In a list of lists, impose the same length

Question

I have this data type, which should represent a table:

data R = R [Bool]  deriving Eq -- Row
data T = T [R]     deriving Eq -- Table

The problem is that it allows to have table of rows with different length, eg:

tab =T [R [True, False, True, True],
        R [False, False, True, False],
        R [False, False, False, True],
        R [False, False]]

Is it possible to modify the data definition of T to impose that all the R elements have the same length?

Answer 1

Yup, there's a pretty standard way to achieve that. The price you pay, however, is that you don't get to use the standard list functions (because you won't be using a standard list). The idea goes like this: we'll first have a spine telling how long all the "lists" are, then we'll have the actual lists at the bottom of the spine. You can encode the lengths of the lists in many ways; below, I'll just show how to do it with the simple unary numbering system, but you can of course design more efficient versions with other numbering systems.

data BalancedLists_ a as
    = Nil [as]
    | Cons (BalancedLists_ a (a, as))

type BalancedLists a = BalancedLists_ a ()

For example, a balanced list containing two length-3 lists would look like this:

Cons (Cons (Cons (Nil [(1, (2, (3, ()))), (4, (5, (6, ())))])))

There's a wonderful paper extending this technique in a hundred different directions called Manufacturing Datatypes by Ralf Hinze.

Answer 2

You can do it with DataKinds. This may be overcomplicated, though:

{-# LANGUAGE DataKinds, KindSignatures, GADTs #-}
-- requires 7.4.1, I think

data Nat = S Nat | Z

infixr 0 :.
data R (n :: Nat) where
  Nil :: R Z                     -- like []
  (:.) :: Bool -> R n -> R (S n) -- and (:)

data T (n :: Nat) = T [R n]

-- OK
test1 = T [(True :. True :. Nil), (True :. False :. Nil)]

-- will fail
test2 = T [(True :. True :. Nil), (False :. Nil)]

I'd rather recommend @MathematicalOrchids alternative approach using smart constructors.

---

EDIT: What DataKinds do.

The DataKinds extension lets the compiler automatically create a new kind other than * for each data type one writes, and new types living in this kind from the constructors.

So Nat, besides being a simple ADT, also gives rise to a kind Nat , and type constructors Z :: Nat and S :: Nat -> Nat. This S is comparable to Maybe :: * -> * -- it just doesn't use the kind of all types, but your new kind Nat, inhabited only by the representations of the natural numbers.

The point is, that now you also can define type constructors of mixed kinds. The classic example for this is Vec:

data Vec (n :: Nat) (a :: *) where {-...-}

which has kind Vec :: Nat -> * -> *. Similarly, T has kind T :: Nat -> *. This let's you use it with a type-encoded constant lenght, and leads to a type error if one two rows of different lenght are put together.

Although this looks extremely powerful, it is in fact restricted. To get the everything out of such representations, dependently typed languages should like Agda should be used.

Answer 3

The list type represents a container of arbitrary size. You can use a tuple to enforce a specific size - but it's only really feasible for "small" sizes. For example:

data R = R (Bool, Bool, Bool, Bool) deriving Eq

Now each row always contains exactly 4 cells.

If what you actually want is to enforce that the rows can be of any size so long as it as the same for all rows in the table... that is much more difficult. There are several ways to encode this in the type system, but none of them are especially "simple".

The other alternative is to enforce the condition at run-time, rather than trying to guarantee it at compile-time. You could write a module which defines the row and table types, but hides their definition, and only exposes functions for working with these types which preserve the invariable you want (i.e., all rows equal length).

Answer 4

Yet another way is to use Data.Array. One good thing about it is that it allows genuine multidimensional arrays as opposed to arrays of arrays. Just use tuples to index an Array.