# strict evaluation of integer accumulator

Here is a classic first attempt at a custom `length` function:

``````length1    []  = 0
length1 (x:xs) = 1 + length1 xs
``````

And here is a tail-recursive version:

``````length2 = length2' 0 where
length2' n    []  = n
length2' n (x:xs) = length2' (n+1) xs
``````

However, `(n+1)` will not be evaluted strictly, but instad Haskell will create a thunk, right?

Is this a correct way to prevent the creation of the thunk, thus forcing strict evaluation of `(n+1)`?

``````length3 = length3' 0 where
length3' n    []  = n
length3' n (x:xs) = length3' (n+1) \$! xs
``````

How would I achieve the same effect with `seq` instead of `\$!`?

-
If you turn on optimization you don't have to do anything since strictness analysis can determine that the definition is strict in `n`. – augustss Jul 8 '13 at 13:55
@augustss Oh, I didn't know that. Thanks! – fredoverflow Jul 8 '13 at 14:58
That said, exactly what happens with that strictness information depends on the type. If you use `Int` it will certainly work. – augustss Jul 8 '13 at 15:13

The usual way now to write it would be as:

``````length3 :: [a] -> Int
length3 = go 0
where
go :: Int -> [a] -> Int
go n []     = n
go n (x:xs) = n `seq` go (n+1) xs
``````

Namely, as a fold over the list strict in the accumulator. GHC yields the direct translation to Core:

``````Main.\$wgo :: forall a_abz. GHC.Prim.Int# -> [a_abz] -> GHC.Prim.Int#
Main.\$wgo =
\ (n :: GHC.Prim.Int#) (xs :: [a_abz]) ->
case xs of
[] -> n
_ : xs -> Main.\$wgo a (GHC.Prim.+# n 1) xs
``````

Showing that it is unboxed (and thus strict) in the accumulator.

-

I don't think that's quite right--`\$!` is strict in its second argument, so you're just forcing the list and not the accumulator.

You can get the right strictness using seq something like this:

``````let n' = n + 1 in n' `seq` length3' n' xs
``````

I think a more readable version would use bang patterns (a GHC extension):

``````length3' !n (x:xs) = ...
``````
-