Can please someone explain the differences between Functor and Monad in the Scala context?
Scala itself really does not emphasize the
For me looking and playing around with scalaz has been so far the best avenue to get a sense of those functional concepts in the scala context (versus the haskell context). Two years ago when I started scala, the scalaz code was gibberish to me, then a few months ago I started looking again and I realized that it's really a clean implementation of that particular style of functional programming.
For instance the
So functors are more general. Monads provide additional features. To get a sense of what you can do when you have a functor or when you have a monad, you can look at
You'll see utility methods that need an implicit functor (in particular applicative functors) such as
A while ago I wrote about that: http://gabrielsw.blogspot.com/2011/08/functors-applicative-functors-and.html (I'm no expert though)
The first thing to understand is the type ' T[X] ' : It's a kind of "context" (is useful to encode things in types and with this you're "composing" them) But see the other answers :)
Ok, now you have your types inside a context, say M[A] (A "inside" M), and you have a plain function f:A=>B ... you can't just go ahead and apply it, because the function expects A and you have M[A]. You need some way to "unpack" the content of M, apply the function and "pack" it again. If you have "intimate" knowledge of the internals of M you can do it, if you generalize it in a trait you end with
And that's exactly what a functor is. It transforms a T[A] into a T[B] by applying the function f.
A Monad is a mythical creature with elusive understanding and multiple metaphors, but I found it pretty easy to understand once you get the applicative functor:
Functor allow us to apply functions to things in a context. But what if the functions we want to apply are already in a context? (And is pretty easy to end in that situation if you have functions that take more than one parameter).
Now we need something like a Functor but that also takes functions already in the context and applies them to elements in the context. And that's what the applicative functor is. Here is the signature:
So far so good. Now comes the monads: what if now you have a function that puts things in the context? It's signature will be g:X=>M[X] ... you can't use a functor because it expects X=>Y so we'll end with M[M[X]], you can't use the applicative functor because is expecting the function already in the context M[X=>Y] .
So we use a monad, that takes a function X=>M[X] and something already in the context M[A] and applies the function to what's inside the context, packing the result in only one context. The signature is:
It can be pretty abstract, but if you think on how to work with "Option" it shows you how to compose functions X=>Option[X]
EDIT: Forgot the important thing to tie it: the >>= symbol is called bind and is flatMap in Scala. (Also, as a side note, there are some laws that functors, applicatives, and monads have to follow to work properly).
I think this great blog post will help you first for
Taking scalaz as the reference point, a type
That is, if I have a function
If I have a List of Strings, a function from String to Int, then I can obviously produce a List of Ints. This goes for Option, Stream etc. They are all functors
What I find interesting about this is that you might immediately jump to the (incorrect) conclusion that a Functor is a "container" of
So the type X => A for some fixed X is also a functor. In scalaz, functor is designed as a trait as follows:
A couple of functor instances:
In scalaz, a monad is designed like this:
It is not particularly obvious what the usefulness of this might be. It turns out that the answer is "very". I found Daniel Spiewak's Monads are not Metaphors extremely clear in describing why this might be and also Tony Morris's stuff on configuration via the reader monad, a good practical example of what might be meant by writing your program inside a monad.
It is the basic layer from which you define:
All three elements are used to define a