Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

It is well-known that applicative functors are closed under composition but monads are not. However, I have been having trouble finding a concrete counterexample showing that monads do not always compose.

This answer gives [String -> a] as an example of a non-monad. After playing around with it for a bit, I believe it intuitively, but that answer just says "join cannot be implemented" without really giving any justification. I would like something more formal. Of course there are lots of functions with type [String -> [String -> a]] -> [String -> a]; one must show that any such function necessarily does not satisfy the monad laws.

Any example (with accompanying proof) will do; I am not necessarily looking for a proof of the above example in particular.

share|improve this question
    
The closest I can find is the appendix of web.cecs.pdx.edu/~mpj/pubs/RR-1004.pdf, which shows that under a lot of simplifying assumptions, it is impossible to write join for the composition of two monads in general. But this does not lead to any concrete examples. –  Brent Yorgey Oct 23 '12 at 15:50
    
You may get better answers to this question on cs.stackexchange.com, the new Computer Science Stack Exchange site. –  Patrick87 Oct 23 '12 at 18:24
2  
Perhaps I'm not understanding, but I think the question could be more precisely defined. When you say "composing" two monads, do you mean simply composing the type constructors? And when the result "is not a monad", does this mean that a monad instance of that type construcor cannot be written? And, if a monad instance for the composed type constructor can be written, does it have to bear any relation to the instances of the two factor monads, or can it be totally unrelated? –  Owen Oct 23 '12 at 21:50
1  
Yes, I mean composing the type constructors; "not a monad" means a valid (lawful) monad instance cannot be written; and I don't care whether the instance for the composition has any relation to the instances of the factors. –  Brent Yorgey Oct 24 '12 at 23:12

4 Answers 4

up vote 25 down vote accepted

Consider this monad which is isomorphic to the (Bool ->) monad:

data Pair a = P a a

instance Functor Pair where
  fmap f (P x y) = P (f x) (f y)

instance Monad Pair where
  return x = P x x
  P a b >>= f = P x y
    where P x _ = f a
          P _ y = f b

and compose it with the Maybe monad:

newtype Bad a = B (Maybe (Pair a))

I claim that Bad cannot be a monad.


Partial proof:

There's only one way to define fmap that satisfies fmap id = id:

instance Functor Bad where
    fmap f (B x) = B $ fmap (fmap f) x

Recall the monad laws:

(1) join (return x) = x 
(2) join (fmap return x) = x
(3) join (join x) = join (fmap join x)

For the definition of return x, we have two choices: B Nothing or B (Just (P x x)). It's clear that in order to have any hope of returning x from (1) and (2), we can't throw away x, so we have to pick the second option.

return' :: a -> Bad a
return' x = B (Just (P x x))

That leaves join. Since there are only a few possible inputs, we can make a case for each:

join :: Bad (Bad a) -> Bad a
(A) join (B Nothing) = ???
(B) join (B (Just (P (B Nothing)          (B Nothing))))          = ???
(C) join (B (Just (P (B (Just (P x1 x2))) (B Nothing))))          = ???
(D) join (B (Just (P (B Nothing)          (B (Just (P x1 x2)))))) = ???
(E) join (B (Just (P (B (Just (P x1 x2))) (B (Just (P x3 x4)))))) = ???

Since the output has type Bad a, the only options are B Nothing or B (Just (P y1 y2)) where y1, y2 have to be chosen from x1 ... x4.

In cases (A) and (B), we have no values of type a, so we're forced to return B Nothing in both cases.

Case (E) is determined by the (1) and (2) monad laws:

-- apply (1) to (B (Just (P y1 y2)))
join (return' (B (Just (P y1 y2))))
= -- using our definition of return'
join (B (Just (P (B (Just (P y1 y2))) (B (Just (P y1 y2))))))
= -- from (1) this should equal
B (Just (P y1 y2))

In order to return B (Just (P y1 y2)) in case (E), this means we must pick y1 from either x1 or x3, and y2 from either x2 or x4.

-- apply (2) to (B (Just (P y1 y2)))
join (fmap return' (B (Just (P y1 y2))))
= -- def of fmap
join (B (Just (P (return y1) (return y2))))
= -- def of return
join (B (Just (P (B (Just (P y1 y1))) (B (Just (P y2 y2))))))
= -- from (2) this should equal
B (Just (P y1 y2))

Likewise, this says that we must pick y1 from either x1 or x2, and y2 from either x3 or x4. Combining the two, we determine that the right hand side of (E) must be B (Just (P x1 x4)).

So far it's all good, but the problem comes when you try to fill in the right hand sides for (C) and (D).

There are 5 possible right hand sides for each, and none of the combinations work. I don't have a nice argument for this yet, but I do have a program that exhaustively tests all the combinations:

{-# LANGUAGE ImpredicativeTypes, ScopedTypeVariables #-}

import Control.Monad (guard)

data Pair a = P a a
  deriving (Eq, Show)

instance Functor Pair where
  fmap f (P x y) = P (f x) (f y)

instance Monad Pair where
  return x = P x x
  P a b >>= f = P x y
    where P x _ = f a
          P _ y = f b

newtype Bad a = B (Maybe (Pair a))
  deriving (Eq, Show)

instance Functor Bad where
  fmap f (B x) = B $ fmap (fmap f) x

-- The only definition that could possibly work.
unit :: a -> Bad a
unit x = B (Just (P x x))

-- Number of possible definitions of join for this type. If this equals zero, no monad for you!
joins :: Integer
joins = sum $ do
  -- Try all possible ways of handling cases 3 and 4 in the definition of join below.
  let ways = [ \_ _ -> B Nothing
             , \a b -> B (Just (P a a))
             , \a b -> B (Just (P a b))
             , \a b -> B (Just (P b a))
             , \a b -> B (Just (P b b)) ] :: [forall a. a -> a -> Bad a]
  c3 :: forall a. a -> a -> Bad a <- ways
  c4 :: forall a. a -> a -> Bad a <- ways

  let join :: forall a. Bad (Bad a) -> Bad a
      join (B Nothing) = B Nothing -- no choice
      join (B (Just (P (B Nothing) (B Nothing)))) = B Nothing -- again, no choice
      join (B (Just (P (B (Just (P x1 x2))) (B Nothing)))) = c3 x1 x2
      join (B (Just (P (B Nothing) (B (Just (P x3 x4)))))) = c4 x3 x4
      join (B (Just (P (B (Just (P x1 x2))) (B (Just (P x3 x4)))))) = B (Just (P x1 x4)) -- derived from monad laws

  -- We've already learnt all we can from these two, but I decided to leave them in anyway.
  guard $ all (\x -> join (unit x) == x) bad1
  guard $ all (\x -> join (fmap unit x) == x) bad1

  -- This is the one that matters
  guard $ all (\x -> join (join x) == join (fmap join x)) bad3

  return 1 

main = putStrLn $ show joins ++ " combinations work."

-- Functions for making all the different forms of Bad values containing distinct Ints.

bad1 :: [Bad Int]
bad1 = map fst (bad1' 1)

bad3 :: [Bad (Bad (Bad Int))]
bad3 = map fst (bad3' 1)

bad1' :: Int -> [(Bad Int, Int)]
bad1' n = [(B Nothing, n), (B (Just (P n (n+1))), n+2)]

bad2' :: Int -> [(Bad (Bad Int), Int)]
bad2' n = (B Nothing, n) : do
  (x, n')  <- bad1' n
  (y, n'') <- bad1' n'
  return (B (Just (P x y)), n'')

bad3' :: Int -> [(Bad (Bad (Bad Int)), Int)]
bad3' n = (B Nothing, n) : do
  (x, n')  <- bad2' n
  (y, n'') <- bad2' n'
  return (B (Just (P x y)), n'')
share|improve this answer
    
Thanks, I'm convinced! Though it does make me wonder whether there are ways to simplify your proof. –  Brent Yorgey Oct 25 '12 at 2:07
1  
@BrentYorgey: I suspect there should be, as the problems with cases (C) and (D) seem to be very much like the problems you have when trying to define swap :: Pair (Maybe a) -> Maybe (Pair a). –  hammar Oct 25 '12 at 2:20

Constructing excluded middle

(->) r is a monad for every r and Either e is a monad for every e. Let's define their composition ((->) r inside, Either e outside):

import Control.Monad
newtype Comp r e a = Comp { uncomp :: Either e (r -> a) }

I claim that if Comp r e were a monad for every r and e then we could realize the law of exluded middle. This is not possible in intuitionistic logic which underlies typesystems of functional languages (having the law of excluded middle is equivalent to having the call/cc operator).

Let's assume Comp is a monad. Then we have

join :: Comp r e (Comp r e a) -> Comp r e a

and so we can define

swap :: (r -> Either e a) -> Either e (r -> a)
swap = uncomp . join . Comp . return . liftM (Comp . liftM return)

(This is just the swap function from paper Composing monads that Brent mentions, Sect. 4.3, only with newtype's (de)constructors added. Note that we don't care what properties it has, the only important thing is that it is definable and total.)

Now let's set

data False -- an empty datatype corresponding to logical false
type Neg a = (a -> False) -- corresponds to logical negation

and specialize swap for r = b, e = b, a = False:

excludedMiddle :: Either b (Neg b)
excludedMiddle = swap Left

Conclusion: Even though (->) r and Either r are monads, their composition Comp r r cannot be.

Note: That this is also reflected in how ReaderT and EitherT are defined. Both ReaderT r (Either e) and EitherT e (Reader r) are isomorphic to r -> Either e a! There is no way how to define monad for the dual Either e (r -> a).


Escaping IO actions

There are many examples in the same vein that involve IO and which lead to escaping IO somehow. For example:

newtype Comp r a = Comp { uncomp :: IO (r -> a) }

swap :: (r -> IO a) -> IO (r -> a)
swap = uncomp . join . Comp . return . liftM (Comp . liftM return)

Now let's have

main :: IO ()
main = do
   let foo True  = print "First" >> return 1
       foo False = print "Second" >> return 2
   f <- swap foo
   input <- readLn
   print (f input)

What will happen when this program is run? There are two possibilities:

  1. "First" or "Second" is printed after we read input from the console, meaning that the sequence of actions was reversed and that the actions from foo escaped into pure f.
  2. Or swap (hence join) throws away the IO action and neither "First" nor "Second" is ever printed. But this means that join violates the law

    join . return = id
    

    because if join throws the IO action away, then

    foo ≠ (join . return) foo
    

Other similar IO + monad combinations lead to constructing

swapEither :: IO (Either e a) -> Either e (IO a)
swapWriter :: (Monoid e) => IO (Writer e a) -> Writer e (IO a)
swapState  :: IO (State e a) -> State e (IO a)
...

Either their join implementations must allow e to escape from IO or they must throw it away and replace with something else, violating the law.

share|improve this answer
    
(I suppose "ap" is a typo in "where fmap, pure and ap are the canonical definitions" (should be <*> instead), tried to edit it but I was told my edit was too short.) --- It's not clear to me that having a definition for join implies a definition for swap. Could you expand on it? The paper referred by Brent seems to imply that to go from join to swap we need the following assumptions: joinM . fmapM join = join . joinM and join . fmap (fmapM joinN ) = fmapM joinN . join where joinM = join :: M, etc. –  Rafael Caetano Oct 24 '12 at 15:11
1  
@RafaelCaetano Thanks for the typo, I fixed it (and also renamed the function to swap to match the paper). I didn't check the paper until now, and you're right, looks like we need J(1) and J(2) to define swap <-> join. This is perhaps a weak spot of my proof and I'll think about it more (maybe it'd be possible to get something from the fact that it's Applicative). –  Petr Pudlák Oct 24 '12 at 17:34
    
@RafaelCaetano But I believe the proof is still valid: If we had join, we could define swap :: (Int -> Maybe a) -> Maybe (Int -> a) using the above definition (no matter what laws this swap satisfies). How would such swap behave? Having no Int, it has nothing to pass to its argument, so it would have to return Nothing for all inputs. I believe we can get a contradiction for join's monad laws without needing to define join from swap back. I'll check it and let you know. –  Petr Pudlák Oct 24 '12 at 17:42
    
@Petr: As it stands I agree with Rafael that this is not quite the proof I am looking for, but I am also curious to see whether it can be fixed along the lines you mention. –  Brent Yorgey Oct 25 '12 at 2:10
1  
@PetrPudlák Wow, very nice! Yes, I totally buy it now. These are some really interesting insights. I would not have guessed that simply being able to construct swap could lead to a contradiction, without reference to any of the monad laws at all! If I could accept multiple answers I would accept this one too. –  Brent Yorgey Oct 26 '12 at 14:55

For a small concrete counterexample, consider the terminal monad.

data Thud x = Thud

The return and >>= just go Thud, and the laws hold trivially.

Now let's also have the writer monad for Bool (with, let's say, the xor-monoid structure).

data Flip x = Flip Bool x

instance Monad Flip where
   return x = Flip False x
   Flip False x  >>= f = f x
   Flip True x   >>= f = Flip (not b) y where Flip b y = f x

Er, um, we'll need composition

newtype (:.:) f g x = C (f (g x))

Now try to define...

instance Monad (Flip :.: Thud) where  -- that's effectively the constant `Bool` functor
  return x = C (Flip ??? Thud)
  ...

Parametricity tells us that ??? can't depend in any useful way on x, so it must be a constant. As a result, join . return is necessarily a constant function also, hence the law

join . return = id

must fail for whatever definitions of join and return we choose.

share|improve this answer

Your link references this data type, so let's try picking some specific implementation: data A3 a = A3 (A1 (A2 a))

I will arbitrarily pick A1 = IO, A2 = []. We'll also make it a newtype and give it a particularly pointed name, for fun:

newtype ListT IO a = ListT (IO [a])

Let's come up with some arbitrary action in that type, and run it in two different-but-equal ways:

λ> let v n = ListT $ do {putStr (show n); return [0, 1]}
λ> runListT $ ((v >=> v) >=> v) 0
0010101[0,1,0,1,0,1,0,1]
λ> runListT $ (v >=> (v >=> v)) 0
0001101[0,1,0,1,0,1,0,1]

As you can see, this breaks the associativity law: ∀x y z. (x >=> y) >=> z == x >=> (y >=> z).

It turns out, ListT m is only a monad if m is a commutative monad. This prevents a large category of monads from composing with [], which breaks the universal rule of "composing two arbitrary monads yields a monad".

See also: http://stackoverflow.com/a/12617918/1769569

share|improve this answer
10  
I would think this only shows that one specific definition of ListT fails to produce a monad in all cases, rather than showing that no possible definition can work. –  C. A. McCann Oct 23 '12 at 21:08
    
I don't have to. The negation of "for all this, that" is "there exists a counter-example". The question asked was "for all monads, their composition forms a monad". I have shown a combination of types that are monads on their own, but can't compose. –  hpc Oct 23 '12 at 21:20
9  
@hpc, but the composition of two monads is more than the composition of their types. You also need the operations, and my interpretation of Brent's question is that there may not be a methodical way to derive the implementation of the operations -- he is looking for something yet stronger, that some some compositions have no operations satisfying the laws, whether mechanically derivable or not. Does that make sense? –  luqui Oct 23 '12 at 22:03
    
Yes, luqui has it right. Sorry if my original question was not clear. –  Brent Yorgey Oct 25 '12 at 2:11
    
What's really missing from this answer is the Monad instance for ListT, and a demonstration that there aren't any others. The statement is "for all this, there exists that" and so the negation is "there exists this such that for all that" –  Ben Millwood Nov 2 '12 at 11:18

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.