Hacked NL* together.

Not complete yet, but it already works for the prototypical NFA: all words with duplicate atoms.
2025-04-27 22:57:45 +02:00 · 2016-06-20 16:40:08 +02:00 · 2016-06-20 16:40:08 +02:00 · 24e2c1ff88
commit 24e2c1ff88
parent 2e901070d9
5 changed files with 219 additions and 12 deletions
--- a/src/Examples.hs
+++ b/src/Examples.hs
@ -1,11 +1,13 @@
 module Examples
    ( module Examples
    , module Examples.Contrived
    , module Examples.ContrivedNFAs
    , module Examples.Fifo
    , module Examples.Stack
    ) where
 import           Examples.Contrived
 import           Examples.ContrivedNFAs
 import           Examples.Fifo
 import           Examples.Stack
 import           NLambda            (Atom)
--- a/src/Examples/ContrivedNFAs.hs
+++ b/src/Examples/ContrivedNFAs.hs
@ -0,0 +1,34 @@
 {-# LANGUAGE DeriveGeneric #-}
 module Examples.ContrivedNFAs where
 import           NLambda
 -- Explicit Prelude, as NLambda has quite some clashes
 import           Prelude      (Eq, Ord, Show, ($))
 import qualified Prelude      ()
 import           GHC.Generics (Generic)
 -- Language = u a v a w for any words u,v,w and atom a
 -- The complement of 'all distinct atoms'
 data NFA1 = Initial1 | Guessed1 Atom | Final1
  deriving (Show, Eq, Ord, Generic)
 instance BareNominalType NFA1
 exampleNFA1 :: Automaton NFA1 Atom
 exampleNFA1 = automaton
    -- states, 4 orbits (of which one unreachable)
    (singleton Initial1
        `union` map Guessed1 atoms
        `union` singleton Final1)
    -- alphabet
    atoms
    -- transitions
    (map (\a -> (Initial1, a, Guessed1 a)) atoms
        `union` map (\a -> (Initial1, a, Initial1)) atoms
        `union` map (\a -> (Guessed1 a, a, Final1)) atoms
        `union` pairsWith (\a b -> (Guessed1 a, b, Guessed1 a)) atoms atoms
        `union` map (\a -> (Final1, a, Final1)) atoms)
    -- initial states
    (singleton Initial1)
    -- final states
    (singleton Final1)
--- a/src/Main.hs
+++ b/src/Main.hs
@ -7,6 +7,8 @@ import           Functions
 import           ObservationTable
 import           Teacher
 import NLStar
 import           NLambda
 import           Data.List        (inits, tails)
@ -50,18 +52,6 @@ inconsistencyBartek State{..} =
 inconsistency :: NominalType i => State i -> Set (([i], [i], i), Set [i])
 inconsistency = inconsistencyBartek
 -- This can be written for all monads. Unfortunately (a,) is also a monad and
 -- this gives rise to overlapping instances, so I only do it for IO here.
 -- Note that it is not really well defined, but it kinda works.
 instance (Conditional a) => Conditional (IO a) where
    cond f a b = case solve f of
        Just True -> a
        Just False -> b
        Nothing -> fail "### Unresolved branch ###"
        -- NOTE: another implementation would be to evaluate both a and b
        -- and apply ite to their results. This however would runs both side
        -- effects of a and b.
 -- This function will (recursively) make the table complete and consistent.
 -- This is in the IO monad purely because I want some debugging information.
 -- (Same holds for many other functions here)
--- a/src/NLStar.hs
+++ b/src/NLStar.hs
@ -0,0 +1,170 @@
 {-# LANGUAGE RecordWildCards #-}
 module NLStar where
 import           Examples
 import           Functions
 import           ObservationTable
 import           Teacher
 import           NLambda
 import           Data.List        (inits, tails)
 import           Prelude          hiding (and, curry, filter, lookup, map, not,
                                   sum)
 -- So at the moment we only allow sums of the form a + b
 -- Of course we should approximate the powerset a bit better
 -- But for the main example, we know this is enough!
 -- I (Joshua) believe it is possible to give a finite-orbit
 -- approximation, but the code will not be efficient ;-).
 hackApproximate :: NominalType a => Set a -> Set (Set a)
 hackApproximate set = empty `union` map singleton set `union` pairsWith (\x y -> singleton x `union` singleton y) set set
 rowUnion :: NominalType i => Set (BRow i) -> BRow i
 rowUnion set = Prelude.uncurry union . setTrueFalse . partition (\(_, f) -> f) $ map (\is -> (is, exists fromBool (mapFilter (\(is2, b) -> maybeIf (is `eq` is2) b) flatSet))) allIs
    where
        flatSet = sum set
        allIs = map fst flatSet
        setTrueFalse (trueSet, falseSet) = (map (setSecond True) trueSet, map (setSecond False) falseSet)
        setSecond a (x, _) = (x, a)
 -- lifted row functions
 rowP t = rowUnion . map (row t)
 rowPa t set a = rowUnion . map (\s -> rowa t s a) $ set
 -- We can determine its completeness with the following
 -- It returns all witnesses (of the form sa) for incompleteness
 incompletenessNonDet :: NominalType i => State i -> Set [i]
 incompletenessNonDet State{..} = filter (not . hasEqRow) ssa
    where
        sss = map (rowP t) . hackApproximate $ ss
        -- true if the sequence sa has an equivalent row in ss
        hasEqRow = contains sss . row t
 inconsistencyNonDet :: NominalType i => State i -> Set ((Set [i], Set [i], i), Set [i])
 inconsistencyNonDet State{..} =
    pairsWithFilter (
        \(s1, s2) a -> maybeIf (candidate1 s1 s2 a) ((s1, s2, a), discrepancy (rowPa t s1 a) (rowPa t s2 a))
    ) rowPairs aa
    where
        rowPairs = pairsWithFilter (\s1 s2 -> maybeIf (candidate0 s1 s2) (s1,s2)) (hackApproximate ss) (hackApproximate ss)
        candidate0 s1 s2 = s1 `neq` s2 /\ rowP t s1 `eq` rowP t s2
        candidate1 s1 s2 a = rowPa t s1 a `neq` rowPa t s2 a
 -- This can be written for all monads. Unfortunately (a,) is also a monad and
 -- this gives rise to overlapping instances, so I only do it for IO here.
 -- Note that it is not really well defined, but it kinda works.
 instance (Conditional a) => Conditional (IO a) where
    cond f a b = case solve f of
        Just True -> a
        Just False -> b
        Nothing -> fail "### Unresolved branch ###"
        -- NOTE: another implementation would be to evaluate both a and b
        -- and apply ite to their results. This however would runs both side
        -- effects of a and b.
 -- This function will (recursively) make the table complete and consistent.
 -- This is in the IO monad purely because I want some debugging information.
 -- (Same holds for many other functions here)
 makeCompleteConsistentNonDet :: (Show i, Contextual i, NominalType i, Teacher t i) => t -> State i -> IO (State i)
 makeCompleteConsistentNonDet teacher state@State{..} = do
    -- inc is the set of rows witnessing incompleteness, that is the sequences
    -- 's1 a' which do not have their equivalents of the form 's2'.
    putStrLn "New round"
    let inc = incompletenessNonDet state
    ite (isNotEmpty inc)
        (do
            -- If that set is non-empty, we should add new rows
            putStrLn "Incomplete!"
            -- These will be the new rows, ...
            let ds = inc
            putStr " -> Adding rows: "
            print ds
            let state2 = addRows teacher ds state
            makeCompleteConsistentNonDet teacher state2
        )
        (do
            -- inc2 is the set of inconsistencies.
            let inc2 = inconsistencyNonDet state
            ite (isNotEmpty inc2)
                (do
                    -- If that set is non-empty, we should add new columns
                    putStr "Inconsistent! : "
                    print inc2
                    -- The extensions are in the second component
                    let de = sum $ map (\((s1,s2,a),es) -> map (a:) es) inc2
                    putStr " -> Adding columns: "
                    print de
                    let state2 = addColumns teacher de state
                    makeCompleteConsistentNonDet teacher state2
                )
                (do
                    -- If both sets are empty, the table is complete and
                    -- consistent, so we are done.
                    putStrLn " => Complete + Consistent :D!"
                    return state
                )
        )
 boolImplies :: Bool -> Bool -> Bool
 boolImplies True False = False
 boolImplies _ _ = True
 sublang :: NominalType i => BRow i -> BRow i -> Formula
 sublang r1 r2 = forAll fromBool $ pairsWithFilter (\(i1, f1) (i2, f2) -> maybeIf (i1 `eq` i2) (f1 `boolImplies` f2)) r1 r2
 -- Given a C&C table, constructs an automaton. The states are given by 2^E (not
 -- necessarily equivariant functions)
 constructHypothesisNonDet :: NominalType i => State i -> Automaton (BRow i) i
 constructHypothesisNonDet State{..} = automaton q a d i f
    where
        q = map (row t) ss
        a = aa
        d = triplesWithFilter (\s a s2 -> maybeIf (sublang (row t s2) (rowa t s a)) (row t s, a, row t s2)) ss aa ss
        i = singleton $ row t []
        f = mapFilter (\s -> maybeIf (toform $ apply t (s, [])) (row t s)) ss
        toform s = forAll id . map fromBool $ s
 -- I am not quite sure whether this variant is due to Rivest & Schapire or Maler & Pnueli.
 useCounterExampleNonDet :: (Show i, Contextual i, NominalType i, Teacher t i) => t -> State i -> Set [i] -> IO (State i)
 useCounterExampleNonDet teacher state@State{..} ces = do
    putStr "Using ce: "
    print ces
    let de = sum . map (fromList . tails) $ ces
    putStr " -> Adding columns: "
    print de
    let state2 = addColumns teacher de state
    return state2
 -- The main loop, which results in an automaton. Will stop if the hypothesis
 -- exactly accepts the language we are learning.
 loopNonDet :: (Show i, Contextual i, NominalType i, Teacher t i) => t -> State i -> IO (Automaton (BRow i) i)
 loopNonDet teacher s = do
    putStrLn "##################"
    putStrLn "1. Making it complete and consistent"
    s <- makeCompleteConsistentNonDet teacher s
    putStrLn "2. Constructing hypothesis"
    let h = constructHypothesisNonDet s
    print h
    putStr "3. Equivalent? "
    let eq = equivalent teacher h
    print eq
    case eq of
        Nothing -> return h
        Just ce -> do
            s <- useCounterExampleNonDet teacher s ce
            loopNonDet teacher s
 constructEmptyStateNonDet :: (Contextual i, NominalType i, Teacher t i) => t -> State i
 constructEmptyStateNonDet teacher =
    let aa = Teacher.alphabet teacher in
    let ss = singleton [] in
    let ssa = pairsWith (\s a -> s ++ [a]) ss aa in
    let ee = singleton [] in
    let t = fillTable teacher (ss `union` ssa) ee in
    State{..}
 learnNonDet :: (Show i, Contextual i, NominalType i, Teacher t i) => t -> IO (Automaton (BRow i) i)
 learnNonDet teacher = do
    let s = constructEmptyStateNonDet teacher
    loopNonDet teacher s
--- a/src/Teacher.hs
+++ b/src/Teacher.hs
@ -85,6 +85,7 @@ bisim aut1 aut2 = runIdentity $ go empty (pairsWith addEmptyWord (initialStates
        getRevWord (w, _, _) = reverse w
        addEmptyWord x y = ([], x, y)
 -- Will ask everything to someone reading the terminal
 data TeacherWithIO = TeacherWithIO
@ -163,3 +164,13 @@ interpret support (AND f1 f2) = interpret support f1 /\ interpret support f2
 interpret support (OR f1 f2) = interpret support f1 \/ interpret support f2
 interpret _ T = true
 interpret _ F = false
 -- A teacher uses a target for the mebership queries, but you for equivalence
 -- Useful as long as you don't have an equivalence check, For example for G-NFAs
 data TeacherWithTargetAndIO i = forall q . NominalType q => TeacherWithTargetAndIO (Automaton q i)
 instance Teacher (TeacherWithTargetAndIO Atom) Atom where
    membership (TeacherWithTargetAndIO aut) input = membership (TeacherWithTarget aut) input
    equivalent (TeacherWithTargetAndIO aut) aut2  = equivalent TeacherWithIO aut2
    alphabet (TeacherWithTargetAndIO aut)         = NLambda.alphabet aut