subG-0.1.0.0: Data/SubG.hs
-- |
-- Module : Data.SubG
-- Copyright : (c) OleksandrZhabenko 2020
-- License : MIT
-- Stability : Experimental
-- Maintainer : olexandr543@yahoo.com
--
--
{-# LANGUAGE MultiParamTypeClasses, FlexibleInstances #-}
module Data.SubG (
subG
, dropWhile
, takeWhile
, span
, preAppend
) where
import Prelude hiding (dropWhile, span, takeWhile)
import qualified Data.Foldable as F
import Data.Monoid
infixr 1 %@, %^
class (Foldable t, Eq a, Eq (t a)) => InsertLeft t a where
(%@) :: a -> t a -> t a -- infixr 1
(%^) :: t a -> t (t a) -> t (t a)
instance (Eq a) => InsertLeft [] a where
(%@) = (:)
(%^) = (:)
-- | Inspired by: 'https://hackage.haskell.org/package/base-4.14.0.0/docs/src/Data.OldList.html#words'
-- and Graham Hutton. A tutorial on the universality and expressiveness of fold. J. Functional Programming 9 (4): 355–372, July 1999.
-- that is available at the URL: 'https://www.cs.nott.ac.uk/~pszgmh/fold.pdf'.
subG :: (InsertLeft t a, Monoid (t a), Monoid (t (t a))) => t a -> t a -> t (t a)
subG whspss xs = if F.null ts then mempty else w %^ subG whspss s''
where ts = dropWhile (`F.elem` whspss) xs
(w, s'') = span (`F.notElem` whspss) ts
dropWhile' :: (InsertLeft t a, Monoid (t a)) => (a -> Bool) -> t a -> (t a, t a)
dropWhile' p = F.foldr f v
where f x (ys, xs) = (if p x then ys else x %@ xs, x %@ xs)
v = (mempty,mempty)
dropWhile :: (InsertLeft t a, Monoid (t a)) => (a -> Bool) -> t a -> t a
dropWhile p = fst . dropWhile' p
span :: (InsertLeft t a, Monoid (t a)) => (a -> Bool) -> t a -> (t a, t a)
span p = fst . span' p
span' :: (InsertLeft t a, Monoid (t a)) => (a -> Bool) -> t a -> ((t a, t a), t a)
span' p = F.foldr f v
where f x ((ys, zs), xs) = (if p x then (x %@ ys, zs) else (mempty,x %@ xs), x %@ xs)
v = ((mempty, mempty), mempty)
takeWhile :: (InsertLeft t a, Monoid (t a)) => (a -> Bool) -> t a -> t a
takeWhile p = fst . takeWhile' p
takeWhile' :: (InsertLeft t a, Monoid (t a)) => (a -> Bool) -> t a -> (t a, t a)
takeWhile' p = F.foldr f v
where f x (ys,xs) = (if p x then x %@ ys else mempty, x %@ xs)
v = (mempty,mempty)
-- | Prepends and appends the given two first arguments to the third one.
preAppend :: (InsertLeft t a, Monoid (t (t a))) => t a -> t (t a) -> t (t a) -> t (t a)
preAppend ts uss tss = mconcat [ts %^ tss, uss]
{-# INLINE preAppend #-}