import Control.Monad
import Data.Maybe
import Data.Array.Base
+import Data.Ix
import Data.List ( partition )
+import qualified Data.Sequence as Seq
+import Data.Monoid
+import Data.Sequence hiding (null, length, index, take, drop, splitAt, reverse)
import Foreign
import System.IO.Unsafe
#include "../includes/ClosureTypes.h"
+aP_CODE, pAP_CODE :: Int
aP_CODE = AP
pAP_CODE = PAP
#undef AP
ptrsList = Array 0 (elems - 1) elems ptrs
nptrs_data = [W# (indexWordArray# nptrs i)
| I# i <- [0.. fromIntegral (BCI.nptrs itbl)] ]
- ASSERT(fromIntegral elems >= 0) return ()
+ ASSERT(elems >= 0) return ()
ptrsList `seq`
return (Closure tipe (Ptr iptr) itbl ptrsList nptrs_data)
case tipe closure of
Constr -> do are_subs_evaluated <- amapM isFullyEvaluated (ptrs closure)
return$ and are_subs_evaluated
- otherwise -> return False
+ _ -> return False
where amapM f = sequence . amap' f
+amap' :: (t -> b) -> Array Int t -> [b]
amap' f (Array i0 i _ arr#) = map g [0 .. i - i0]
where g (I# i#) = case indexArray# arr# i# of
(# e #) -> f e
| (x, rest) <- splitAt ((sizeofType t + wORD_SIZE - 1) `div` wORD_SIZE) xx
= x : go tt rest
+sizeofTyCon :: TyCon -> Int
sizeofTyCon = sizeofPrimRep . tyConPrimRep
-----------------------------------
-- * Traversals for Terms
-----------------------------------
+type TermProcessor a b = Type -> Either String DataCon -> HValue -> [a] -> b
-data TermFold a = TermFold { fTerm :: Type -> Either String DataCon -> HValue -> [a] -> a
+data TermFold a = TermFold { fTerm :: TermProcessor a a
, fPrim :: Type -> [Word] -> a
, fSuspension :: ClosureType -> Maybe Type -> HValue
-> Maybe Name -> a
app_prec = 10
cons_prec = 5 -- TODO Extract this info from GHC itself
+pprTerm :: (Int -> Term -> Maybe SDoc) -> Int -> Term -> SDoc
pprTerm y p t | Just doc <- pprTermM y p t = doc
+pprTerm _ _ _ = panic "pprTerm"
pprTermM :: Monad m => (Int -> Term -> m SDoc) -> Int -> Term -> m SDoc
-pprTermM y p t@Term{dc=Left dc_tag, subTerms=tt, ty=ty} = do
+pprTermM y p Term{dc=Left dc_tag, subTerms=tt} = do
tt_docs <- mapM (y app_prec) tt
return$ cparen (not(null tt) && p >= app_prec) (text dc_tag <+> sep tt_docs)
tt_docs <- mapM (y app_prec) tt
return$ cparen (p >= app_prec) (ppr dc <+> sep tt_docs)
-pprTermM y _ t = pprTermM1 y t
-pprTermM1 _ Prim{value=words, ty=ty} =
+pprTermM _ _ t = pprTermM1 t
+
+pprTermM1 :: Monad m => Term -> m SDoc
+pprTermM1 Prim{value=words, ty=ty} =
return$ text$ repPrim (tyConAppTyCon ty) words
-pprTermM1 y t@Term{} = panic "pprTermM1 - unreachable"
-pprTermM1 _ Suspension{bound_to=Nothing} = return$ char '_'
-pprTermM1 _ Suspension{mb_ty=Just ty, bound_to=Just n}
+pprTermM1 Term{} = panic "pprTermM1 - unreachable"
+pprTermM1 Suspension{bound_to=Nothing} = return$ char '_'
+pprTermM1 Suspension{mb_ty=Just ty, bound_to=Just n}
| Just _ <- splitFunTy_maybe ty = return$ ptext SLIT("<function>")
| otherwise = return$ parens$ ppr n <> text "::" <> ppr ty
+pprTermM1 _ = panic "pprTermM1"
+
+type CustomTermPrinter m = Int -> TermProcessor Term (m (Maybe SDoc))
-- Takes a list of custom printers with a explicit recursion knot and a term,
-- and returns the output of the first succesful printer, or the default printer
-cPprTerm :: forall m. Monad m =>
- ((Int->Term->m SDoc)->[Int->Term->m (Maybe SDoc)]) -> Term -> m SDoc
-cPprTerm custom = go 0 where
- go prec t@Term{} = do
- let default_ prec t = Just `liftM` pprTermM go prec t
- mb_customDocs = [pp prec t | pp <- custom go ++ [default_]]
+cPprTerm :: Monad m =>
+ ((Int->Term->m SDoc)->[CustomTermPrinter m]) -> Term -> m SDoc
+cPprTerm printers_ = go 0 where
+ printers = printers_ go
+ go prec t@(Term ty dc val tt) = do
+ let default_ = Just `liftM` pprTermM go prec t
+ mb_customDocs = [pp prec ty dc val tt | pp <- printers] ++ [default_]
Just doc <- firstJustM mb_customDocs
return$ cparen (prec>app_prec+1) doc
- go _ t = pprTermM1 go t
+ go _ t = pprTermM1 t
firstJustM (mb:mbs) = mb >>= maybe (firstJustM mbs) (return . Just)
firstJustM [] = return Nothing
-- Default set of custom printers. Note that the recursion knot is explicit
-cPprTermBase :: Monad m => (Int->Term-> m SDoc)->[Int->Term->m (Maybe SDoc)]
+cPprTermBase :: Monad m => (Int->Term-> m SDoc)->[CustomTermPrinter m]
cPprTermBase y =
[
- ifTerm isTupleTy (\_ -> liftM (parens . hcat . punctuate comma)
- . mapM (y (-1)) . subTerms)
- , ifTerm (\t -> isTyCon listTyCon t && subTerms t `lengthIs` 2)
- (\ p Term{subTerms=[h,t]} -> doList p h t)
+ ifTerm isTupleTy (\ _ _ tt ->
+ liftM (parens . hcat . punctuate comma)
+ . mapM (y (-1))
+ $ tt)
+ , ifTerm (\ty tt -> isTyCon listTyCon ty tt && tt `lengthIs` 2)
+ (\ p _ [h,t] -> doList p h t)
, ifTerm (isTyCon intTyCon) (coerceShow$ \(a::Int)->a)
, ifTerm (isTyCon charTyCon) (coerceShow$ \(a::Char)->a)
-- , ifTerm (isTyCon wordTyCon) (coerceShow$ \(a::Word)->a)
, ifTerm (isTyCon floatTyCon) (coerceShow$ \(a::Float)->a)
, ifTerm (isTyCon doubleTyCon) (coerceShow$ \(a::Double)->a)
, ifTerm isIntegerTy (coerceShow$ \(a::Integer)->a)
- ]
- where ifTerm pred f p t@Term{} | pred t = liftM Just (f p t)
- ifTerm _ _ _ _ = return Nothing
- isIntegerTy Term{ty=ty} = fromMaybe False $ do
+ ]
+ where ifTerm pred f prec ty _ val tt
+ | pred ty tt = liftM Just (f prec val tt)
+ | otherwise = return Nothing
+ isIntegerTy ty _ = fromMaybe False $ do
(tc,_) <- splitTyConApp_maybe ty
return (tyConName tc == integerTyConName)
- isTupleTy Term{ty=ty} = fromMaybe False $ do
+ isTupleTy ty _ = fromMaybe False $ do
(tc,_) <- splitTyConApp_maybe ty
return (tc `elem` (fst.unzip.elems) boxedTupleArr)
- isTyCon a_tc Term{ty=ty} = fromMaybe False $ do
+ isTyCon a_tc ty _ = fromMaybe False $ do
(tc,_) <- splitTyConApp_maybe ty
return (a_tc == tc)
- coerceShow f _ = return . text . show . f . unsafeCoerce# . val
+ coerceShow f _ val _ = (return . text . show . f . unsafeCoerce#) val
--TODO pprinting of list terms is not lazy
doList p h t = do
let elems = h : getListTerms t
isConsLast = termType(last elems) /= termType h
print_elems <- mapM (y cons_prec) elems
return$ if isConsLast
- then cparen (p >= cons_prec) . hsep . punctuate (space<>colon)
- $ print_elems
+ then cparen (p >= cons_prec)
+ . hsep
+ . punctuate (space<>colon)
+ $ print_elems
else brackets (hcat$ punctuate comma print_elems)
where Just a /= Just b = not (a `coreEqType` b)
_ /= _ = True
getListTerms Term{subTerms=[h,t]} = h : getListTerms t
- getListTerms t@Term{subTerms=[]} = []
+ getListTerms Term{subTerms=[]} = []
getListTerms t@Suspension{} = [t]
getListTerms t = pprPanic "getListTerms" (ppr t)
-- | Returns the instantiated type scheme ty', and the substitution sigma
-- such that sigma(ty') = ty
instScheme :: Type -> TR (TcType, TvSubst)
-instScheme ty | (tvs, rho) <- tcSplitForAllTys ty = liftTcM$ do
- (tvs',theta,ty') <- tcInstType (mapM tcInstTyVar) ty
+instScheme ty | (tvs, _rho) <- tcSplitForAllTys ty = liftTcM$ do
+ (tvs',_theta,ty') <- tcInstType (mapM tcInstTyVar) ty
return (ty', zipTopTvSubst tvs' (mkTyVarTys tvs))
-- Adds a constraint of the form t1 == t2
return$ mapTermType (substTy rev_subst) term
where
go bound _ _ _ | seq bound False = undefined
- go 0 tv ty a = do
+ go 0 tv _ty a = do
clos <- trIO $ getClosureData a
return (Suspension (tipe clos) (Just tv) a Nothing)
go bound tv ty a = do
-- Fast, breadth-first Type reconstruction
-max_depth = 10 :: Int
-cvReconstructType :: HscEnv -> Bool -> Maybe Type -> HValue -> IO (Maybe Type)
-cvReconstructType hsc_env force mb_ty hval = runTR_maybe hsc_env $ do
+cvReconstructType :: HscEnv -> Int -> Maybe Type -> HValue -> IO (Maybe Type)
+cvReconstructType hsc_env max_depth mb_ty hval = runTR_maybe hsc_env $ do
tv <- newVar argTypeKind
case mb_ty of
Nothing -> do search (isMonomorphic `fmap` zonkTcType tv)
- (uncurry go)
- [(tv, hval)]
+ (uncurry go)
+ (Seq.singleton (tv, hval))
max_depth
zonkTcType tv -- TODO untested!
Just ty | isMonomorphic ty -> return ty
- Just ty -> do
- (ty',rev_subst) <- instScheme (sigmaType ty)
+ Just ty -> do
+ (ty',rev_subst) <- instScheme (sigmaType ty)
addConstraint tv ty'
- search (isMonomorphic `fmap` zonkTcType tv)
- (\(ty,a) -> go ty a)
- [(tv, hval)]
+ search (isMonomorphic `fmap` zonkTcType tv)
+ (\(ty,a) -> go ty a)
+ (Seq.singleton (tv, hval))
max_depth
substTy rev_subst `fmap` zonkTcType tv
where
-- search :: m Bool -> ([a] -> [a] -> [a]) -> [a] -> m ()
- search stop expand [] depth = return ()
- search stop expand x 0 = fail$ "Failed to reconstruct a type after " ++
+ search _ _ _ 0 = fail$ "Failed to reconstruct a type after " ++
show max_depth ++ " steps"
- search stop expand (x:xx) d = unlessM stop $ do
- new <- expand x
- search stop expand (xx ++ new) $! (pred d)
+ search stop expand l d =
+ case viewl l of
+ EmptyL -> return ()
+ x :< xx -> unlessM stop $ do
+ new <- expand x
+ search stop expand (xx `mappend` Seq.fromList new) $! (pred d)
-- returns unification tasks,since we are going to want a breadth-first search
go :: Type -> HValue -> TR [(Type, HValue)]
- go tv a = do
+ go tv a = do
clos <- trIO $ getClosureData a
case tipe clos of
Indirection _ -> go tv $! (ptrs clos ! 0)
Right dcname <- dataConInfoPtrToName (infoPtr clos)
(_,mb_dc) <- tryTcErrs (tcLookupDataCon dcname)
case mb_dc of
- Nothing-> do
+ Nothing-> do
-- TODO: Check this case
- vars <- replicateM (length$ elems$ ptrs clos)
- (newVar (liftedTypeKind))
- subTerms <- sequence [ appArr (go tv) (ptrs clos) i
- | (i, tv) <- zip [0..] vars]
forM [0..length (elems $ ptrs clos)] $ \i -> do
- tv <- newVar liftedTypeKind
+ tv <- newVar liftedTypeKind
return$ appArr (\e->(tv,e)) (ptrs clos) i
- Just dc -> do
- let extra_args = length(dataConRepArgTys dc) -
+ Just dc -> do
+ let extra_args = length(dataConRepArgTys dc) -
length(dataConOrigArgTys dc)
subTtypes <- mapMif (not . isMonomorphic)
(\t -> newVar (typeKind t))
(dataConRepArgTys dc)
+
-- It is vital for newtype reconstruction that the unification step
-- is done right here, _before_ the subterms are RTTI reconstructed
let myType = mkFunTys subTtypes tv
return $ [ appArr (\e->(t,e)) (ptrs clos) i
| (i,t) <- drop extra_args $
zip [0..] (filter isPointed subTtypes)]
- otherwise -> return []
+ _ -> return []
-- This helper computes the difference between a base type t and the
-- improved rtti_t computed by RTTI
-- The main difference between RTTI types and their normal counterparts
-- is that the former are _not_ polymorphic, thus polymorphism must
-- be stripped. Syntactically, forall's must be stripped
+computeRTTIsubst :: Type -> Type -> Maybe TvSubst
computeRTTIsubst ty rtti_ty =
-- In addition, we strip newtypes too, since the reconstructed type might
-- not have recovered them all
| Just tv <- getTyVar_maybe lhs
= recoverTc (return (lhs,rhs)) $ do
Indirect ty_v <- readMetaTyVar tv
- (lhs1, rhs1) <- congruenceNewtypes ty_v rhs
+ (_lhs1, rhs1) <- congruenceNewtypes ty_v rhs
return (lhs, rhs1)
-- FunTy inductive case
| Just (l1,l2) <- splitFunTy_maybe lhs
(l1',r1') <- congruenceNewtypes l1 r1
return (mkFunTy l1' l2', mkFunTy r1' r2')
-- TyconApp Inductive case; this is the interesting bit.
- | Just (tycon_l, args_l) <- splitNewTyConApp_maybe lhs
- , Just (tycon_r, args_r) <- splitNewTyConApp_maybe rhs
+ | Just (tycon_l, _) <- splitNewTyConApp_maybe lhs
+ , Just (tycon_r, _) <- splitNewTyConApp_maybe rhs
, tycon_l /= tycon_r
= return (lhs, upgrade tycon_l rhs)
| ty' <- mkTyConApp new_tycon (map mkTyVarTy $ tyConTyVars new_tycon)
, Just subst <- tcUnifyTys (const BindMe) [ty] [repType ty']
= substTy subst ty'
+ upgrade _ _ = panic "congruenceNewtypes.upgrade"
-- assumes that reptype doesn't touch tyconApp args ^^^
-- Semantically different to recoverM in TcRnMonad
-- recoverM retains the errors in the first action,
-- whereas recoverTc here does not
+recoverTc :: TcM a -> TcM a -> TcM a
recoverTc recover thing = do
(_,mb_res) <- tryTcErrs thing
case mb_res of
Nothing -> recover
Just res -> return res
+isMonomorphic :: Type -> Bool
isMonomorphic ty | (tvs, ty') <- splitForAllTys ty
= null tvs && (isEmptyVarSet . tyVarsOfType) ty'
mapMif :: Monad m => (a -> Bool) -> (a -> m a) -> [a] -> m [a]
mapMif pred f xx = sequence $ mapMif_ pred f xx
-mapMif_ pred f [] = []
-mapMif_ pred f (x:xx) = (if pred x then f x else return x) : mapMif_ pred f xx
+ where
+ mapMif_ _ _ [] = []
+ mapMif_ pred f (x:xx) = (if pred x then f x else return x) : mapMif_ pred f xx
+unlessM :: Monad m => m Bool -> m () -> m ()
unlessM condM acc = condM >>= \c -> unless c acc
-- Strict application of f at index i
+appArr :: Ix i => (e -> a) -> Array i e -> Int -> a
appArr f a@(Array _ _ _ ptrs#) i@(I# i#)
= ASSERT (i < length(elems a))
case indexArray# ptrs# i# of
-- Is this defined elsewhere?
-- Generalize the type: find all free tyvars and wrap in the appropiate ForAll.
+sigmaType :: Type -> Type
sigmaType ty = mkForAllTys (varSetElems$ tyVarsOfType (dropForAlls ty)) ty