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I'm trying to learn Haskell and I'm through all the basics. But now I'm stuck, trying to get my head around functors.

I've read that "A functor transforms one category into another category". What does this mean?

I know it's a lot to ask, but could anyone give me a plain english explanation of functors or maybe a simple use case?

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I found Gabriel's blog post, The functor design pattern, to be quite good. It's not exactly plain English but you should give it a read through and see if it helps. –  Dan Burton Oct 30 '12 at 18:42
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6 Answers

up vote 18 down vote accepted

A fuzzy explanation would be that a Functor is some sort of container and an associated function fmap that allows you to alter whatever is contained, given a function that transforms the contained.

For instance, lists are this kind of container, such that fmap (+1) [1,2,3,4] yields [2,3,4,5].

Maybe can also be made a functor, such that fmap toUpper (Just 'a') yields Just 'A'.

The general type of fmap shows quite neatly what is going on:

fmap :: Functor f => (a -> b) -> f a -> f b

And the specialized versions may make it clearer. Here's the list version:

fmap :: (a -> b) -> [a] -> [b]

And the Maybe version:

fmap :: (a -> b) -> Maybe a -> Maybe b

You can gain information on the standard Functor instances by querying GHCI with :i Functor and many modules define more instances of Functors (and other type classes.)

Please don't take the word "container" too seriously, though. Functors are a well-defined concept, but you can often reason about it with this fuzzy analogy.

Your best bet in understanding what is going on is simply reading the definition of each of the instances, which should give you an intuition on what is going on. From there it's only a small step to really formalize your understanding of the concept. What needs to be added is a clarification of what our "container" really is, and that each instance much satisfy a pair of simple laws.

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From my experience i can say, that container analogy for functors made them harder to understand (especially when it comes to IO). So, in the beginning, one can think of them as some sort of a "computation" attached to a value, and not as a "container" containing a value. –  Anton Guryanov Oct 30 '12 at 9:59
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@AntonGuryanov IO a is a producer (ex nihilo, as far as pure Haskell is concerned) of a. Hence, fmap acting on the output value makes sense. –  Will Ness Oct 30 '12 at 10:12
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IO itself is not pure Haskell. I found this explanation clearer: Consider putStrLn :: String -> IO (). This function takes String and returns an IO (), which can be though of as a computation, in this case output to stdout. The container explanation here is not as clear as computation explanation. But this is only my opinion. –  Anton Guryanov Oct 30 '12 at 13:03
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@WillNess @Anton is correct. The container analogy can only be used for simplicity. However, it's not by any means well defined. Consider for example the Const a functor :) –  is7s Oct 30 '12 at 13:59
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There's no sense splitting hairs over an analogy that was described in the answer as fuzzy. All analogies break down, and Sarah correctly pointed the OP in the direction of a fuller, more law-based understanding. Container's a good start. Producer is the next step. Computational context is nicely general but rather too abstract to start with. (In my opinion as a teacher.) The OP asked for plain English anyway, let's not get too theoretical. –  AndrewC Oct 31 '12 at 15:06
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I've accidently written a

Haskell Functors Tutorial

I'll answer your question using examples, and I'll put the types underneath in comments.

Watch out for the pattern in the types.

fmap is a generalisation of map

Functors are for giving you the fmap function. fmap works like map, so let's check out map first:

map (subtract 1) [2,4,8,16] = [1,3,7,15]
--    Int->Int     [Int]         [Int]

So it uses the function (subtract 1) inside the list. In fact, for lists, fmap does exaclty what map does. Let's multiply everything my 10 this time:

fmap (* 10)  [2,4,8,16] = [10,40,80,160]
--  Int->Int    [Int]         [Int]

I'd describe this as mapping the function that multiplies by 10 over the list.

fmap also works on Maybe

What else can I fmap over? Let's use the Maybe data type, which has two types of values, Nothing and Just x. (You can use Nothing to represent a failure to get an answer while Just x represents an answer.)

fmap  (+7)    (Just 10)  = Just 17
fmap  (+7)     Nothing   = Nothing
--  Int->Int  Maybe Int    Maybe Int

OK, so again, fmap is using (+7) inside the Maybe. And we can fmap other functions too. length finds the length of a list, so we can fmap it over Maybe [Double]

fmap    length             Nothing                      = Nothing
fmap    length    (Just [5.0, 4.0, 3.0, 2.0, 1.573458]) = Just 5
--  [Double]->Int         Maybe [Double]                  Maybe Int

Actually length :: [a] -> Int but I'm using it here on [Double] so I specialised it.

Let's use show to turn stuff into strings. Secretly the actual type of show is Show a => a -> String, but that's a bit long, and I'm using it here on an Int, so it specialises to Int -> String.

fmap  show     (Just 12)  = Just "12"
fmap  show      Nothing   = Nothing
-- Int->String  Maybe Int   Maybe String

also, looking back to lists

fmap   show     [3,4,5] = ["3", "4", "5"]
-- Int->String   [Int]       [String]

fmap works on Either something

Let's use it on a slightly different structure, Either. Values of type Either a b are either Left a values or Right b values. Sometimes we use Either to represent a success Right goodvalue or failure Left errordetails, and sometime just to mix together values of two types into one. Anyway, the functor for the Either data type only works on the Right - it leaves Left values alone. That makes sense particularly if you're using Right values as the successful ones (and in fact we wouldn't be able to make it work on both because the types aren't necessarily the same). Lets use the type Either String Int as an example

fmap (5*)      (Left "hi")     =    Left "hi"
fmap (5*)      (Right 4)       =    Right 20
-- Int->Int  Either String Int   Either String Int

It makes (5*) work inside the Either, but for Eithers, only the Right values get changed. But we can do it the other way round on Either Int String, as long as the function works on strings. Let's put ", cool!" at the end of stuff, using (++ ", cool!").

fmap (++ ", cool!")          (Left 4)           = Left 4
fmap (++ ", cool!") (Right "fmap edits values") = Right "fmap edits values, cool!"
--   String->String    Either Int String          Either Int String

It's especially cool to use fmap on IO

Now one of my favourite ways of using fmap is to use it on IO values to edit the value some IO operation gives me. Let's make an example that lets you type something in and then prints it out straight away:

echo1 :: IO ()
echo1 = do
    putStrLn "Say something!"
    whattheysaid <- getLine  -- getLine :: IO String
    putStrLn whattheysaid    -- putStrLn :: String -> IO ()

We can write that in a way that feels neater to me:

echo2 :: IO ()
echo2 = putStrLn "Say something" 
        >> getLine >>= putStrLn

>> does one thing after another, but the reason I like this is because >>= takes the String that getLine gave us and fed it to putStrLn which takes a String. What if we wanted to just greet the user:

greet1 :: IO ()
greet1 = do
    putStrLn "What's your name?"
    name <- getLine
    putStrLn ("Hello, " ++ name)

If we wanted to write that in the neater way I'm a bit stuck. I'd have to write

greet2 :: IO ()
greet2 = putStrLn "What's your name?" 
         >> getLine >>= (\name -> putStrLn ("Hello, " ++ name))

which is not nicer than the do version. In fact the do notation is there so you don't have to do this. But can fmap come to the rescue? Yes it can. ("Hello, "++) is a function that I can fmap over the getLine!

fmap ("Hello, " ++)  getLine   = -- read a line, return "Hello, " in front of it
--   String->String  IO String    IO String

we can use it like this:

greet3 :: IO ()
greet3 = putStrLn "What's your name?" 
         >> fmap ("Hello, "++) getLine >>= putStrLn

We can pull this trick on anything we're given. Let's disagree with whether "True" or "False" was typed in:

fmap   not      readLn   = -- read a line that has a Bool on it, change it
--  Bool->Bool  IO Bool       IO Bool

Or let's just report the size of a file:

fmap  length    (readFile "test.txt") = -- read the file, return its length
--  String->Int      IO String              IO Int
--   [a]->Int        IO [Char]              IO Int     (more precisely)

Conclusions: What does fmap do, and what does it do it to?

If you've been watching the patterns in the types and thinking about the examples you'll have noticed that fmap takes a function that works on some values, and applies that function on something that has or produces those values somehow, editing the values. (eg readLn was to read Bool, so had type IO Bool there's a Boolean value in it in the sense that it produces a Bool, eg2 [4,5,6] has Ints in it.)

fmap :: (a -> b) -> Something a -> Something b

this works for Something being List-of (written []), Maybe, Either String, Either Int, IO and loads of over things. We call it a Functor if this works in a sensible way (there are some rules - later). The actual type of fmap is

fmap :: Functor somthing => (a -> b) -> something a -> something b

but we usually replace something with f for brevity. It's all the same to the compiler, though:

fmap :: Functor f => (a -> b) -> f a -> f b

Have a look back at the types and check this always works - thing about Either String Int carefully - what's f that time?

Appendix: What are the Functor rules, and why do we have them?

id is the identity function:

id :: a -> a
id x = x

Here are the rules:

fmap id  ==  id                    -- identity identity
fmap (f . g)  ==  fmap f . fmap g  -- composition

Firstly the identity identity: If you map the function that does nothing, that doesn't change anything. That sounds obvious (a lot of rules do), but you can interpret that as saying that fmap is only allowed to change the values, not the structure. fmap isn't allowed to turn Just 4 into Nothing, or [6] into [1,2,3,6], or Right 4 into Left 4 because more than just the data changed - the structure or context for that data changed.

I hit this rule once when I was working on a graphical user interface project - I wanted to be able to edit the values, but I couldn't do it without changing the structure underneath. No-one would have really noticed the difference because it had the same effect, but realising it didn't obey the functor rules made me rethink my whole design, and it's much cleaner, slicker and faster now.

Secondly the composition: this means you can choose whether to fmap one function at a time, or fmap them both at the same time. If fmap leaves the structure/context of your values alone and just edits them with the function its given, it will work with this rule too.

Why do we have them? To make sure fmap doesn't sneakily do anything behind the scenes or change anything we didn't expect. They're not enforced by the compiler (asking the compiler to prove a theorem before it compiles your code isn't fair, and would slow compilation down - the programmer should check). This means you can cheat, but that's a bad plan because your code can give unexpected results.

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It's important to keep separate in your head the distinction between a functor itself, and a value in a type which has a functor applied to it. A functor itself is a type constructor like Maybe, IO, or the list constructor []. A value in a functor is some particular value in a type with that type constructor applied. e.g. Just 3 is one particular value in the type Maybe Int (that type is the Maybe functor applied to the type Int), putStrLn "Hello World" is one particular value in the type IO (), and [2, 4, 8, 16, 32] is one particular value in the type [Int].

I like to think of a value in a type with a functor applied as being "the same" as a value in the base type, but with some extra "context". People often use a container analogy for a functor, which works pretty naturally for quite a few functors but then becomes more of a hindrance than a help when you're having to convince yourself that IO or (->) r is like a container.

So if an Int represents an integer value, then a Maybe Int represents an integer value that may not be present ("may not be present" is the "context"). An [Int] represents an integer value with a number of possible values (this is the same interpretation of the list functor as the "nondeterminism" interpretation of the list monad). An IO Int represents an integer value whose precise value depends on the entire universe (or alternatively, it represents an integer value that can be obtained by running an external process). A Char -> Int is an integer value for any Char value ("function taking r as an argument" is a functor for any type r; with r as Char (->) Char is the type constructor which is a functor, which applied to Int becomes (->) Char Int or Char -> Int in infix notation).

The only thing you can do with a general functor is fmap, with the type Functor f => (a -> b) -> (f a -> f b). fmap transforms a function that operates on normal values into a function that operates on values with additional context added by a functor; what exactly this does is different for each functor, but you can do it with all of them.

So with the Maybe functor fmap (+1) is the function that computes a possibly-not-present integer 1 higher than its input possibly-not-present integer. With the list functor fmap (+1) is the function that computes a nondeterministic integer 1 higher than its input nondeterministic integer. With the IO functor, fmap (+1) is the function that computes an integer 1 higher than its input integer-whose-value-depends-on-the-external-universe. With the (->) Char functor, fmap (+1) is the function that adds 1 to an integer which depends on a Char (when I feed a Char to the return value, I get 1 higher than what I would have got by feeding the same Char to the original value).

But in general, for some unknown functor f, fmap (+1) applied to some value in f Int is "functor version" of the function (+1) on ordinary Ints. It adds 1 to the integer in whatever kind of "context" this particular functor has.

On its own, fmap isn't necessarily that useful. Usually when you're writing a concrete program and working with a functor, you're working with one particular functor, and you often think of fmap as whatever it does for that particular functor. When I'm working with [Int], I'm often not thinking of my [Int] values as nondeterministic integers, I just think of them as lists of integers, and I think of fmap the same way I think of map.

So why bother with functors? Why not just have map for lists, applyToMaybe for Maybes, and applyToIO for IOs? Then everyone would know what they do and no one would have to understand weird abstract concepts like functors.

The key is the recognition that there are a lot of functors out there; almost all container types for a start (hence the container analogy for what functors are). Every one of them has an operation corresponding to fmap, even if we don't have functors. Whenever you write an algorithm solely in terms of the fmap operation (or map, or whatever it's called for your particular type), then if you write it in terms of functors rather than your particular type then it works for all functors.

It can also serve as a form of documentation. If I hand off one of my list values to a function you wrote that operates on lists, it could do any number of things. But if I hand off my list to a function you wrote that operates on values in an arbitrary functor, then I know that the implementation of your function can't be using list features, only functor features.

Thinking back to how you would use functorish things in traditional imperative programming might help see the benefits. There container types like arrays, lists, trees, etc, will usually have some pattern you use to iterate over them. It can be slightly different for different containers, although libraries often provide standard iteration interfaces to address this. But you still end up writing a little for-loop every time you want to iterate over them, and when what you want to do is calculate a result for each item in the container and collect all the results you typically end up mixing in the logic for constructing the new container as you go.

fmap is every for loop of that form you will ever write, sorted once and for all by the library writers, before you even sit down to program. Plus it can also be used with things like Maybe and (->) r that probably wouldn't be seen as having anything to do with a designing a consistent container interface in imperative languages.

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In Haskell, functors capture the notion of having containers of "stuff", such that you can manipulate that "stuff" without changing the shape of the container.

Functors provide one function, fmap, that lets you do this, by taking a regular function and "lifting" it to a function from containers of one type of element to another:

fmap :: Functor f => (a -> b) -> (f a -> f b) 

For example, [], the list type constructor, is a functor:

> fmap show [1, 2, 3]
["1","2","3"]

and so are many other Haskell type constructors, like Maybe and Map Integer1:

> fmap (+1) (Just 3)
Just 4
> fmap length (Data.Map.fromList [(1, "hi"), (2, "there")])
fromList [(1,2),(2,5)]

Note that fmap is not allowed to change the "shape" of the container, so if for example you fmap a list, the result has the same number of elements, and if you fmap a Just it can't become a Nothing. In formal terms, we require that fmap id = id, i.e. if you fmap the identity function, nothing changes.

So far I've been using the term "container", but it's really a bit more general than that. For example, IO is also a functor, and what we mean by "shape" in that case is that fmap on an IO action shouldn't change the side effects. In fact, any monad is a functor2.

In category theory, functors allow you to convert between different categories, but in Haskell we only really have one category, often called Hask. Therefore all functors in Haskell convert from Hask to Hask, so they are what we call endofunctors (functors from a category to itself).

In their simplest form, functors are somewhat boring. There is only so much you can do with just one operation. However, once you start adding operations, you can go from regular functors to applicative functors to monads and things quickly get a lot more interesting, but that's beyond the scope of this answer.

1 But Set is not, because it can only store Ord types. Functors must be able to contain any type.
2 Due to historical reasons, Functor is not a superclass of Monad, though many people think it should be.

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You might want to start here. It's an introduction to category theory using examples in Haskell.

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Let's look at the types.

Prelude> :i Functor
class Functor f where fmap :: (a -> b) -> f a -> f b

But what does that mean?

First, f is a type variable here, and it stands for a type constructor: f a is a type; a is a type variable standing for some type.

Second, given a function g :: a -> b, you'll get fmap g :: f a -> f b. I.e. fmap g is a function, transforming things of type f a to things of type f b. Notice, we can't get at the things of type a nor b here. The function g :: a -> b is somehow made to work on things of type f a and transform them to things of type f b.

Notice that f is the same. Only the other type changes.

What does that mean? It can mean a lot of things. f is usually seen as "container" of stuff. Then, fmap g enables g to act on the inside of these containers, without breaking them open. The results are still enclosed "inside", the typeclass Functor does not provide us with abilities to open them, or peek inside. Just some unobservable transformation inside opaque unchangeable things is all we get. Any other functionality will have to come from somewhere else.

Also note it doesn't say that these "containers" carry just one "thing" of type a; there can be many separate "things" "inside" it, but all of same type a.

We can imagine functors not only as containers (which implies ready-made, static stuff in them), but also as producers/consumers etc. Seen as consumers, g would have to be applied on their input (f b is "something that consumes stuff of type b"). Seen as producers, g would apply on the outputs.

Lastly, any candidate for a functor must obey the functor laws:

fmap id === id
fmap (f . g) === fmap f . fmap g
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