module Idris.Core.CaseTree (
CaseDef(..), SC, SC'(..), CaseAlt, CaseAlt'(..), ErasureInfo
, Phase(..), CaseTree, CaseType(..)
, simpleCase, small, namesUsed, findCalls, findCalls', findUsedArgs
, substSC, substAlt, mkForce
) where
import Idris.Core.TT
import Control.Monad.Reader
import Control.Monad.State
import Data.List hiding (partition)
import qualified Data.List (partition)
import qualified Data.Set as S
import GHC.Generics (Generic)
data CaseDef = CaseDef [Name] !SC [Term]
deriving Show
data SC' t = Case CaseType Name [CaseAlt' t]
| ProjCase t [CaseAlt' t]
| STerm !t
| UnmatchedCase String
| ImpossibleCase
deriving (Eq, Ord, Functor, Generic)
data CaseType = Updatable | Shared
deriving (Eq, Ord, Show, Generic)
type SC = SC' Term
data CaseAlt' t = ConCase Name Int [Name] !(SC' t)
| FnCase Name [Name] !(SC' t)
| ConstCase Const !(SC' t)
| SucCase Name !(SC' t)
| DefaultCase !(SC' t)
deriving (Show, Eq, Ord, Functor, Generic)
type CaseAlt = CaseAlt' Term
instance Show t => Show (SC' t) where
show sc = show' 1 sc
where
show' i (Case up n alts) = "case" ++ u ++ show n ++ " of\n" ++ indent i ++
showSep ("\n" ++ indent i) (map (showA i) alts)
where u = case up of
Updatable -> "! "
Shared -> " "
show' i (ProjCase tm alts) = "case " ++ show tm ++ " of " ++
showSep ("\n" ++ indent i) (map (showA i) alts)
show' i (STerm tm) = show tm
show' i (UnmatchedCase str) = "error " ++ show str
show' i ImpossibleCase = "impossible"
indent i = concat $ take i (repeat " ")
showA i (ConCase n t args sc)
= show n ++ "(" ++ showSep (", ") (map show args) ++ ") => "
++ show' (i+1) sc
showA i (FnCase n args sc)
= "FN " ++ show n ++ "(" ++ showSep (", ") (map show args) ++ ") => "
++ show' (i+1) sc
showA i (ConstCase t sc)
= show t ++ " => " ++ show' (i+1) sc
showA i (SucCase n sc)
= show n ++ "+1 => " ++ show' (i+1) sc
showA i (DefaultCase sc)
= "_ => " ++ show' (i+1) sc
type CaseTree = SC
type Clause = ([Pat], (Term, Term))
type CS = ([Term], Int, [(Name, Type)])
instance TermSize SC where
termsize n (Case _ n' as) = termsize n as
termsize n (ProjCase n' as) = termsize n as
termsize n (STerm t) = termsize n t
termsize n _ = 1
instance TermSize CaseAlt where
termsize n (ConCase _ _ _ s) = termsize n s
termsize n (FnCase _ _ s) = termsize n s
termsize n (ConstCase _ s) = termsize n s
termsize n (SucCase _ s) = termsize n s
termsize n (DefaultCase s) = termsize n s
small :: Name -> [Name] -> SC -> Bool
small n args t = let as = findAllUsedArgs t args in
length as == length (nub as) &&
termsize n t < 20
namesUsed :: SC -> [Name]
namesUsed sc = nub $ nu' [] sc where
nu' ps (Case _ n alts) = nub (concatMap (nua ps) alts) \\ [n]
nu' ps (ProjCase t alts) = nub $ nut ps t ++ concatMap (nua ps) alts
nu' ps (STerm t) = nub $ nut ps t
nu' ps _ = []
nua ps (ConCase n i args sc) = nub (nu' (ps ++ args) sc) \\ args
nua ps (FnCase n args sc) = nub (nu' (ps ++ args) sc) \\ args
nua ps (ConstCase _ sc) = nu' ps sc
nua ps (SucCase _ sc) = nu' ps sc
nua ps (DefaultCase sc) = nu' ps sc
nut ps (P _ n _) | n `elem` ps = []
| otherwise = [n]
nut ps (App _ f a) = nut ps f ++ nut ps a
nut ps (Proj t _) = nut ps t
nut ps (Bind n (Let _ t v) sc) = nut ps v ++ nut (n:ps) sc
nut ps (Bind n b sc) = nut (n:ps) sc
nut ps _ = []
findCalls :: SC -> [Name] -> [(Name, [[Name]])]
findCalls = findCalls' False
findCalls' :: Bool -> SC -> [Name] -> [(Name, [[Name]])]
findCalls' ignoreasserts sc topargs = S.toList $ nu' topargs sc where
nu' ps (Case _ n alts) = S.unions $ map (nua (n : ps)) alts
nu' ps (ProjCase t alts) = S.unions $ nut ps t : map (nua ps) alts
nu' ps (STerm t) = nut ps t
nu' ps _ = S.empty
nua ps (ConCase n i args sc) = nu' (ps ++ args) sc
nua ps (FnCase n args sc) = nu' (ps ++ args) sc
nua ps (ConstCase _ sc) = nu' ps sc
nua ps (SucCase _ sc) = nu' ps sc
nua ps (DefaultCase sc) = nu' ps sc
nut ps (P _ n _) | n `elem` ps = S.empty
| otherwise = S.singleton (n, [])
nut ps fn@(App _ f a)
| (P _ n _, args) <- unApply fn
= if ignoreasserts && n == sUN "assert_total"
then S.empty
else if n `elem` ps
then S.union (nut ps f) (nut ps a)
else S.insert (n, map argNames args)
(S.unions $ map (nut ps) args)
| (P (TCon _ _) n _, _) <- unApply fn = S.empty
| otherwise = S.union (nut ps f) (nut ps a)
nut ps (Bind n (Let _ t v) sc) = S.union (nut ps v) (nut (n:ps) sc)
nut ps (Proj t _) = nut ps t
nut ps (Bind n b sc) = nut (n:ps) sc
nut ps _ = S.empty
argNames tm = let ns = directUse tm in
filter (\x -> x `elem` ns) topargs
directUse :: TT Name -> [Name]
directUse (P _ n _) = [n]
directUse (Bind n (Let _ t v) sc) = nub $ directUse v ++ (directUse sc \\ [n])
++ directUse t
directUse (Bind n b sc) = nub $ directUse (binderTy b) ++ (directUse sc \\ [n])
directUse fn@(App _ f a)
| (P Ref (UN pfk) _, [App _ e w]) <- unApply fn,
pfk == txt "prim_fork"
= directUse e ++ directUse w
| (P Ref (UN fce) _, [_, _, a]) <- unApply fn,
fce == txt "Force"
= directUse a
| (P Ref n _, args) <- unApply fn = []
| (P (TCon _ _) n _, args) <- unApply fn = []
| otherwise = nub $ directUse f ++ directUse a
directUse (Proj x i) = nub $ directUse x
directUse _ = []
findUsedArgs :: SC -> [Name] -> [Name]
findUsedArgs sc topargs = nub (findAllUsedArgs sc topargs)
findAllUsedArgs sc topargs = filter (\x -> x `elem` topargs) (nu' sc) where
nu' (Case _ n alts) = n : concatMap nua alts
nu' (ProjCase t alts) = directUse t ++ concatMap nua alts
nu' (STerm t) = directUse t
nu' _ = []
nua (ConCase n i args sc) = nu' sc
nua (FnCase n args sc) = nu' sc
nua (ConstCase _ sc) = nu' sc
nua (SucCase _ sc) = nu' sc
nua (DefaultCase sc) = nu' sc
isUsed :: SC -> Name -> Bool
isUsed sc n = used sc where
used (Case _ n' alts) = n == n' || any usedA alts
used (ProjCase t alts) = n `elem` freeNames t || any usedA alts
used (STerm t) = n `elem` freeNames t
used _ = False
usedA (ConCase _ _ args sc) = used sc
usedA (FnCase _ args sc) = used sc
usedA (ConstCase _ sc) = used sc
usedA (SucCase _ sc) = used sc
usedA (DefaultCase sc) = used sc
type ErasureInfo = Name -> [Int]
type CaseBuilder a = ReaderT ErasureInfo (State CS) a
runCaseBuilder :: ErasureInfo -> CaseBuilder a -> (CS -> (a, CS))
runCaseBuilder ei bld = runState $ runReaderT bld ei
data Phase = CoverageCheck [Int]
| CompileTime
| RunTime
deriving (Show, Eq)
simpleCase :: Bool -> SC -> Bool ->
Phase -> FC ->
[Int] ->
[(Type, Bool)] ->
[([Name], Term, Term)] ->
ErasureInfo ->
TC CaseDef
simpleCase tc defcase reflect phase fc inacc argtys cs erInfo
= sc' tc defcase phase fc (filter (\(_, _, r) ->
case r of
Impossible -> False
_ -> True) cs)
where
sc' tc defcase phase fc []
= return $ CaseDef [] (UnmatchedCase (show fc ++ ":No pattern clauses")) []
sc' tc defcase phase fc cs
= let proj = phase == RunTime
pats = map (\ (avs, l, r) ->
(avs, toPats reflect tc l, (l, r))) cs
chkPats = mapM chkAccessible pats in
case chkPats of
OK pats ->
let numargs = length (fst (head pats))
ns = take numargs args
(ns', ps') = order phase [(n, i `elem` inacc) | (i,n) <- zip [0..] ns] pats (map snd argtys)
(tree, st) = runCaseBuilder erInfo
(match ns' ps' defcase)
([], numargs, [])
sc = removeUnreachable (prune proj (depatt ns' tree))
t = CaseDef ns sc (fstT st) in
if proj then return (stripLambdas t)
else return t
Error err -> Error (At fc err)
where args = map (\i -> sMN i "e") [0..]
fstT (x, _, _) = x
chkAccessible (avs, l, c)
| phase /= CompileTime || reflect = return (l, c)
| otherwise = do mapM_ (acc l) avs
return (l, c)
acc [] n = Error (Inaccessible n)
acc (PV x t : xs) n | x == n = OK ()
acc (PCon _ _ _ ps : xs) n = acc (ps ++ xs) n
acc (PSuc p : xs) n = acc (p : xs) n
acc (_ : xs) n = acc xs n
data Pat = PCon Bool Name Int [Pat]
| PConst Const
| PInferred Pat
| PV Name Type
| PSuc Pat
| PReflected Name [Pat]
| PAny
| PTyPat
deriving Show
toPats :: Bool -> Bool -> Term -> [Pat]
toPats reflect tc f = reverse (toPat reflect tc (getArgs f)) where
getArgs (App _ f a) = a : getArgs f
getArgs _ = []
toPat :: Bool -> Bool -> [Term] -> [Pat]
toPat reflect tc = map $ toPat' []
where
toPat' [_,_,arg] (P (DCon t a uniq) nm@(UN n) _)
| n == txt "Delay"
= PCon uniq nm t [PAny, PAny, toPat' [] arg]
toPat' args (P (DCon t a uniq) nm@(NS (UN n) [own]) _)
| n == txt "Read" && own == txt "Ownership"
= PCon False nm t (map shareCons (map (toPat' []) args))
where shareCons (PCon _ n i ps) = PCon False n i (map shareCons ps)
shareCons p = p
toPat' args (P (DCon t a uniq) n _)
= PCon uniq n t $ map (toPat' []) args
toPat' [p, Constant (BI 1)] (P _ (UN pabi) _)
| pabi == txt "prim__addBigInt"
= PSuc $ toPat' [] p
toPat' [] (P Bound n ty) = PV n ty
toPat' args (App _ f a) = toPat' (a : args) f
toPat' args (Inferred tm) = PInferred (toPat' args tm)
toPat' [] (Constant x) | isTypeConst x = PTyPat
| otherwise = PConst x
toPat' [] (Bind n (Pi _ _ t _) sc)
| reflect && noOccurrence n sc
= PReflected (sUN "->") [toPat' [] t, toPat' [] sc]
toPat' args (P _ n _)
| reflect
= PReflected n $ map (toPat' []) args
toPat' _ t = PAny
data Partition = Cons [Clause]
| Vars [Clause]
deriving Show
isVarPat (PV _ _ : ps , _) = True
isVarPat (PAny : ps , _) = True
isVarPat (PTyPat : ps , _) = True
isVarPat _ = False
isConPat (PCon _ _ _ _ : ps, _) = True
isConPat (PReflected _ _ : ps, _) = True
isConPat (PSuc _ : ps, _) = True
isConPat (PConst _ : ps, _) = True
isConPat _ = False
partition :: [Clause] -> [Partition]
partition [] = []
partition ms@(m : _)
| isVarPat m = let (vars, rest) = span isVarPat ms in
Vars vars : partition rest
| isConPat m = let (cons, rest) = span isConPat ms in
Cons cons : partition rest
partition xs = error $ "Partition " ++ show xs
order :: Phase -> [(Name, Bool)] -> [Clause] -> [Bool] -> ([Name], [Clause])
order _ [] cs cans = ([], cs)
order _ ns' [] cans = (map fst ns', [])
order (CoverageCheck pos) ns' cs cans
= let ns_out = pick 0 [] (map fst ns')
cs_out = map pickClause cs in
(ns_out, cs_out)
where
pickClause (pats, def) = (pick 0 [] pats, def)
pick i skipped [] = reverse skipped
pick i skipped (x : xs)
| i `elem` pos = x : pick (i + 1) skipped xs
| otherwise = pick (i + 1) (x : skipped) xs
order phase ns' cs cans
= let patnames = transpose (map (zip ns') (map (zip cans) (map fst cs)))
(patnames_ord, patnames_rest)
= Data.List.partition (noClash . map snd) patnames
patnames_ord' = case phase of
CompileTime -> patnames_ord
RunTime -> reverse patnames_ord
pats' = transpose (sortBy moreDistinct patnames_ord'
++ patnames_rest) in
(getNOrder pats', zipWith rebuild pats' cs)
where
getNOrder [] = error $ "Failed order on " ++ show (map fst ns', cs)
getNOrder (c : _) = map (fst . fst) c
rebuild patnames clause = (map (snd . snd) patnames, snd clause)
noClash [] = True
noClash ((can, p) : ps) = can && not (any (clashPat p) (map snd ps))
&& noClash ps
clashPat (PCon _ _ _ _) (PConst _) = True
clashPat (PConst _) (PCon _ _ _ _) = True
clashPat (PCon _ _ _ _) (PSuc _) = True
clashPat (PSuc _) (PCon _ _ _ _) = True
clashPat (PCon _ n i _) (PCon _ n' i' _) | i == i' = n /= n'
clashPat _ _ = False
moreDistinct xs ys
= compare (snd . fst . head $ xs, numNames [] (map snd ys))
(snd . fst . head $ ys, numNames [] (map snd xs))
numNames xs ((_, PCon _ n _ _) : ps)
| not (Left n `elem` xs) = numNames (Left n : xs) ps
numNames xs ((_, PConst c) : ps)
| not (Right c `elem` xs) = numNames (Right c : xs) ps
numNames xs (_ : ps) = numNames xs ps
numNames xs [] = length xs
orderByInf :: [Name] -> [Clause] -> ([Name], [Clause])
orderByInf vs cs = let alwaysInf = getInf cs in
(selectInf alwaysInf vs,
map deInf (map (selectExp alwaysInf) cs))
where
getInf [] = []
getInf [(pats, def)] = infPos 0 pats
getInf ((pats, def) : cs) = infPos 0 pats `intersect` getInf cs
selectExp :: [Int] -> Clause -> Clause
selectExp infs (pats, def)
= let (notInf, inf) = splitPats 0 infs [] [] pats in
(notInf ++ inf, def)
selectInf :: [Int] -> [a] -> [a]
selectInf infs ns = let (notInf, inf) = splitPats 0 infs [] [] ns in
notInf ++ inf
splitPats i infpos notInf inf [] = (reverse notInf, reverse inf)
splitPats i infpos notInf inf (p : ps)
| i `elem` infpos = splitPats (i + 1) infpos notInf (p : inf) ps
| otherwise = splitPats (i + 1) infpos (p : notInf) inf ps
infPos i [] = []
infPos i (PInferred p : ps) = i : infPos (i + 1) ps
infPos i (_ : ps) = infPos (i + 1) ps
deInf (pats, def) = (map deInfPat pats, def)
deInfPat (PInferred p) = p
deInfPat p = p
match :: [Name] -> [Clause] -> SC
-> CaseBuilder SC
match [] (([], ret) : xs) err
= do (ts, v, ntys) <- get
put (ts ++ (map (fst.snd) xs), v, ntys)
case snd ret of
Impossible -> return ImpossibleCase
tm -> return $ STerm tm
match vs cs err = do let (vs', de_inf) = orderByInf vs cs
ps = partition de_inf
mixture vs' ps err
mixture :: [Name] -> [Partition] -> SC -> CaseBuilder SC
mixture vs [] err = return err
mixture vs (Cons ms : ps) err = do fallthrough <- mixture vs ps err
conRule vs ms fallthrough
mixture vs (Vars ms : ps) err = do fallthrough <- mixture vs ps err
varRule vs ms fallthrough
inaccessibleArgs :: Name -> CaseBuilder [Int]
inaccessibleArgs n = do
getInaccessiblePositions <- ask
return $ getInaccessiblePositions n
data ConType = CName Name Int
| CFn Name
| CSuc
| CConst Const
deriving (Show, Eq)
data Group = ConGroup Bool
ConType
[([Pat], Clause)]
deriving Show
conRule :: [Name] -> [Clause] -> SC -> CaseBuilder SC
conRule (v:vs) cs err = do groups <- groupCons cs
caseGroups (v:vs) groups err
caseGroups :: [Name] -> [Group] -> SC -> CaseBuilder SC
caseGroups (v:vs) gs err = do g <- altGroups gs
return $ Case (getShared gs) v (sort g)
where
getShared (ConGroup True _ _ : _) = Updatable
getShared _ = Shared
altGroups [] = return [DefaultCase err]
altGroups (ConGroup _ (CName n i) args : cs)
= (:) <$> altGroup n i args <*> altGroups cs
altGroups (ConGroup _ (CFn n) args : cs)
= (:) <$> altFnGroup n args <*> altGroups cs
altGroups (ConGroup _ CSuc args : cs)
= (:) <$> altSucGroup args <*> altGroups cs
altGroups (ConGroup _ (CConst c) args : cs)
= (:) <$> altConstGroup c args <*> altGroups cs
altGroup n i args
= do inacc <- inaccessibleArgs n
(newVars, accVars, inaccVars, nextCs) <- argsToAlt inacc args
matchCs <- match (accVars ++ vs ++ inaccVars) nextCs err
return $ ConCase n i newVars matchCs
altFnGroup n args = do (newVars, _, [], nextCs) <- argsToAlt [] args
matchCs <- match (newVars ++ vs) nextCs err
return $ FnCase n newVars matchCs
altSucGroup args = do ([newVar], _, [], nextCs) <- argsToAlt [] args
matchCs <- match (newVar:vs) nextCs err
return $ SucCase newVar matchCs
altConstGroup n args = do (_, _, [], nextCs) <- argsToAlt [] args
matchCs <- match vs nextCs err
return $ ConstCase n matchCs
argsToAlt :: [Int] -> [([Pat], Clause)] -> CaseBuilder ([Name], [Name], [Name], [Clause])
argsToAlt _ [] = return ([], [], [], [])
argsToAlt inacc rs@((r, m) : rest) = do
newVars <- getNewVars r
let (accVars, inaccVars) = partitionAcc newVars
return (newVars, accVars, inaccVars, addRs rs)
where
getNewVars :: [Pat] -> CaseBuilder [Name]
getNewVars [] = return []
getNewVars ((PV n t) : ns) = do v <- getVar "e"
nsv <- getNewVars ns
(cs, i, ntys) <- get
put (cs, i, (v, t) : ntys)
return (v : nsv)
getNewVars (PAny : ns) = (:) <$> getVar "i" <*> getNewVars ns
getNewVars (PTyPat : ns) = (:) <$> getVar "t" <*> getNewVars ns
getNewVars (_ : ns) = (:) <$> getVar "e" <*> getNewVars ns
partitionAcc xs =
( [x | (i,x) <- zip [0..] xs, i `notElem` inacc]
, [x | (i,x) <- zip [0..] xs, i `elem` inacc]
)
addRs [] = []
addRs ((r, (ps, res)) : rs) = ((acc++ps++inacc, res) : addRs rs)
where
(acc, inacc) = partitionAcc r
getVar :: String -> CaseBuilder Name
getVar b = do (t, v, ntys) <- get; put (t, v+1, ntys); return (sMN v b)
groupCons :: [Clause] -> CaseBuilder [Group]
groupCons cs = gc [] cs
where
gc acc [] = return acc
gc acc ((p : ps, res) : cs) =
do acc' <- addGroup p ps res acc
gc acc' cs
addGroup p ps res acc = case p of
PCon uniq con i args -> return $ addg uniq (CName con i) args (ps, res) acc
PConst cval -> return $ addConG cval (ps, res) acc
PSuc n -> return $ addg False CSuc [n] (ps, res) acc
PReflected fn args -> return $ addg False (CFn fn) args (ps, res) acc
pat -> fail $ show pat ++ " is not a constructor or constant (can't happen)"
addg uniq c conargs res []
= [ConGroup uniq c [(conargs, res)]]
addg uniq c conargs res (g@(ConGroup _ c' cs):gs)
| c == c' = ConGroup uniq c (cs ++ [(conargs, res)]) : gs
| otherwise = g : addg uniq c conargs res gs
addConG con res [] = [ConGroup False (CConst con) [([], res)]]
addConG con res (g@(ConGroup False (CConst n) cs) : gs)
| con == n = ConGroup False (CConst n) (cs ++ [([], res)]) : gs
addConG con res (g : gs) = g : addConG con res gs
varRule :: [Name] -> [Clause] -> SC -> CaseBuilder SC
varRule (v : vs) alts err =
do alts' <- mapM (repVar v) alts
match vs alts' err
where
repVar v (PV p ty : ps , (lhs, res))
= do (cs, i, ntys) <- get
put (cs, i, (v, ty) : ntys)
return (ps, (lhs, subst p (P Bound v ty) res))
repVar v (PAny : ps , res) = return (ps, res)
repVar v (PTyPat : ps , res) = return (ps, res)
depatt :: [Name] -> SC -> SC
depatt ns tm = dp [] tm
where
dp ms (STerm tm) = STerm (applyMaps ms tm)
dp ms (Case up x alts) = Case up x (map (dpa ms x) alts)
dp ms sc = sc
dpa ms x (ConCase n i args sc)
= ConCase n i args (dp ((x, (n, args)) : ms) sc)
dpa ms x (FnCase n args sc)
= FnCase n args (dp ((x, (n, args)) : ms) sc)
dpa ms x (ConstCase c sc) = ConstCase c (dp ms sc)
dpa ms x (SucCase n sc) = SucCase n (dp ms sc)
dpa ms x (DefaultCase sc) = DefaultCase (dp ms sc)
applyMaps ms f@(App _ _ _)
| (P nt cn pty, args) <- unApply f
= let args' = map (applyMaps ms) args in
applyMap ms nt cn pty args'
where
applyMap [] nt cn pty args' = mkApp (P nt cn pty) args'
applyMap ((x, (n, args)) : ms) nt cn pty args'
| and ((length args == length args') :
(n == cn) : zipWith same args args') = P Ref x Erased
| otherwise = applyMap ms nt cn pty args'
same n (P _ n' _) = n == n'
same _ _ = False
applyMaps ms (App s f a) = App s (applyMaps ms f) (applyMaps ms a)
applyMaps ms t = t
prune :: Bool
-> SC -> SC
prune proj (Case up n alts) = case alts' of
[] -> ImpossibleCase
as@[ConCase cn i args sc]
| proj -> let sc' = prune proj sc in
if any (isUsed sc') args
then Case up n [ConCase cn i args sc']
else sc'
[SucCase cn sc]
| proj
-> projRep cn n (1) $ prune proj sc
[ConstCase _ sc]
-> prune proj sc
[s@(SucCase _ _), DefaultCase dc]
-> Case up n [ConstCase (BI 0) dc, s]
as -> Case up n as
where
alts' = filter (not . erased) $ map pruneAlt alts
pruneAlt (ConCase cn i ns sc) = ConCase cn i ns (prune proj sc)
pruneAlt (FnCase cn ns sc) = FnCase cn ns (prune proj sc)
pruneAlt (ConstCase c sc) = ConstCase c (prune proj sc)
pruneAlt (SucCase n sc) = SucCase n (prune proj sc)
pruneAlt (DefaultCase sc) = DefaultCase (prune proj sc)
erased (DefaultCase (STerm Erased)) = True
erased (DefaultCase ImpossibleCase) = True
erased _ = False
projRep :: Name -> Name -> Int -> SC -> SC
projRep arg n i (Case up x alts) | x == arg
= ProjCase (Proj (P Bound n Erased) i) $ map (projRepAlt arg n i) alts
projRep arg n i (Case up x alts)
= Case up x (map (projRepAlt arg n i) alts)
projRep arg n i (ProjCase t alts)
= ProjCase (projRepTm arg n i t) $ map (projRepAlt arg n i) alts
projRep arg n i (STerm t) = STerm (projRepTm arg n i t)
projRep arg n i c = c
projRepAlt arg n i (ConCase cn t args rhs)
= ConCase cn t args (projRep arg n i rhs)
projRepAlt arg n i (FnCase cn args rhs)
= FnCase cn args (projRep arg n i rhs)
projRepAlt arg n i (ConstCase t rhs)
= ConstCase t (projRep arg n i rhs)
projRepAlt arg n i (SucCase sn rhs)
= SucCase sn (projRep arg n i rhs)
projRepAlt arg n i (DefaultCase rhs)
= DefaultCase (projRep arg n i rhs)
projRepTm arg n i t = subst arg (Proj (P Bound n Erased) i) t
prune _ t = t
removeUnreachable :: SC -> SC
removeUnreachable sc = ru [] sc
where
ru :: [(Name, Int)] -> SC -> SC
ru checked (Case t n alts)
= let alts' = map (ruAlt checked n) (dropImpossible (lookup n checked) alts) in
Case t n alts'
ru checked t = t
dropImpossible Nothing alts = alts
dropImpossible (Just t) [] = []
dropImpossible (Just t) (ConCase con tag args sc : rest)
| t == tag = [ConCase con tag args sc]
| otherwise = dropImpossible (Just t) rest
dropImpossible (Just t) (c : rest)
= c : dropImpossible (Just t) rest
ruAlt :: [(Name, Int)] -> Name -> CaseAlt -> CaseAlt
ruAlt checked var (ConCase con tag args sc)
= let checked' = dropChecked args (updateChecked var tag checked)
sc' = ru checked' sc in
ConCase con tag args sc'
ruAlt checked var (FnCase n args sc)
= let checked' = dropChecked [var] checked
sc' = ru checked' sc in
FnCase n args sc'
ruAlt checked var (ConstCase c sc)
= let checked' = dropChecked [var] checked
sc' = ru checked' sc in
ConstCase c sc'
ruAlt checked var (SucCase n sc)
= let checked' = dropChecked [var] checked
sc' = ru checked' sc in
SucCase n sc'
ruAlt checked var (DefaultCase sc)
= let checked' = dropChecked [var] checked
sc' = ru checked' sc in
DefaultCase sc'
updateChecked :: Name -> Int -> [(Name, Int)] -> [(Name, Int)]
updateChecked n i checked
= (n, i) : filter (\x -> fst x /= n) checked
dropChecked :: [Name] -> [(Name, Int)] -> [(Name, Int)]
dropChecked ns checked = filter (\x -> fst x `notElem` ns) checked
stripLambdas :: CaseDef -> CaseDef
stripLambdas (CaseDef ns (STerm (Bind x (Lam _ _) sc)) tm)
= stripLambdas (CaseDef (ns ++ [x]) (STerm (instantiate (P Bound x Erased) sc)) tm)
stripLambdas x = x
substSC :: Name -> Name -> SC -> SC
substSC n repl (Case up n' alts)
| n == n' = Case up repl (map (substAlt n repl) alts)
| otherwise = Case up n' (map (substAlt n repl) alts)
substSC n repl (STerm t) = STerm $ subst n (P Bound repl Erased) t
substSC n repl (UnmatchedCase errmsg) = UnmatchedCase errmsg
substSC n repl ImpossibleCase = ImpossibleCase
substSC n repl sc = error $ "unsupported in substSC: " ++ show sc
substAlt :: Name -> Name -> CaseAlt -> CaseAlt
substAlt n repl (ConCase cn a ns sc) = ConCase cn a ns (substSC n repl sc)
substAlt n repl (FnCase fn ns sc) = FnCase fn ns (substSC n repl sc)
substAlt n repl (ConstCase c sc) = ConstCase c (substSC n repl sc)
substAlt n repl (SucCase n' sc)
| n == n' = SucCase n (substSC n repl sc)
| otherwise = SucCase n' (substSC n repl sc)
substAlt n repl (DefaultCase sc) = DefaultCase (substSC n repl sc)
mkForce :: Name -> Name -> SC -> SC
mkForce = mkForceSC
where
mkForceSC n arg (Case up x alts) | x == arg
= Case up n $ map (mkForceAlt n arg) alts
mkForceSC n arg (Case up x alts)
= Case up x (map (mkForceAlt n arg) alts)
mkForceSC n arg (ProjCase t alts)
= ProjCase t $ map (mkForceAlt n arg) alts
mkForceSC n arg c = c
mkForceAlt n arg (ConCase cn t args rhs)
= ConCase cn t args (mkForceSC n arg rhs)
mkForceAlt n arg (FnCase cn args rhs)
= FnCase cn args (mkForceSC n arg rhs)
mkForceAlt n arg (ConstCase t rhs)
= ConstCase t (mkForceSC n arg rhs)
mkForceAlt n arg (SucCase sn rhs)
= SucCase sn (mkForceSC n arg rhs)
mkForceAlt n arg (DefaultCase rhs)
= DefaultCase (mkForceSC n arg rhs)