alpha equivalence

[fp.git] / src / Lambda.hs

{-# OPTIONS_GHC -fno-warn-unused-do-bind #-}
{-# LANGUAGE PatternSynonyms #-}

-- |
-- Module      :  Lambda
-- Copyright   :  Tomáš Musil 2014
-- License     :  BSD-3
--
-- Maintainer  :  tomik.musil@gmail.com
-- Stability   :  experimental
--
-- This is a toy λ-calculus implementation.

module Lambda 
  ( -- * Types
    VarName
  , Term(..)
    -- * Parsing terms
  , parseTerm
  , tRead
    -- * Reduction
  , reduce
  , toNormalForm
  , Strategy(..)
  ) where
  

import Data.Text as T hiding (map)
import Data.Attoparsec.Text
import Control.Applicative
import Control.Monad.State 

-- $setup
-- >>> import Test.QuickCheck
-- >>> import Control.Applicative
-- >>> let aVarName = oneof . map (pure . (:[])) $ ['a'..'e']
-- >>> let aVar = liftA Var aVarName
-- >>> let aComb = oneof . map pure $ [cS, cK, cI, cY]
-- >>> let aTerm 0 = aVar 
-- >>> let aTerm n = oneof [aVar, aComb, liftA2 Lambda aVarName $ aTerm (n - 1), liftA2 App (aTerm (n `div` 2)) (aTerm (n `div` 2))] 
-- >>> instance Arbitrary Term where arbitrary = sized aTerm
--
-- TODO: shrink Terms

cP :: Term
cP = tRead "(λa d c.(λa.e) b (λc.d)) ((λa.(λd.a) (λd c.b ((λa.a) a)) (a ((λa.(λd.e) ((λe.(λd b.a) (λa c.(λa a d.(λd.b (λa d.c) e) (λb b.c a (a d (λb d d e a.d (λb b.d))))) ((λb.a) c)) (d ((λc.(λd.a (λe.e)) (c d)) ((λe.b) a))) c (λa.d (e (λe.(λd c.b) a))) (c (b a)) a (λe.(λa b e b a.d) b)) ((λe.b) (λa.b)) ((λe d.b) b) e) b) ((λc c.a e) (λb.(λb.e) a)))) (λe.e) b (λd c e e c a.c)) a)"

cY :: Term
cY = tRead "λf.(λx.f (x x)) (λx.f (x x))"

cI :: Term
cI = tRead "λx.x"

cK :: Term
cK = tRead "λx y.x"

cS :: Term
cS = tRead "λx y z.x z (y z)"

type VarName = String

-- | 
-- >>> print $ Lambda "x" (Var "x")
-- (λx.x)

data Term = Var VarName | Lambda VarName Term | App Term Term deriving (Eq)

varnames :: [VarName]
varnames = map (:[]) ['a'..'z'] ++ [c : s | s <- varnames, c <- ['a'..'z']]

alphaNorm :: Term -> Term
alphaNorm t = alpha varnames t
  where
    alpha (v:vs) (Lambda x t) = Lambda v . alpha vs $ substitute x (Var v) t
    alpha vs (App u v) = App (alpha vs u) (alpha vs v)
    alpha vs (Var x) = Var x

pattern RedEx x t s = App (Lambda x t) s
pattern AppApp a b c = App a (App b c)
pattern EmLambda x y t = Lambda x (Lambda y t)


instance Show Term where
  show (Var x) = x
  show (EmLambda x y t) = show (Lambda (x ++ " " ++ y) t)
  show (Lambda x t) = "(λ" ++ x ++ "." ++ show t ++ ")"
  show (AppApp a b c) = show a ++ " " ++ braced (App b c)
  show (App t r) = show t ++ " " ++ show r

braced :: Term -> String
braced t = "(" ++ show t ++ ")"

-- |
-- prop> t == tRead (show (t :: Term))

tRead :: String -> Term
tRead s = case parseOnly (parseTerm <* endOfInput) (T.pack s) of
    (Right t) -> t
    (Left e) -> error e

parseVar :: Parser Term
parseVar = do
  x <- many1 (letter <|> digit)
  return $! Var x

parseLambda :: Parser Term
parseLambda = do
  char '\\' <|> char 'λ'
  vars <- sepBy1 parseVar (char ' ')
  char '.'
  t <- parseTerm
  return $! createLambda vars t

createLambda :: [Term] -> Term -> Term
createLambda (Var x : vs) t = Lambda x $ createLambda vs t
createLambda [] t = t
createLambda _ _ = error "createLambda failed"

parseApp :: Parser Term
parseApp = do
  aps <- sepBy1 (parseBraces <|> parseLambda <|> parseVar) (char ' ')
  return $! createApp aps

createApp :: [Term] -> Term
createApp [t] = t
createApp (t:ts:tss) = createApp (App t ts : tss)
createApp [] = error "empty createApp"

parseBraces :: Parser Term
parseBraces = do
  char '('
  t <- parseTerm
  char ')'
  return t 

parseTerm :: Parser Term
parseTerm = parseApp <|>
            parseBraces <|>
            parseLambda <|>
            parseVar

-------------------------------------------------

isFreeIn :: VarName -> Term -> Bool
isFreeIn x (Var v) = x == v
isFreeIn x (App t u) = x `isFreeIn` t || x `isFreeIn` u
isFreeIn x (Lambda v t) = x /= v && x `isFreeIn` t

rename :: Term -> Term
rename (Lambda x t) = Lambda n (substitute x (Var n) t)
  where n = rnm x 
        rnm v = if (v ++ "r") `isFreeIn` t then rnm (v ++ "r") else v ++ "r"
rename _ = error "TODO vymyslet reprezentaci, kde pujde udelat fce, ktera bere jen Lambdy"

substitute :: VarName -> Term -> Term -> Term
substitute a b (Var x) = if x == a then b else Var x
substitute a b (Lambda x t) 
  | x == a = Lambda x t
  | x `isFreeIn` b = substitute a b $ rename (Lambda x t)
  | otherwise = Lambda x (substitute a b t)
substitute a b (App t u) = App (substitute a b t) (substitute a b u)

-- | Reduce λ-term
--
-- >>> reduce $ tRead "(\\x.x x) (g f)"
-- g f (g f)

reduce :: Term -> Term
reduce (Var x) = Var x
reduce (Lambda x t) = Lambda x (reduce t)
reduce (App t u) = app (reduce t) u
  where app (Lambda x v) w = reduce $ substitute x w v
        app a b = App a (reduce b)

data Strategy = Eager | Lazy

reduceStep :: (Monad m) => Term -> m Term
reduceStep (RedEx x s t) = return $ substitute x t s
reduceStep t = return $ t

data Z = R Term Z | L Z Term | ZL VarName Z | E
data D = Up | Down
type TermZipper = (Term, Z, D)

move :: TermZipper -> TermZipper
move (App l r, c, Down) = (l, L c r, Down)
move (Lambda x t, c, Down) = (t, ZL x c, Down)
move (Var x, c, Down) = (Var x, c, Up)
move (t, L c r, Up) = (r, R t c, Down)
move (t, R l c, Up) = (App l t, c, Up)
move (t, ZL x c, Up) = (Lambda x t, c, Up)
move (t, E, Up) = (t, E, Up)

unmove :: TermZipper -> TermZipper
unmove (t, L c r, Down) = (App t r, c, Down)
unmove x = x

travPost :: (Monad m) => (Term -> m Term) -> Term -> m Term
travPost fnc term = tr fnc (term, E, Down)
  where 
    tr f (t@(RedEx _ _ _), c, Up) = do
      nt <- f t
      tr f $ (nt, c, Down)
    tr _ (t, E, Up) = return t
    tr f (t, c, Up) = tr f $ move (t, c, Up)
    tr f (t, c, Down) = tr f $ move (t, c, Down)

travPre :: (Monad m) => (Term -> m Term) -> Term -> m Term
travPre fnc term = tr fnc (term, E, Down)
  where 
    tr f (t@(RedEx _ _ _), c, Down) = do
      nt <- f t
      tr f $ unmove (nt, c, Down)
    tr _ (t, E, Up) = return t
    tr f (t, c, Up) = tr f $ move (t, c, Up)
    tr f (t, c, Down) = tr f $ move (t, c, Down)

printT :: Term -> IO Term
printT t = do
  print t
  return t

-- |
--
-- >>> toNormalForm Eager 100 cI
-- Just (λx.x)
--
-- >>> toNormalForm Eager 100 $ App cI cI
-- Just (λx.x)
--
-- >>> toNormalForm Eager 100 $ (App (App cK cI) cY)
-- Nothing
--
-- >>> toNormalForm Lazy 100 $ (App (App cK cI) cY)
-- Just (λx.x)
--
-- prop> (\ t u -> t == u || t == Nothing || u == Nothing) (alphaNorm <$> toNormalForm Lazy 1000 x) (alphaNorm <$> toNormalForm Eager 1000 x)


toNormalForm :: Strategy -> Int -> Term -> Maybe Term
toNormalForm Eager n = flip evalStateT 0 . travPost (cnt >=> short n >=> reduceStep)
toNormalForm Lazy  n = flip evalStateT 0 . travPre  (cnt >=> short n >=> reduceStep)

cnt :: (Monad m) => Term -> StateT Int m Term
cnt t@(RedEx _ _ _) = do
  modify (+ 1)
  return t
cnt t = return t

short :: Int -> Term -> StateT Int Maybe Term
short maxN t = do
  n <- get
  if n > maxN
    then lift Nothing
    else return t