While monads are represented in Haskell using the bind and return functions, they can also have another representation using the join function, such as discussed here. I know the type of this function is M(M(X))->M(X), but what does this actually do?
Actually, in a way,
The distinctive feature of
With a plain
Monadic "side effects" are structures that have a few additional properties:
So, as far as monadic side effects are concerned, the bind operation is a shorthand for "take a value with associated side effects and a function that introduces new side effects, then apply the function to the value while combining the side effects for each".
: If you compare these properties to the rules for an instance of
What join does has been adequately described by the other answers so far, I think. If you're looking for a more intuitive understanding...if you're wondering what join "means"...then unfortunately the answer is going to vary depending on the monad in question, specifically on what M(X) "means" and what M(M(X)) "means".
If M is the List monad, then M(M(X)) is a list of lists, and join means "flatten". If M is the Maybe monad, then an element of M(M(X)) could be "Just (Just x)", "Just Nothing", or "Nothing", and join means to collapse those structures in the logical way to "Just x", "Nothing", and "Nothing" respectively (similar to camccann's answer of join as combining side effects).
For more complicated monads, M(M(X)) becomes a very abstract thing and deciding what M(M(X)) and join "mean" becomes more complicated. In every case it's kinda like the List monad case, in that you're collapsing two layers of Monad abstraction into one layer, but the meaning is going to vary. For the State monad, camccann's answer of combining two side effects is bang on: join essentially means to combine two successive state transitions. The Continuation monad is especially brain-breaking, but mathematically join is actually rather neat here: M(X) corresponds to the "double dual space" of X, what mathematicians might write as
But I digress.
Personally I try to resist the urge to apply a single analogy to all possible types of monads; monads are just too general a concept to be pigeonholed by a single descriptive analogy. What join means is going to vary depending on which analogy you're working with at any given time.
What it does, conceptually, can be determined just by looking at the type: It unwraps or flattens the outer monadic container/computation and returns the monadic value(s) produced therein.
How it actually does this is determined by the kind of Monad you are dealing with. For example, for the List monad, 'join' is equivalent to concat.
From the same page we recover this information