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Here is the following code in which I try to found some prime divisors. I have tried to convert TAOCP algorithms to Haskell programs but I can understand when something evaluates lazily or eagerly:

modof2 n = let a0 = shiftR n 1
           a1 = shiftL a0 1
       in n-a1
iseven n = modof2 n == 0

factoringby2 n = let s=(lastf (takeWhile f [1..])) + 1
                 d=n `quot` powerof2 s
             in (s,d)
  where f s = let d = n `quot` (powerof2 s)
            in if isodd d 
               then False
               else True
      lastf [] = 0
      lastf xs = last xs

miller_rabin_prime_test n 0 result=return result
miller_rabin_prime_test n k result| (isodd n) && n>3 = do
                                            let z = basic_step n a (fst sd) (snd sd)
                                            miller_rabin_prime_test n (k-1) z
  where sd=factoringby2 n
basic_step:: Integer->Integer->Int->Integer->Bool
basic_step n a s d =any (\x-> x==1 || x==n-1) (map x (map u [0..s-1]))
  where u j=powerof2(j)*d 
        x j=modular_pow a j n 1

isprime n = if n==2 || n==3
        then return True
        else if n<2
             then return False
             else if iseven n
                  then return False
                  else miller_rabin_prime_test n 5 True
x_m :: Double->Integer->Integer
x_m 0 n = 2
x_m m n = f (x_m (m-1) n) `mod` n
where f x = x^2 +1
l m = 2 ^ (floor (log2 m))
where log2 m = log m / log 2
g m n = let a = x_m m n
        b = x_m ((l m)-1) n
     in gcd (a-b) n

gg n = [g m n|m<-[1..]]

algorithmB n = do
            testprime<-isprime n
            let a = head (filter (1>) (gg n))
            c<-algorithmB (n `div` a)
            if testprime
            then return []
            else return (a:c)

algorithmB does not terminate. Why this happens? I think that c<-algorithmB (n div a) is the reason because it does not evaluate lazily. Is that true? Thanks

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I've tried to look into it, but I couldn't run your code. It has indentation messed up, missing imports, undefined symbols, and unmeaningful names (l, g, gg). If you want to get help, please at least provide runnable code. –  rburny Jan 23 '13 at 21:15
Why is that code in IO at all? I don't see a reason for that. –  sepp2k Jan 23 '13 at 21:17
@rburny you are incorrect. (>>=) for IO is strict in its left argument. However, the infinite recursion, I suspect, is caused by the recursive algorithmB having no base case. –  luqui Jan 23 '13 at 21:17
@luqui: I remember writing an interactive program that took input as a single string, then outputted other string. How was it possible? If IO is strict, shouldn't the program wait for whole input before printing anything? –  rburny Jan 23 '13 at 21:22
@rburny, e.g. readFile returns before it has read the whole file -- it returns a magical String that reads the file as it's needed. However, forever (return ()) >> return () will never return in IO, whereas it will in e.g. Identity, and that's the strictness I'm referring to. –  luqui Jan 23 '13 at 21:24

1 Answer 1

up vote 1 down vote accepted

algorithmB calls itself in an infinite loop. Of course it doesn't return!

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