Difference between revisions of "What a Monad is not"
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It doesn't matter what order we write the two bindings. But for doing I/O we'd like ordering. Monads allow
It doesn't matter what order we write the two bindings. But for doing I/O we'd like ordering. Monads allow to express
Revision as of 19:35, 15 October 2011
- 1 Warning
- 2 Monads are not a good choice as topic for your first Haskell blog entry
- 3 Monads are not a language feature
- 4 Haskell doesn't need Monads
- 5 Monads are not impure
- 6 Monads are not about state
- 7 Monads are not about strictness
- 8 Monads are not values
- 9 Monads are not a replacement for applicative functors
- 10 Monads are not about ordering/sequencing
- 11 See also
This page is currently an unprocessed braindump. Feel free to dump additional stuff or massage stuff into didactic pleasures.
Also, don't be surprised if you leave this page more confused than before. That just means that it has successfully destroyed your false assumptions, or that you've fallen for some horrible inside joke. Beware of Zygohistomorphic prepromorphisms. Go for warm and fuzzy, instead.
Monads are not a good choice as topic for your first Haskell blog entry
...just accept that they're burritos, and wait until later.
Monads are not a language feature
Really. They are defined in terms of Haskell, not Haskell in terms of them. Conversely,
Haskell doesn't need Monads
...well, apart from the current Haskell standard defining the way IO is done in terms of Monads: It could be done differently and still work.
Monads are not impure
...In no way whatsoever. You don't even need flexible morals to claim it. To be more specific, it's IO that's impure. That makes the IO monad impure. But that's not a general property of monads - just IO. And even then, we can pretend that Haskell is a purely functional description language for imperative programs. But we didn't want to employ flexible morals, now did we?
Monads are not about state
While it is certainly possible to abstract away explicit state passing by using a Monad, that's not what a monad is.
(some elaboration needed -- Well, which monad most obviously uses no state at all?)
Monads are not about strictness
Monad operations (bind and return) have to be non-strict in fact, always! However other operations can be specific to each monad. For instance some are strict (like IO), and some are non-strict (like ). Then there are some that come in multiple flavours, like State.
Try the following:
runState (sequence . repeat $ state (\x -> (x,x+1))) 0
Having a look at the implementation of fixIO might be helpful, too.
Monads are not values
This point might be driven home best by pointing out that instance Monad Foo where ... is not a data type, but a declaration of a typeclass instance. However, to elaborate:
Monads are not values in the same sense that addition and multiplication are not numbers, or, for that matter, an oven is not food: They capture a -- very specific -- relationship between values of a specific domain into a common abstraction. We're going to call these values monads manage mobits, somewhat like this:
type Mobit m a = Monad m => m a
The IO monad manages mobits representing side-effects ("IO actions").
The List monad manages mobits representing multiple values ("[a]")
The Reader monads manages mobits that are pure computations that use asks to propagate information instead of explicit arguments
...and while addition and multiplication are both monoids over the positive natural numbers, an oven is a monoid over food (Burned pizza doesn't concern us, here: Food stays food, even if you don't want to eat it.), a monad is a monoid object in a category of endofunctors: return is the unit, and join is the binary operation. It couldn't be more simple. If that confuses you, it might be helpful to see a Monad as a lax functor from a terminal bicategory.
Monads are not a replacement for applicative functors
Instead, every monad is an applicative functor (as well as a functor). It is considered good practice not to use >>= if all you need is <*>, or even fmap.
Not confusing which features of monads are specific to monads only and which stem from applicative functors is vitally important for a deeper understanding of monads. As an example, the applicative functor interface of parser libraries can parse context-free grammars (and look just like EBNF), while the monadic interface can parse context-sensitive grammars: Monads allow you to influence further processing by inspecting the result of your parse. To understand why, have a look at the type of >>=. To understand why applicative functors by themselves are sufficient to track the current parsing position, have a look at the uu-parsinglib tutorial (pdf).
The exact differences are elaborated in even greater detail in Brent Yorgey's excellent Typeclassopedia.
Monads are not about ordering/sequencing
Monads are commonly used to order sequences of computations. But this is misleading. Just as you can use monads for state, or strictness, you can use them to order computations. But there are also commutative monads, like Maybe, that don't order anything. So ordering is not in any way essential to what a monad is.
Let's have a look at what's meant by ordering. Consider an expression like
let x = a y = b in f x y
That gives the same result as
let y = b x = a in f x y
It doesn't matter what order we write the two bindings. But for doing I/O we'd like ordering. Monads allow us to express
do x <- getChar y <- getChar return (x,y)
and have it be different from
do y <- getChar x <- getChar return (x,y)
Unlike the first, the second example returns a pair of characters in the opposite order to which they were entered.
It might help to meditate about the difference between 'assignment' and 'binding', right now.
However, just to spoil the enlightenment you just attained, there are monads for which swapping the order of lines like this makes no difference: For example, the Maybe monad.
So while it is correct to say that monads can be used to order operations, it would be wrong to say that monads are a mechanism for ordering operations.
This notion of commutativity looks superficially very different from the familiar one in vanilla algebra where a+b=b+a. It's not about the fact that
(Just 2 >> Just 3) == Just 3
(Just 2 >> Just 3) /= (Just 3 >> Just 2)
This shouldn't be too surprising, though, as >> isn't the binary operation of some monoid: the algebraic properties of join are very close to those of + and incidentally, join is also the operation true category theorists tend to work with. They also know of bind, but don't use it a lot because, unlike programmers, they don't do any actual productive work.