I have written a sudoku solver in Haskell. It goes through a list and when it finds '0' (an empty cell) it will get the numbers that could fit and try them:
import Data.List (group, (\\), sort) import Data.Maybe (fromMaybe) row :: Int -> [Int] -> [Int] row y grid = foldl (\acc x -> (grid !! x):acc)  [y*9 .. y*9+8] where y' = y*9 column :: Int -> [Int] -> [Int] column x grid = foldl (\acc n -> (grid !! n):acc)  [x,x+9..80] box :: Int -> Int -> [Int] -> [Int] box x y grid = foldl (\acc n -> (grid !! n):acc)  [x+y*9*3+y' | y' <- [0,9,18], x <- [x'..x'+2]] where x' = x*3 isValid :: [Int] -> Bool isValid grid = and [isValidRow, isValidCol, isValidBox] where isValidRow = isValidDiv row isValidCol = isValidDiv column isValidBox = and $ foldl (\acc (x,y) -> isValidList (box x y grid):acc)  [(x,y) | x <- [0..2], y <- [0..2]] isValidDiv f = and $ foldl (\acc x -> isValidList (f x grid):acc)  [0..8] isValidList = all (\x -> length x <= 1) . tail . group . sort -- tail removes entries that are '0' isComplete :: [Int] -> Bool isComplete grid = length (filter (== 0) grid) == 0 solve :: Maybe [Int] -> Maybe [Int] solve grid' = foldl f Nothing [0..80] where grid = fromMaybe  grid' f acc x | isValid grid = if isComplete grid then grid' else f' acc x | otherwise = acc f' acc x | (grid !! x) == 0 = case guess x grid of Nothing -> acc Just x -> Just x | otherwise = acc guess :: Int -> [Int] -> Maybe [Int] guess x grid | length valid /= 0 = foldl f Nothing valid | otherwise = Nothing where valid = [1..9] \\ (row rowN grid ++ column colN grid ++ box (fst boxN) (snd boxN) grid) -- remove numbers already used in row/collumn/box rowN = x `div` 9 -- e.g. 0/9=0 75/9=8 colN = x - (rowN * 9) -- e.g. 0-0=0 75-72=3 boxN = (colN `div` 3, rowN `div` 3) before x = take x grid after x = drop (x+1) grid f acc y = case solve $ Just $ before x ++ [y] ++ after x of Nothing -> acc Just x -> Just x
For some puzzles this works, for example this one:
sudoku :: [Int] sudoku = [5,3,0,6,7,8,0,1,2, 6,7,0,0,0,0,3,4,8, 0,0,8,0,0,0,5,0,7, 8,0,0,0,0,1,0,0,3, 4,2,6,0,0,3,7,9,0, 7,0,0,9,0,0,0,5,0, 9,0,0,5,0,7,0,0,0, 2,8,7,4,1,9,6,0,5, 3,0,0,2,8,0,1,0,0]
Took under a second, however this one:
sudoku :: [Int] sudoku = [5,3,0,0,7,0,0,1,2, 6,7,0,0,0,0,3,4,8, 0,0,0,0,0,0,5,0,7, 8,0,0,0,0,1,0,0,3, 4,2,6,0,0,3,7,9,0, 7,0,0,9,0,0,0,5,0, 9,0,0,5,0,7,0,0,0, 2,8,7,4,1,9,6,0,5, 3,0,0,2,8,0,1,0,0]
I have not seen finish. I don't think this is a problem with the method, as it does return correct results.
Profiling showed that most of the time was spent in the "isValid" function. Is there something obviously inefficient/slow about that function?