import Name ( hashName )
import Literal ( hashLiteral, literalType, litIsDupable )
import DataCon ( DataCon, dataConRepArity )
-import PrimOp ( primOpOkForSpeculation, primOpIsCheap,
- primOpIsDupable )
-import Id ( Id, idType, idFlavour, idStrictness, idLBVarInfo,
+import PrimOp ( primOpOkForSpeculation, primOpIsCheap )
+import Id ( Id, idType, globalIdDetails, idStrictness, idLBVarInfo,
mkWildId, idArity, idName, idUnfolding, idInfo, isOneShotLambda,
- isDataConId_maybe, isPrimOpId_maybe, mkSysLocal, hasNoBinding
+ isDataConId_maybe, mkSysLocal, hasNoBinding
)
import IdInfo ( LBVarInfo(..),
- IdFlavour(..),
+ GlobalIdDetails(..),
megaSeqIdInfo )
import Demand ( appIsBottom )
import Type ( Type, mkFunTy, mkForAllTy, splitFunTy_maybe,
import TysWiredIn ( boolTy, trueDataCon, falseDataCon )
import CostCentre ( CostCentre )
import UniqSupply ( UniqSupply, splitUniqSupply, uniqFromSupply )
-import Maybes ( maybeToBool )
import Outputable
import TysPrim ( alphaTy ) -- Debugging only
\end{code}
\begin{code}
mkSCC :: CostCentre -> Expr b -> Expr b
-- Note: Nested SCC's *are* preserved for the benefit of
- -- cost centre stack profiling (Durham)
-
-mkSCC cc (Lit lit) = Lit lit
-mkSCC cc (Lam x e) = Lam x (mkSCC cc e) -- Move _scc_ inside lambda
-mkSCC cc expr = Note (SCC cc) expr
+ -- cost centre stack profiling
+mkSCC cc (Lit lit) = Lit lit
+mkSCC cc (Lam x e) = Lam x (mkSCC cc e) -- Move _scc_ inside lambda
+mkSCC cc (Note (SCC cc') e) = Note (SCC cc) (Note (SCC cc') e)
+mkSCC cc (Note n e) = Note n (mkSCC cc e) -- Move _scc_ inside notes
+mkSCC cc expr = Note (SCC cc) expr
\end{code}
exprIsAtom (Var v) = True -- primOpIsDupable?
exprIsAtom (Lit lit) = True
exprIsAtom (Type ty) = True
+exprIsAtom (Note (SCC _) e) = False
exprIsAtom (Note _ e) = exprIsAtom e
exprIsAtom other = False
\end{code}
\begin{code}
-exprIsDupable (Type _) = True
-exprIsDupable (Var v) = True
-exprIsDupable (Lit lit) = litIsDupable lit
-exprIsDupable (Note _ e) = exprIsDupable e
+exprIsDupable (Type _) = True
+exprIsDupable (Var v) = True
+exprIsDupable (Lit lit) = litIsDupable lit
+exprIsDupable (Note InlineMe e) = True
+exprIsDupable (Note _ e) = exprIsDupable e
exprIsDupable expr
= go expr 0
where
exprIsCheap (Lit lit) = True
exprIsCheap (Type _) = True
exprIsCheap (Var _) = True
+exprIsCheap (Note InlineMe e) = True
exprIsCheap (Note _ e) = exprIsCheap e
exprIsCheap (Lam x e) = if isId x then True else exprIsCheap e
exprIsCheap (Case e _ alts) = exprIsCheap e &&
| n_val_args == 0 = True -- Just a type application of
-- a variable (f t1 t2 t3)
-- counts as WHNF
- | otherwise = case idFlavour id of
+ | otherwise = case globalIdDetails id of
DataConId _ -> True
RecordSelId _ -> True -- I'm experimenting with making record selection
-- look cheap, so we will substitute it inside a
= go other_expr 0 True
where
go (Var f) n_args args_ok
- = case idFlavour f of
+ = case globalIdDetails f of
DataConId _ -> True -- The strictness of the constructor has already
-- been expressed by its "wrapper", so we don't need
-- to take the arguments into account
map (...redex...) is a value
Because `seq` on such things completes immediately
-A worry: constructors with unboxed args:
+A possible worry: constructors with unboxed args:
C (f x :: Int#)
-Suppose (f x) diverges; then C (f x) is not a value.
+Suppose (f x) diverges; then C (f x) is not a value. True, but
+this form is illegal (see the invariants in CoreSyn). Args of unboxed
+type must be ok-for-speculation (or trivial).
\begin{code}
exprIsValue :: CoreExpr -> Bool -- True => Value-lambda, constructor, PAP
idAppIsValue :: Id -> Int -> Bool
idAppIsValue id n_val_args
- = case idFlavour id of
+ = case globalIdDetails id of
DataConId _ -> True
PrimOpId _ -> n_val_args < idArity id
other | n_val_args == 0 -> isEvaldUnfolding (idUnfolding id)
\begin{code}
exprIsConApp_maybe :: CoreExpr -> Maybe (DataCon, [CoreExpr])
-exprIsConApp_maybe expr
- = analyse (collectArgs expr)
+exprIsConApp_maybe (Note InlineMe expr) = exprIsConApp_maybe expr
+ -- We ignore InlineMe notes in case we have
+ -- x = __inline_me__ (a,b)
+ -- All part of making sure that INLINE pragmas never hurt
+ -- Marcin tripped on this one when making dictionaries more inlinable
+
+exprIsConApp_maybe expr = analyse (collectArgs expr)
where
analyse (Var fun, args)
| Just con <- isDataConId_maybe fun,
analyse other = Nothing
\end{code}
-The arity of an expression (in the code-generator sense, i.e. the
-number of lambdas at the beginning).
-
-\begin{code}
-exprArity :: CoreExpr -> Int
-exprArity (Lam x e)
- | isTyVar x = exprArity e
- | otherwise = 1 + exprArity e
-exprArity (Note _ e)
- -- Ignore coercions. Top level sccs are removed by the final
- -- profiling pass, so we ignore those too.
- = exprArity e
-exprArity _ = 0
-\end{code}
%************************************************************************
--
-- Consider let x = expensive in \y z -> E
-- We want this to have arity 2 if the \y-abstraction is a 1-shot lambda
--- Hence the extra Bool returned by go1
+--
+-- Hence the list of Bools returned by go1
-- NB: this is particularly important/useful for IO state
-- transformers, where we often get
-- let x = E in \ s -> ...
go1 (Note n e) | ok_note n = go1 e
go1 (Var v) = replicate (idArity v) False -- When the type of the Id
-- encodes one-shot-ness, use
- -- th iinfo here
+ -- the idinfo here
-- Lambdas; increase arity
go1 (Lam x e) | isId x = isOneShotLambda x : go1 e
ok_note InlineCall = True
ok_note other = False
-- Notice that we do not look through __inline_me__
- -- This one is a bit more surprising, but consider
+ -- This may seem surprising, but consider
-- f = _inline_me (\x -> e)
-- We DO NOT want to eta expand this to
-- f = \x -> (_inline_me (\x -> e)) x
-- would return
-- (/\b. coerce T (\y::A -> (coerce (A->B) (E b) y)
--- (case x of { I# x -> /\ a -> coerce T E)
-
etaExpand n us expr ty
| n == 0 -- Saturated, so nothing to do
= expr
\end{code}
+exprArity is a cheap-and-cheerful version of exprEtaExpandArity.
+It tells how many things the expression can be applied to before doing
+any work. It doesn't look inside cases, lets, etc. The idea is that
+exprEtaExpandArity will do the hard work, leaving something that's easy
+for exprArity to grapple with. In particular, Simplify uses exprArity to
+compute the ArityInfo for the Id.
+
+Originally I thought that it was enough just to look for top-level lambdas, but
+it isn't. I've seen this
+
+ foo = PrelBase.timesInt
+
+We want foo to get arity 2 even though the eta-expander will leave it
+unchanged, in the expectation that it'll be inlined. But occasionally it
+isn't, because foo is blacklisted (used in a rule).
+
+Similarly, see the ok_note check in exprEtaExpandArity. So
+ f = __inline_me (\x -> e)
+won't be eta-expanded.
+
+And in any case it seems more robust to have exprArity be a bit more intelligent.
+
+\begin{code}
+exprArity :: CoreExpr -> Int
+exprArity e = go e `max` 0
+ where
+ go (Lam x e) | isId x = go e + 1
+ | otherwise = go e
+ go (Note _ e) = go e
+ go (App e (Type t)) = go e
+ go (App f a) = go f - 1
+ go (Var v) = idArity v
+ go _ = 0
+\end{code}
+
+
%************************************************************************
%* *
\subsection{Equality}