I implemented `zipsWith'`

, `zipsWith''`

and `zipsWithRemains`

for `FT`

. My implementation closely mirrors the implementation of `zipWith`

from this blog post.

First, notice that, given `zipsWith'`

, implementing `zipsWith''`

is trivial:

```
zipsWith''
:: (Functor f, Functor g, Monad m)
=> (forall x y p. (x -> y -> p) -> f x -> g y -> h p)
-> FT f m r
-> FT g m s
-> FT h m (Either r s)
zipsWith'' phi a b = zipsWith' phi (Left <$> a) (Right <$> b)
```

So let's implement `zipsWith'`

.

Begin with an expanded and annotated version of `zipWith`

using folds:

```
newtype RecFold a r = RecFold { runRecFold :: BFold a r }
type AFold a r = RecFold a r -> r
type BFold a r = a -> AFold a r -> r
zipWith
:: forall f g a b c.
(Foldable f, Foldable g)
=> (a -> b -> c)
-> f a
-> g b
-> [c]
zipWith c a b = loop af bf where
af :: AFold a [c]
af = foldr ac ai a
ai :: AFold a [c]
ai _ = []
ac :: a -> AFold a [c] -> AFold a [c]
ac ae ar bl = runRecFold bl ae ar
bf :: BFold a [c]
bf = foldr bc bi b
bi :: BFold a [c]
bi _ _ = []
bc :: b -> BFold a [c] -> BFold a [c]
bc be br ae ar = c ae be : loop ar br
loop :: AFold a [c] -> BFold a [c] -> [c]
loop al bl = al (RecFold bl)
```

And turn it into `zipsWith'`

:

```
newtype RecFold f m r = RecFold { runRecFold :: BFold f m r }
type AFold f m r = m (RecFold f m r -> r)
type BFold f m r = m (f (AFold f m r) -> r)
zipsWith'
:: forall f g h m r.
(Monad m, Functor f, Functor g)
=> (forall x y p. (x -> y -> p) -> f x -> g y -> h p)
-> FT f m r
-> FT g m r
-> FT h m r
zipsWith' phi a b = loop af bf where
af :: AFold f m (FT h m r)
af = runFT a ai ac
ai :: r -> AFold f m (FT h m r)
ai r = return $ const $ return r
ac :: (x -> AFold f m (FT h m r)) -> f x -> AFold f m (FT h m r)
ac am ae = return $ effect . fmap ($ (fmap am ae)) . runRecFold
bf :: BFold f m (FT h m r)
bf = runFT b bi bc
bi :: r -> BFold f m (FT h m r)
bi r = return $ const $ return r
bc :: (x -> BFold f m (FT h m r)) -> g x -> BFold f m (FT h m r)
bc bm be = return $ wrap . flip (phi loop) (fmap bm be)
loop :: AFold f m (FT h m r) -> BFold f m (FT h m r) -> FT h m r
loop av bv = effect $ fmap ($ (RecFold bv)) av
```

Here, two auxiliary functions are used: `effect`

and `wrap`

.

```
effect :: Monad m => m (FT f m r) -> FT f m r
effect m = FT $ \hr hy -> m >>= \r -> runFT r hr hy
wrap :: f (FT f m r) -> FT f m r
wrap s = FT $ \hr hy -> hy (\v -> runFT v hr hy) s
```

Note that the result could be any monad for which these functions are implemented.

To implement `zipsWithRemains`

, start by implementing `zipWithRemains`

for ordinary `Foldable`

s:

```
data ListWithTail a b = Nil b | Cons a (ListWithTail a b)
type Result a b c = ListWithTail c (Either [b] (a, [a]))
newtype RecFold a b c = RecFold { runRecFold :: BFold a b c }
type AFold a b c = (RecFold a b c -> Result a b c, [a])
type BFold a b c = (a -> AFold a b c -> Result a b c, [b])
zipWithRemains
:: forall f g a b c.
(Foldable f, Foldable g)
=> (a -> b -> c)
-> f a
-> g b
-> Result a b c
zipWithRemains c a b = loop af bf where
af :: AFold a b c
af = foldr ac ai a
ai :: AFold a b c
ai = (\bl -> Nil $ Left $ snd (runRecFold bl), [])
ac :: a -> AFold a b c -> AFold a b c
ac ae ar = (\bl -> fst (runRecFold bl) ae ar, ae : snd ar)
bf :: BFold a b c
bf = foldr bc bi b
bi :: BFold a b c
bi = (\ae ar -> Nil $ Right (ae, snd ar), [])
bc :: b -> BFold a b c -> BFold a b c
bc be br = (\ae ar -> Cons (c ae be) (loop ar br), be : snd br)
loop :: AFold a b c -> BFold a b c -> Result a b c
loop al bl = fst al (RecFold bl)
```

Here, the result of a fold is not a function but a 2-tuple containing a function and a value. The latter is used to handle the "remains" case.

This can also be adapted to `FT`

:

```
type Result f g h m r s = FT h m (Either (r, FT g m s) (f (FT f m r), s))
newtype RecFold f g h m r s = RecFold { runRecFold :: BFold f g h m r s }
type AFold f g h m r s = m (RecFold f g h m r s -> Result f g h m r s, FT f m r)
type BFold f g h m r s = m (f (AFold f g h m r s) -> Result f g h m r s, FT g m s)
zipsWithRemains
:: forall f g h m r s.
(Monad m, Functor f, Functor g)
=> (forall x y p. (x -> y -> p) -> f x -> g y -> h p)
-> FT f m r
-> FT g m s
-> Result f g h m r s
zipsWithRemains phi a b = loop af bf where
af :: AFold f g h m r s
af = runFT a ai ac
ai :: r -> AFold f g h m r s
ai r = return (return . Left . (r,) . effect . fmap snd . runRecFold, return r)
ac :: (x -> AFold f g h m r s) -> f x -> AFold f g h m r s
ac am ae = return (effect . fmap (($ (fmap am ae)) . fst) . runRecFold, wrap $ fmap (effect . fmap snd . am) ae)
bf :: BFold f g h m r s
bf = runFT b bi bc
bi :: s -> BFold f g h m r s
bi r = return (return . Right . (,r) . fmap (effect . fmap snd), return r)
bc :: (x -> BFold f g h m r s) -> g x -> BFold f g h m r s
bc bm be = return (wrap . flip (phi loop) (fmap bm be), wrap $ fmap (effect . fmap snd . bm) be)
loop :: AFold f g h m r s -> BFold f g h m r s -> Result f g h m r s
loop av bv = effect $ fmap (($ (RecFold bv)) . fst) av
```

I wish Haskell had local types!

This probably answers the question for `FT`

. Regarding `FF`

: this type is designed such that to do anything with it, you first have to convert it to some other monad. So, the question is, which one? It is possible to convert it to `Stream`

or `FreeT`

, and use the functions for those types. It is also possible to convert it to `FT`

and use the above implementations on it. Is there a monad better suited for implementing `zipsWith`

? Maybe.

`zipsWith''`

and`zipsWithRemains`

, what happens if both streams finish at the same time?`mplus`

, which is defined using`zipsWith'`

.`zipsWithRemains`

helps clarify that somewhat with its asymmetrical result: note the`f (Stream f m r)`

as opposed to the`Stream g m s`

.