Which are the uses for id function in Haskell?
It's useful as an argument to higher order functions (functions which take functions as arguments), where you want some particular value left unchanged.
Example 1: Leave a value alone if it is in a Just, otherwise, return a default of 7.
Prelude Data.Maybe> :t maybe maybe :: b -> (a -> b) -> Maybe a -> b Prelude Data.Maybe> maybe 7 id (Just 2) 2
Example 2: building up a function via a fold:
Prelude Data.Maybe> :t foldr (.) id [(+2), (*7)] :: (Num a) => a -> a Prelude Data.Maybe> let f = foldr (.) id [(+2), (*7)] Prelude Data.Maybe> f 7 51
We built a new function
f by folding a list of functions together with
id as the base case.
Example 3: the base case for functions as monoids (simplified).
instance Monoid (a -> a) where mempty = id f `mappend` g = (f . g)
Similar to our example with fold, functions can be treated as concatenable values, with
id serving for the empty case, and
(.) as append.
Example 4: a trivial hash function.
Data.HashTable> h <- new (==) id :: IO (HashTable Data.Int.Int32 Int) Data.HashTable> insert h 7 2 Data.HashTable> Data.HashTable.lookup h 7 Just 2
Hashtables require a hashing function. But what if your key is already hashed? Then pass the id function, to fill in as your hashing method, with zero performance overhead.
If you manipulate numbers, particularly with addition and multiplication, you'll have noticed the usefulness of 0 and 1. Likewise, if you manipulate lists, the empty list turns out to be quite handy. Similarly, if you manipulate functions (very common in functional programming), you'll come to notice the same sort of usefulness of
In functional languages, functions are first class values
that you can pass as a parameter.
So one of the most common uses of
id comes up when
you pass a function as a
parameter to another function to tell it what to do.
One of the choices of what to do is likely to be
"just leave it alone" - in that case, you pass
as the parameter.
Suppose you're searching for some kind of solution to a puzzle where you make a move at each turn. You start with a candidate position
pos. At each stage there is a list of possible transformations you could make to
pos (eg. sliding a piece in the puzzle). In a functional language it's natural to represent transformations as functions so now you can make a list of moves using a list of functions. If "doing nothing" is a legal move in this puzzle, then you would represent that with
id. If you didn't do that then you'd need to handle "doing nothing" as a special case that works differently from "doing something". By using
id you can handle all cases uniformly in a single list.
This is probably the reason why almost all uses of
id exist. To handle "doing nothing" uniformly with "doing something".
For a different sort of answer:
I'll often do this when chaining multiple functions via composition:
foo = id . bar . baz . etc
foo = bar . baz . etc
It keeps things easier to edit. One can do similar things with other 'zero' elements, such as
foo = return >>= bar >>= baz foos =  ++ bars ++ bazs
I can also help improve your golf score. Instead of using
you can save a single character by using id.
zipWith id [(+1), succ] [2,3,4]
An interesting, more than useful result.
Since we are finding nice applications of
id. Here, have a palindrome :)
import Control.Applicative pal :: [a] -> [a] pal = (++) <$> id <*> reverse
Imagine you are a computer, i.e. you can execute a sequence of steps. Then if I want you to stay in your current state, but I always have to give you an instruction (I cannot just mute and let the time pass), what instruction do I give you? Id is the function created for that, for returning the argument unchanged (in the case of the previous computer the argument would be its state) and for having a name for it. That necessity appears only when you have high order functions, when you operate with functions without considering what's inside them, that forces you to represent symbolically even the "do nothing" implementation. Analogously 0 seen as a quantity of something, is a symbol for the absence of quantity. Actually in Algebra both 0 and id are considered the neutral elements of the operations + and ∘ (function composition) respectively, or more formally:
for all x of type number:
- 0 + x = x
- x + 0 = x
for all f of type function:
- id ∘ f = f
- f ∘ id = f
Whenever you need to have a function somewhere, but want to do more than just hold its place (with 'undefined' as an example).
It's also useful, as (soon-to-be) Dr. Stewart mentioned above, for when you need to pass a function as an argument to another function:
join = (>>= id)
or as the result of a function:
let f = id in f 10
(presumably, you will edit the above function later to do something more "interesting"... ;)
As others have mentioned,
id is a wonderful place-holder for when you need a function somewhere.