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I'm trying to find all the primes less than some integer n as concisely as possible, using list comprehensions. I'm learning Haskell, and this is just an exercise. I'd like to write something like:

isqrt :: Integral a => a -> a   
isqrt = floor . sqrt . fromIntegral

primes :: Integral a => a -> [a]  
primes n = [i | i <- [1,3..n], mod i k /= 0 | k <- primes (isqrt i)]

which of course doesn't work. Is there a way to have a list comprehension inside a list comprehension?

Here is the error I'm getting:

exercise-99-1.hs:138:39: Not in scope: `k'

    Illegal parallel list comprehension: use -XParallelListComp

exercise-99-1.hs:138:68: Not in scope: `i'

BUT - I wasn't really expecting the syntax to even be legit :-)

The intent was to translate as directly as possible: "primes n = the set of odd integers i less than n such that i is not divisible by any k, for all k in the set: primes (isqrt i)" - more or less (I hope I got that right?)


share|improve this question
Doesn't work is extremely unhelpful. Post the error. – Dhaivat Pandya May 22 '11 at 0:47
Could you put that error into the body of your post? Thanks. – Jonathan Sterling May 22 '11 at 0:59
up vote 0 down vote accepted

I made some progress with the following:

primes :: Integral a => a -> [a]  
primes 2 = [2]  
primes n = 2:[i | i <- [3,5..n], all (\k -> if (mod i k /= 0) then True else False) (primes (isqrt i))]

Is there a shorter way to write the lambda predicate?


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Interestingly, it works even with the "primes 2" line... – Frank May 22 '11 at 2:36
Never say if ... then True else False. Instead just say the ... part: \k -> mod i k /= 0 – Phob May 22 '11 at 2:36
You can also make it point-free, if that's your thing: ((/= 0) . mod i) – Phob May 22 '11 at 2:37
Even clearer is to define a separate function: divisible i = (== 0) . mod i, and then instead of your lambda function, have (not . divisible i) – Phob May 22 '11 at 2:38
@Frank: Because the conditional expression already evaluates to True or False. The if statement is completely redundant and clutters things up. – C. A. McCann May 22 '11 at 2:43

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