If you are unlucky, your first infinite list will use an infinite amount of memory. So use your second infinite list (or, if you'd prefer an anonymous infinite list, use
repeat from the Prelude).
A demonstration. Perhaps leave
watch free -m running in another window while doing this.
$ cat so.hs
import Control.Exception (evaluate)
import System.IO (hFlush, stdout)
with :: String -> [Int] -> IO ()
with s xs
= do putStrLn $ "Summing part of a " ++ s
theSum <- evaluate $ sum (take 100000000 xs)
firstElem <- evaluate $ head xs
putStrLn $ "sum $ take 100000000 [" ++ show firstElem ++ "...] is " ++ show theSum
main :: IO ()
= do with "call to repeat" (repeat 1)
putStr "Press return to continue..."
with "list comprehension" [1,1..]
$ ghc -O --make so.hs
[1 of 1] Compiling Main ( so.hs, so.o )
Linking so ...
Summing part of a call to repeat
sum $ take 100000000 [1...] is 100000000
Press return to continue...
Summing part of a list comprehension
The first summation runs in constant space. The second summation eats up memory, so I interrupt it before it causes my laptop to swap.
In this simple case we could avoid the space leak by calculating
firstElem before calculating
theSum, but in a real world application this may not be possible, or at least difficult to track down. Better to avoid it by using
(A note on optimisation: if we don't pass the
-O flag to
sum will space leak during both summations. It would not be hard to rewrite
sum = foldl' (+) 0 so that it did not space leak even without
-O. I do not know what considerations lead to the current implementation instead.)