Uninhabited (Prelude.(::) x xs = []) where
|
|
|
|
uninhabited Refl impossible
|
2019-07-23 10:37:48 +03:00
|
|
|
--
|
2019-07-07 02:07:59 +03:00
|
|
|
-- ||| (::) is injective
|
|
|
|
-- consInjective : {x : a} -> {xs : List a} -> {y : b} -> {ys : List b} ->
|
|
|
|
-- (x :: xs) = (y :: ys) -> (x = y, xs = ys)
|
|
|
|
-- consInjective Refl = (Refl, Refl)
|
2019-07-23 10:37:48 +03:00
|
|
|
--
|
2019-07-07 02:07:59 +03:00
|
|
|
-- ||| Two lists are equal, if their heads are equal and their tails are equal.
|
|
|
|
-- consCong2 : {x : a} -> {xs : List a} -> {y : b} -> {ys : List b} ->
|
|
|
|
-- x = y -> xs = ys -> x :: xs = y :: ys
|
|
|
|
-- consCong2 Refl Refl = Refl
|
2019-07-23 10:37:48 +03:00
|
|
|
--
|
2019-07-07 02:07:59 +03:00
|
|
|
-- ||| Appending pairwise equal lists gives equal lists
|
|
|
|
-- appendCong2 : {x1 : List a} -> {x2 : List a} ->
|
|
|
|
-- {y1 : List b} -> {y2 : List b} ->
|
|
|
|
-- x1 = y1 -> x2 = y2 -> x1 ++ x2 = y1 ++ y2
|
|
|
|
-- appendCong2 {x1=[]} {y1=(_ :: _)} Refl _ impossible
|
|
|
|
-- appendCong2 {x1=(_ :: _)} {y1=[]} Refl _ impossible
|
|
|
|
-- appendCong2 {x1=[]} {y1=[]} _ eq2 = eq2
|
|
|
|
-- appendCong2 {x1=(_ :: _)} {y1=(_ :: _)} eq1 eq2 =
|
|
|
|
-- consCong2
|
|
|
|
-- (fst $ consInjective eq1)
|
|
|
|
-- (appendCong2 (snd $ consInjective eq1) eq2)
|
2019-07-23 10:37:48 +03:00
|
|
|
--
|
2019-07-07 02:07:59 +03:00
|
|
|
-- ||| List.map is distributive over appending.
|
|
|
|
-- mapAppendDistributive : (f : a -> b) -> (x : List a) -> (y : List a) ->
|
|
|
|
-- map f (x ++ y) = map f x ++ map f y
|
|
|
|
-- mapAppendDistributive _ [] _ = Refl
|
|
|
|
-- mapAppendDistributive f (_ :: xs) y = cong $ mapAppendDistributive f xs y
|
2019-07-23 10:37:48 +03:00
|
|
|
--
|
2019-07-07 02:07:59 +03:00
|
|
|
||| The empty list is a right identity for append.
|
|
|
|
export
|
|
|
|
appendNilRightNeutral : (l : List a) ->
|
|
|
|
l ++ [] = l
|
|
|
|
appendNilRightNeutral [] = Refl
|
|
|
|
appendNilRightNeutral (x::xs) =
|
|
|
|
let inductiveHypothesis = appendNilRightNeutral xs in
|
|
|
|
rewrite inductiveHypothesis in Refl
|
|
|
|
|
|
|
|
||| Appending lists is associative.
|
|
|
|
export
|
|
|
|
appendAssociative : (l : List a) -> (c : List a) -> (r : List a) ->
|
|
|
|
l ++ (c ++ r) = (l ++ c) ++ r
|
|
|
|
appendAssociative [] c r = Refl
|
|
|
|
appendAssociative (x::xs) c r =
|
|
|
|
let inductiveHypothesis = appendAssociative xs c r in
|
|
|
|
rewrite inductiveHypothesis in Refl
|
2019-10-10 19:38:09 +03:00
|
|
|
|
2019-10-13 15:59:42 +03:00
|
|
|
revOnto : (xs, vs : _) -> reverseOnto xs vs = reverse vs ++ xs
|
|
|
|
revOnto xs [] = Refl
|
2019-11-12 15:58:21 +03:00
|
|
|
revOnto xs (v :: vs)
|
|
|
|
= rewrite revOnto (v :: xs) vs in
|
2019-10-13 15:59:42 +03:00
|
|
|
rewrite appendAssociative (reverse vs) [v] xs in
|
|
|
|
rewrite revOnto [v] vs in Refl
|
|
|
|
|
|
|
|
export
|
|
|
|
revAppend : (vs, ns : List a) -> reverse ns ++ reverse vs = reverse (vs ++ ns)
|
|
|
|
revAppend [] ns = rewrite appendNilRightNeutral (reverse ns) in Refl
|
2019-11-12 15:58:21 +03:00
|
|
|
revAppend (v :: vs) ns
|
2019-10-13 15:59:42 +03:00
|
|
|
= rewrite revOnto [v] vs in
|
|
|
|
rewrite revOnto [v] (vs ++ ns) in
|
|
|
|
rewrite sym (revAppend vs ns) in
|
|
|
|
rewrite appendAssociative (reverse ns) (reverse vs) [v] in
|
|
|
|
Refl
|
|
|
|
|
2019-10-10 19:38:09 +03:00
|
|
|
public export
|
|
|
|
lemma_val_not_nil : {x : t} -> {xs : List t} -> ((x :: xs) = Prelude.Nil {a = t} -> Void)
|
|
|
|
lemma_val_not_nil Refl impossible
|
|
|
|
|
|
|
|
public export
|
|
|
|
lemma_x_eq_xs_neq : {x : t} -> {xs : List t} -> {y : t} -> {ys : List t} -> (x = y) -> (xs = ys -> Void) -> ((x :: xs) = (y :: ys) -> Void)
|
|
|
|
lemma_x_eq_xs_neq Refl p Refl = p Refl
|
|
|
|
|
|
|
|
public export
|
|
|
|
lemma_x_neq_xs_eq : {x : t} -> {xs : List t} -> {y : t} -> {ys : List t} -> (x = y -> Void) -> (xs = ys) -> ((x :: xs) = (y :: ys) -> Void)
|
|
|
|
lemma_x_neq_xs_eq p Refl Refl = p Refl
|
|
|
|
|
|
|
|
public export
|
|
|
|
lemma_x_neq_xs_neq : {x : t} -> {xs : List t} -> {y : t} -> {ys : List t} -> (x = y -> Void) -> (xs = ys -> Void) -> ((x :: xs) = (y :: ys) -> Void)
|
|
|
|
lemma_x_neq_xs_neq p p' Refl = p Refl
|
|
|
|
|
|
|
|
public export
|
|
|
|
implementation DecEq a => DecEq (List a) where
|
|
|
|
decEq [] [] = Yes Refl
|
|
|
|
decEq (x :: xs) [] = No lemma_val_not_nil
|
|
|
|
decEq [] (x :: xs) = No (negEqSym lemma_val_not_nil)
|
|
|
|
decEq (x :: xs) (y :: ys) with (decEq x y)
|
|
|
|
decEq (x :: xs) (x :: ys) | Yes Refl with (decEq xs ys)
|
|
|
|
decEq (x :: xs) (x :: xs) | (Yes Refl) | (Yes Refl) = Yes Refl
|
|
|
|
decEq (x :: xs) (x :: ys) | (Yes Refl) | (No p) = No (\eq => lemma_x_eq_xs_neq Refl p eq)
|
|
|
|
decEq (x :: xs) (y :: ys) | No p with (decEq xs ys)
|
|
|
|
decEq (x :: xs) (y :: xs) | (No p) | (Yes Refl) = No (\eq => lemma_x_neq_xs_eq p Refl eq)
|
|
|
|
decEq (x :: xs) (y :: ys) | (No p) | (No p') = No (\eq => lemma_x_neq_xs_neq p p' eq)
|
|
|
|
|
|
|
|
|