I am trying to find the list with the smallest sum of elements.:

shortest :: (Num a) => [[a]] -> [a]
shortest [] = []
shortest (x:xs) = if sum x < sum (shortest xs) then x else shortest xs

That gives me the following error:

Could not deduce (Ord a) arising from a use of `<'
from the context (Eq a)
  bound by the type signature for shortest :: Eq a => [[a]] -> [a]
  at code.hs:(8,1)-(9,71)
Possible fix:
  add (Ord a) to the context of
    the type signature for shortest :: Eq a => [[a]] -> [a]
In the expression: sum x < sum (shortest xs)
In the expression:
  if sum x < sum (shortest xs) then x else shortest xs
In an equation for `shortest':
    shortest (x : xs)
      = if sum x < sum (shortest xs) then x else shortest xs

Why doesn't the function typecheck?

  • shortest isn't really the right name for this, is it? — Consider using minimumBy (compare `on` sum), with higher-order functions from Data.List and Data.Function. – leftaroundabout Oct 22 '12 at 1:20
  • 1
    To understand this problem, it's important to know that not all numbers can be ordered. Consider, for example, complex numbers like 1+2i; there is no canonical way of ordering them. – dflemstr Oct 22 '12 at 9:13
  • 1
    @leftaroundabout already suggested a solution using library functions; but if you still want to write it from scratch as an exercise, besides fixing the type signature problem you need to consider what should be the value of shortest [] or, in other words, what should be the basis of the recursion (hint: minimum and maximum are usually not defined for empty lists). – Rafael Caetano Oct 22 '12 at 9:57

There are two type classes involved in this code: Num and Ord. Note that a type can be a member Num and not Ord, and vice versa.

The type of sum is Num a => [a] -> a so the input elements to shortest needs to be a member of Num. You also do the following in your code:

sum x < sum (shortest xs)

This means that you are using the operator < on as, but in your type signature you have not required that the as be an instance of Ord which defines <:

class Eq a => Ord a where
  compare :: a -> a -> Ordering
  (<) :: a -> a -> Bool

Therefore you need to add that requirement to your type signature:

shortest :: (Ord a, Num a) => [[a]] -> [a]

Or you could leave out the type signature.

  • 5
    One way to diagnose this type of problem, and to learn more about types and typeclasses at the same time, is to temporarily remove the type signature, load the module into GHCi, and then enter ":t shortest" to see what type the compiler assigned to it. Similarly, if you've left out the type signature, try adding it to see if your function has the type signature you expect. I've learned a lot using this technique. – mhwombat Oct 22 '12 at 1:25

Num does not include Ord, so you're missing the Ord constraint on a in the type signature. It should be

shortest :: (Num a, Ord a) => [[a]] -> [a]

You can remove the type signature and GHC will infer this for you.

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