# The Knights Tour

### From HaskellWiki

(Logic monad tweaks) |
m (showBoard tweaks) |

## Revision as of 02:45, 1 December 2008

The Knight's Tour is a mathematical problem involving a knight on a chessboard. The knight is placed on the empty board and, moving according to the rules of chess, must visit each square exactly once.

Here are some Haskell implementations.

## Contents |

## 1 One

-- -- Quick implementation by dmwit on #haskell -- Faster, shorter, uses less memory than the Python version. -- import Control.Arrow import Control.Monad import Data.List import Data.Maybe import Data.Ord import System.Environment import qualified Data.Map as M sortOn f = map snd . sortBy (comparing fst) . map (f &&& id) clip coord size = coord >= 0 && coord < size valid size solution xy@(x, y) = and [clip x size, clip y size, isNothing (M.lookup xy solution)] neighbors size solution xy = length . filter (valid size solution) $ sequence moves xy moves = do f <- [(+), subtract] g <- [(+), subtract] (x, y) <- [(1, 2), (2, 1)] [f x *** g y] solve size solution n xy = do guard (valid size solution xy) let solution' = M.insert xy n solution sortedMoves = sortOn (neighbors size solution) (sequence moves xy) if n == size * size then [solution'] else sortedMoves >>= solve size solution' (n+1) printBoard size solution = board [0..size-1] where sqSize = size * size elemSize = length (show sqSize) separator = intercalate (replicate elemSize '-') (replicate (size + 1) "+") pad n s = replicate (elemSize - length s) ' ' ++ s elem xy = pad elemSize . show $ solution M.! xy line y = concat . intersperseWrap "|" $ [elem (x, y) | x <- [0..size-1]] board = unlines . intersperseWrap separator . map line intersperseWrap s ss = s : intersperse s ss ++ [s] go size = case solve size M.empty 1 (0, 0) of [] -> "No solution found" (s:_) -> printBoard size s main = do args <- getArgs name <- getProgName putStrLn $ case map reads args of [] -> go 8 [[(size, "")]] -> go size _ -> "Usage: " ++ name ++ " <size>"

## 2 Using Continuations

An efficient version (some 10x faster than the example Python solution) using continuations.

This is about as direct a translation of the Python algorithm as you'll get without sticking the whole thing in IO. The Python version prints the board and exits immediately upon finding it, so it can roll back changes if that doesn't happen. Instead, this version sets up an exit continuation using callCC and calls that to immediately return the first solution found. The Logic version below takes around 50% more time.

import Control.Monad.Cont import Control.Monad.ST import Data.Array.ST import Data.List import Data.Ord import Data.Ix import System.Environment type Square = (Int, Int) type Board s = STUArray s (Int,Int) Int type ChessM r s = ContT r (ST s) type ChessK r s = String -> ChessM r s () successors :: Int -> Board s -> Square -> ChessM r s [Square] successors n b = sortWith (fmap length . succs) <=< succs where sortWith f l = map fst `fmap` sortBy (comparing snd) `fmap` mapM (\x -> (,) x `fmap` f x) l succs (i,j) = filterM (empty b) [ (i', j') | (dx,dy) <- [(1,2),(2,1)] , i' <- [i+dx,i-dx] , j' <- [j+dy, j-dy] , inRange ((1,1),(n,n)) (i',j') ] empty :: Board s -> Square -> ChessM r s Bool empty b s = fmap (<1) . lift $ readArray b s mark :: Square -> Int -> Board s -> ChessM r s () mark s k b = lift $ writeArray b s k tour :: Int -> Int -> ChessK r s -> Square -> Board s -> ChessM r s () tour n k exit s b | k > n*n = showBoard n b >>= exit | otherwise = successors n b s >>= mapM_ (\x -> do mark x k b tour n (k+1) exit x b -- failed mark x 0 b) showBoard :: Int -> Board s -> ChessM r s String showBoard n b = fmap unlines . forM [1..n] $ \i -> fmap unwords . forM [1..n] $ \j -> pad `fmap` lift (readArray b (i,j)) where k = ceiling . logBase 10 . fromIntegral $ n*n + 1 pad i = let s = show i in replicate (k-length s) ' ' ++ s main = do (n:_) <- map read `fmap` getArgs s <- stToIO . flip runContT return $ (do b <- lift $ newArray ((1,1),(n,n)) 0 mark (1,1) 1 b callCC $ \k -> tour n 2 k (1,1) b >> fail "No solution!") putStrLn s

## 3 LogicT monad

A very short implementation using the LogicT monad

16 lines of code. 7 imports.

import Control.Monad.Logic import Data.List import Data.Maybe import Data.Ord import Data.Ix import qualified Data.Map as Map import System.Environment successors n b = sortWith (length . succs) . succs where sortWith f = map fst . sortBy (comparing snd) . map (\x -> (x, f x)) succs (i,j) = [ (i', j') | (dx,dy) <- [(1,2),(2,1)] , i' <- [i+dx,i-dx] , j' <- [j+dy, j-dy] , isNothing (Map.lookup (i',j') b) , inRange ((1,1),(n,n)) (i',j') ] tour n k s b | k > n*n = return b | otherwise = do next <- msum . map return $ successors n b s tour n (k+1) next $ Map.insert next k b showBoard n b = unlines . map (\i -> unwords . map (\j -> pad . fromJust $ Map.lookup (i,j) b) $ [1..n]) $ [1..n] where k = ceiling . logBase 10 . fromIntegral $ n*n + 1 pad i = let s = show i in replicate (k-length s) ' ' ++ s main = do (n:_) <- map read `fmap` getArgs let b = observe . tour n 2 (1,1) $ Map.singleton (1,1) 1 putStrLn $ showBoard n b