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Monad is a monoid, however it's a monoid in a different way than, say, Integer. I wonder if there is a way to write Monoid' and Monad' such that both Integer and Monad' can be expressed as instances of the same Monoid' typeclass?

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I think you want to read this blog post explaining how to use kind polymorphism to unify the two under the same type class. –  Gabriel Gonzalez Jun 20 '13 at 5:12
@GabrielGonzalez: Can you turn that into an answer? It actually answers the question as I understand it, unlike the current answer. –  Tikhon Jelvis Jun 20 '13 at 11:08

2 Answers 2

up vote 4 down vote accepted

I'm turning my comment into an answer at Tikhon's request. This blog post shows how to unify Monad and Monoid under the same type class using kind polymorphism. This is slightly different from Tel's answer in that the monad is implemented as a monoid in the category of endofunctors, rather than a monoid in a Kleisli category.

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And that's how you do that Monoid! I didn't want to work through kind calculus last night. –  J. Abrahamson Jun 20 '13 at 20:22

So, let's pick a particular way Integer has a Monoid

instance Monoid Int where
  zero = 0
  plus = (+)

and now here's a Monad Monoid

{-# LANGUAGE FlexibleInstances #-}
instance Monad m => Monoid (Kleisli m a a) where
  zero = id
  plus = (.)

and here's another

instance MonadPlus m => Monoid (m a) where
  zero = mzero
  plus = mplus

I'm not sure how to express the "Monad is a monoid in the category of endofunctors" formulation in Haskell offhand, however.

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