Delete Ternary directory
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module Ternary.Statement (Statement(..), st) where
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import Ternary.Term (Vee, Term(..), Item(..))
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data Statement a = A a a -- Affirmo (general affirmative)
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| I a a -- affIrmo (private affirmative)
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| E a a -- nEgo (general negative)
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| O a a -- negO (private negative)
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| A' a a
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| I' a a
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| E' a a
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| O' a a
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deriving (Eq, Show, Read)
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inv :: (Eq a) => Term a -> Term a
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inv (Term p x) = Term (not p) x
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i :: (Eq a) => Bool -> Term a -> Term a -> Vee a
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i v x y
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| x == inv y = error "x and not x under the same Vee, refusing to calculate"
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| x /= y = Term v . Item $ [x, y]
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| x == y = Term v . Item $ [x]
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st :: (Eq a) => Statement a -> Vee a
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st (A x y) = i False (Term True x) (Term False y)
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st (I x y) = i True (Term True x) (Term True y)
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st (E x y) = i False (Term True x) (Term True y)
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st (O x y) = i True (Term True x) (Term False y)
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st (A' x y) = i False (Term False x) (Term False y)
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st (I' x y) = i True (Term False x) (Term True y)
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st (E' x y) = i False (Term False x) (Term True y)
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st (O' x y) = i True (Term False x) (Term False y)
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module Ternary.Term (Term(..), Item(..), Vee) where
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import Data.List (concatMap, null, (++), (\\))
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import Prelude (Applicative, Bool (False, True), Eq, Functor,
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Read, Show, String, fmap, map, pure, show,
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(&&), (/=), (<*>), (==), (||))
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data Term a = Term Bool a deriving (Read)
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newtype Item a = Item [a] deriving (Read)
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type Vee a = Term (Item (Term a))
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instance Functor Item where
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fmap f (Item a) = Item (map f a)
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instance Applicative Item where
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pure x = Item [x]
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(Item fs) <*> (Item xs) = Item [f x | f <- fs, x <- xs]
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instance (Eq a) => Eq (Item a) where
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(Item x) == (Item y) = null dxy && null dyx
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where
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dxy = x \\ y
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dyx = y \\ x
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instance (Eq a) => Eq (Term a) where
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Term v x == Term w y = (v==w) && (x==y)
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Term v x /= Term w y = (v/=w) || (x/=y)
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instance Show (Term String) where
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show (Term False y) = y ++ "`"
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show (Term True y) = y
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instance Show (Term (Item (Term String))) where
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show (Term x i) = show (Term x "V") ++ concatMap show (it i)
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where it (Item ii) = ii
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module Ternary.Universum (Universum(..), universum, aFromStatements) where
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import Data.List (nub)
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import Ternary.Term (Item (..), Term (..), Vee)
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data Universum = Aristotle
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| Empty
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| Default
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universum :: (Eq a) => Universum -> [Vee a] -> [Vee a]
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universum Aristotle facts =
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[Term True (Item [Term x v])
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| v <- aFromStatements facts,
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x <- [False, True]]
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universum Empty _ = []
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universum Default xs = xs
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aFromStatements :: (Eq a) => [Vee a] -> [a]
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aFromStatements = nub . concatMap (extract . getItem . getVee)
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where
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getItem (Item x) = x
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getVee (Term _ i) = i
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extract terms = [v | (Term _ v) <- terms]
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module Ternary.Vee (isObvious, newFact, cleared, think) where
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import Data.List (head, intersect, length, nub, null, union, (\\))
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import Data.Maybe (Maybe (Nothing), mapMaybe)
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import Prelude (Bool (False, True), Eq, any, foldr, fst, map,
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not, notElem, otherwise, return, snd, ($), (&&),
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(.), (/=), (<$>), (<*>), (=<<), (==))
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import Ternary.Term (Item (..), Term (..), Vee)
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isSubsetOf :: (Eq a) => [a] -> [a] -> Bool
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a `isSubsetOf` b = nda && not ndb
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where
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nda = null $ a \\ b
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ndb = null $ b \\ a
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isObvious :: (Eq a) => Vee a -> Vee a -> Bool
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isObvious (Term x (Item a)) (Term y (Item b))
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| x /= y = False
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| x = a `isSubsetOf` b
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| not x = b `isSubsetOf` a
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newFact :: (Eq a) => Vee a -> Vee a -> ([Vee a], Maybe (Vee a))
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newFact a@(Term True _) b@(Term False _) = newFact b a
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newFact (Term False (Item iF)) tT@(Term True (Item iT))
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| length ldF /= 1 = ([], Nothing)
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| otherwise =
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if d'F `notElem` iT
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then (return tT, return (Term True (Item (d'F:iT))))
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else ([], Nothing)
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where
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ldF = iF \\ iT
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d'F = notT . head $ ldF
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notT (Term x v) = Term (not x) v
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newFact (Term False (Item i0)) (Term False (Item i1))
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| length e /= 1 = ([], Nothing)
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| otherwise =
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if null d0 && null d1
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then (map (Term False . Item) [i0, i1], vee0)
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else ([], vee0)
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where
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notT (Term x v) = Term (not x) v
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terms = (i0 `intersect` i1) `union` d0 `union` d1
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e = map notT i0 `intersect` i1
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d0 = (i0 \\ i1) \\ map notT e
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d1 = (i1 \\ i0) \\ e
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vee0 = return (Term False (Item terms))
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newFact _ _ = ([], Nothing)
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pseudofix :: (Eq a) => (a -> a) -> a -> a
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pseudofix f x0
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| y == y' = y
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| otherwise = y'
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where
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y = f x0
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y' = f y
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next :: (Eq a) => ([Vee a], [Vee a]) -> ([Vee a], [Vee a])
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next (o,n) = (o `union` n \\ (fst =<< r), mapMaybe snd r)
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where
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r = newFact <$> o <*> n
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applyFacts :: (Eq a) => [Vee a] -> [Vee a] -> [Vee a]
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applyFacts old new = fst $ pseudofix next (old, new)
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cleared :: (Eq a) => [Vee a] -> [Vee a]
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cleared vees = nub [vee | vee <- vees, not $ any (isObvious vee) vees]
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think :: (Eq a) => ([Vee a]->[Vee a]) -> [Vee a] -> [Vee a]
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think addition = foldr (applyFacts . withUni . return) [] where
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withUni vees = applyFacts (addition vees) vees
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