tools/hashTest.hs
author Wuzzy <Wuzzy2@mail.ru>
Fri, 09 Mar 2018 19:05:59 +0100
changeset 13150 5083fb0a2992
parent 9464 901e363d5837
permissions -rw-r--r--
A Classic Fairytale: Harden all missions against missing campaign variables in team file and assume default values This assumes the worst case in which the team file is missing all campaign variables except Progress. This has been successfully tested with all 10 missions and still generates a logical storyline. By default, the game assumes: - The cyborg's offer in mission 2 was refused - The traitor in mission 5 was killed As a consequence, missions 8 and 10 use the princessScene cut scene.

module Test where

import Control.Monad
import Data.Word
import qualified Data.IntSet as IS

data OP = Sum
        | Mul
        | Sub
    deriving Show


genOps :: Int -> [[OP]]
genOps 1 = [[Sum], [Mul], [Sub]]
genOps n = [a : as | a <- [Sum, Mul, Sub], as <- genOps (n - 1)]


genPos :: Int -> Int -> [[Int]]
genPos m 1 = map (:[]) [-m..m - 1]
genPos m n = [a : as | a <- [-m..m - 1], as <- genPos m (n - 1)]


hash :: [Int] -> [OP] -> [Int] -> Int
hash poss op s = foldl applyOp s' (zip ss op)
    where
        applyOp v (n, Sum) = (v + n) `mod` 256
        applyOp v (n, Mul) = (v * n) `mod` 256
        applyOp v (n, Sub) = (v - n) `mod` 256
        (s' : ss) = map (\p -> if p >= 0 then s !! p else s !! (l + p)) poss
        l = length s


test = do
    a <- liftM lines getContents
    let w = minimum $ map length a
    let opsNum = 4
    let opsList = genOps (opsNum - 1)
    let posList = genPos w opsNum
    let target = length a
    let wordsList = map (map fromEnum) a
    let hashedSize = IS.size . IS.fromList
    print $ length a
    putStrLn . unlines . map show $ filter (\l -> fst l == length a) $ [(hs, (p, o)) | p <- posList, o <- opsList, let hs = hashedSize . map (hash p o) $ wordsList]

didIunderstand' = do
    a <- liftM lines getContents
    print $ length a
    print . IS.size . IS.fromList . map (testHash . map fromEnum) $ a
    where
        testHash s = let l = length s in (
                         (s !! (l - 2) * s !! 1) + s !! (l - 1) - s !! 0
                         ) `mod` 256