I am not very familiar with the degree that Haskell/GHC can optimize code. Below I have a pretty "brute-force" (in the declarative sense) implementation of the n queens problem. I know it can be written more efficiently, but thats not my question. Its that this got me thinking about the GHC optimizations capabilities and limits.
I have expressed it in what I consider a pretty straightforward declarative sense. Filter permutations of [1..n] that fulfill the predicate
For all indices i,j s.t j<i, abs(vi - vj) != j-i I would hope this is the kind of thing that can be optimized, but it also kind of feels like asking a lot of compiler.
validQueens x = and [abs (x!!i - x!!j) /= j-i | i<-[0..length x - 2], j<-[i+1..length x - 1]] queens n = filter validQueens (permutations [1..n]) oneThru x = [1..x] pointlessQueens = filter validQueens . permutations . oneThru main = do n <- getLine print $ pointlessQueens $ (read :: String -> Int) n
This runs fairly slow and grows quickly.
n=10 takes about a second and
n=12 takes forever. Without optimization I can tell the growth is factorial (# of permutations) multiplied by quadratic (# of differences in the predicate to check). Is there any way this code can perform better thru intelligent compilation? I tried the basic
ghc options such has
-O2 and didn't notice a significant difference, but I don't know the finer points (just added the flagS)
My impression is that the function i call
queens can not be optimized and must generate all permutations before filter. Does the point-free version have a better chance? On the one hand I feel like a smart function comprehension between a filter and a predicate might be able to knock off some obviously undesired elements before they are even fully generated, but on the other hand it kind of feels like a lot to ask.
Sorry if this seems rambling, i guess my question is
- Is the pointfree version of above function more capable of being optimized?
- What steps could I take at make/compile/link time to encourage optimization?
- Can you briefly describe some possible (and contrast with the impossible!) means of optimization for the above code? At what point in the process do these occur?
- Is there any particular part of
ghc --make queensN -O2 -voutput I should be paying attention to? Nothing stands out to me. Don't even see much difference in output due to optimization flags
I am not overly concerned with this code example, but I thought writing it got me thinking and it seems to me like a decent vehicle for discussing optimization.
permutations is from Data.List and looks like this:
permutations :: [a] -> [[a]] permutations xs0 = xs0 : perms xs0  where perms  _ =  perms (t:ts) is = foldr interleave (perms ts (t:is)) (permutations is) where interleave xs r = let (_,zs) = interleave' id xs r in zs interleave' _  r = (ts, r) interleave' f (y:ys) r = let (us,zs) = interleave' (f . (y:)) ys r in (y:us, f (t:y:us) : zs)