Version 1 (modified by giorgidze, 2 years ago) (diff)


The primary purpose of this wiki page is to documenting the design and implementation of the GHC extension for overloading Haskell's list notation.

A preliminary implementation of the extension can be pulled from the following repositories:


We would very much welcome contributions. If you would like to make a change in the current design and implementation, please document it (e.g., on this wiki page) and/or send us a GHC patch or a pull request.

Current Implementation

Let us briefly recap the notation for constructing lists. In Haskell, the list notation can be be used in the following seven ways:

[]          -- Empty list
[x]         -- x : []
[x,y,z]     -- x : y : z : []
[x .. ]     -- enumFrom x
[x,y ..]    -- enumFromThen x y
[x .. y]    -- enumFromTo x y
[x,y .. z]  -- enumFromThenTo x y z

When the OverloadedLists extension is turned on, the aforementioned seven notations are desugared as follows:

[]          -- fromListN 0 []
[x]         -- fromListN 1 (x : [])
[x,y,z]     -- fromListN 3 (x : y : z : [])
[x .. ]     -- fromList (enumFrom x)
[x,y ..]    -- fromList (enumFromThen x y)
[x .. y]    -- fromList (enumFromTo x y)
[x,y .. z]  -- fromList (enumFromThenTo x y z)

This extension allows programmers to use the list notation for construction of structures like: Set, Map, IntMap, Vector, Text and Array. The following code listing gives a few examples:

['0' .. '9']             :: Set Char
[1 .. 10]                :: Vector Int
[("default",0), (k1,v1)] :: Map String Int
['a' .. 'z']             :: Text

GHC, during the typechecking and desugaring phases, uses whatever is in scope with the names of fromList and fromListN (i.e., fromList and fromListN are rebindable).

That said, the GHC.Exts module exports the FromList class that can be used to overload fromListN and fromListN for different structures. The type class is defined as follows:

class FromList l where
  type Item l
  fromList  :: [Item l] -> l
  fromListN :: Int -> [Item l] -> l
  fromListN _ = fromList

The FromList class and its methods are intended to be used in conjunction with the OverloadedLists extension. The Item type function returns the type of items of the structure l. The fromList function constructs the structure l from the given list of Item l. The fromListN function takes the input list's length as a hint. Its behaviour should be equivalent to fromList. The hint can be used for more efficient construction of the structure l compared to fromList. If the given hint is not equal to the input list's length the behaviour of fromListN is not specified.

In the following, we give several example instances of the FromList type class:

instance FromList [a] where
  type Item [a] = a
  fromList = id

instance (Ord a) => FromList (Set a) where
  type Item (Set a) = a
  fromList = Set.fromList

instance (Ord k) => FromList (Map k v) where
  type Item (Map k v) = (k,v)
  fromList = Map.fromList

instance FromList (IntMap v) where
  type Item (IntMap v) = (Int,v)
  fromList = IntMap.fromList

instance FromList Text where
  type Item Text = Char
  fromList = Text.pack

instance FromList (Vector a) where
  type Item (Vector a) = a
  fromList  = Vector.fromList
  fromListN = Vector.fromListN


Overloading Pattern Matching on Lists



Currently, the FromList class is not accompanied with defaulting rules. Although feasible, not much thought has gone into how to specify the meaning of the default declarations like: default ([a])

Literal Lists

The current implementation of the OverloadedLists extension can be improved by handling the lists that are only populated with literals in a special way. More specifically, the compiler could allocate such lists statically using a compact representation and allow FromList instances to take advantage of the compact representation. Equipped with this capability the OverloadedLists extension will be in a good position to subsume the OverloadedStrings extension (currently, as a special case, string literals benefit from statically allocated compact representation).