{- (c) The GRASP/AQUA Project, Glasgow University, 1992-1998 \section[FloatOut]{Float bindings outwards (towards the top level)} ``Long-distance'' floating of bindings towards the top level. -} {-# LANGUAGE CPP #-} {-# OPTIONS_GHC -fno-warn-orphans #-} module FloatOut ( floatOutwards ) where import CoreSyn import CoreUtils import MkCore import CoreArity ( etaExpand ) import CoreMonad ( FloatOutSwitches(..) ) import DynFlags import ErrUtils ( dumpIfSet_dyn ) import Id ( Id, idArity, isBottomingId ) import Var ( Var ) import SetLevels import UniqSupply ( UniqSupply ) import Bag import Util import Maybes import Outputable import FastString import qualified Data.IntMap as M #include "HsVersions.h" {- ----------------- Overall game plan ----------------- The Big Main Idea is: To float out sub-expressions that can thereby get outside a non-one-shot value lambda, and hence may be shared. To achieve this we may need to do two thing: a) Let-bind the sub-expression: f (g x) ==> let lvl = f (g x) in lvl Now we can float the binding for 'lvl'. b) More than that, we may need to abstract wrt a type variable \x -> ... /\a -> let v = ...a... in .... Here the binding for v mentions 'a' but not 'x'. So we abstract wrt 'a', to give this binding for 'v': vp = /\a -> ...a... v = vp a Now the binding for vp can float out unimpeded. I can't remember why this case seemed important enough to deal with, but I certainly found cases where important floats didn't happen if we did not abstract wrt tyvars. With this in mind we can also achieve another goal: lambda lifting. We can make an arbitrary (function) binding float to top level by abstracting wrt *all* local variables, not just type variables, leaving a binding that can be floated right to top level. Whether or not this happens is controlled by a flag. Random comments ~~~~~~~~~~~~~~~ At the moment we never float a binding out to between two adjacent lambdas. For example: @ \x y -> let t = x+x in ... ===> \x -> let t = x+x in \y -> ... @ Reason: this is less efficient in the case where the original lambda is never partially applied. But there's a case I've seen where this might not be true. Consider: @ elEm2 x ys = elem' x ys where elem' _ [] = False elem' x (y:ys) = x==y || elem' x ys @ It turns out that this generates a subexpression of the form @ \deq x ys -> let eq = eqFromEqDict deq in ... @ vwhich might usefully be separated to @ \deq -> let eq = eqFromEqDict deq in \xy -> ... @ Well, maybe. We don't do this at the moment. ************************************************************************ * * \subsection[floatOutwards]{@floatOutwards@: let-floating interface function} * * ************************************************************************ -} floatOutwards :: FloatOutSwitches -> DynFlags -> UniqSupply -> CoreProgram -> IO CoreProgram floatOutwards float_sws dflags us pgm = do { let { annotated_w_levels = setLevels float_sws pgm us ; (fss, binds_s') = unzip (map floatTopBind annotated_w_levels) } ; dumpIfSet_dyn dflags Opt_D_verbose_core2core "Levels added:" (vcat (map ppr annotated_w_levels)); let { (tlets, ntlets, lams) = get_stats (sum_stats fss) }; dumpIfSet_dyn dflags Opt_D_dump_simpl_stats "FloatOut stats:" (hcat [ int tlets, ptext (sLit " Lets floated to top level; "), int ntlets, ptext (sLit " Lets floated elsewhere; from "), int lams, ptext (sLit " Lambda groups")]); return (bagToList (unionManyBags binds_s')) } floatTopBind :: LevelledBind -> (FloatStats, Bag CoreBind) floatTopBind bind = case (floatBind bind) of { (fs, floats, bind') -> let float_bag = flattenTopFloats floats in case bind' of Rec prs -> (fs, unitBag (Rec (addTopFloatPairs float_bag prs))) NonRec {} -> (fs, float_bag `snocBag` bind') } {- ************************************************************************ * * \subsection[FloatOut-Bind]{Floating in a binding (the business end)} * * ************************************************************************ -} floatBind :: LevelledBind -> (FloatStats, FloatBinds, CoreBind) floatBind (NonRec (TB var _) rhs) = case (floatExpr rhs) of { (fs, rhs_floats, rhs') -> -- A tiresome hack: -- see Note [Bottoming floats: eta expansion] in SetLevels let rhs'' | isBottomingId var = etaExpand (idArity var) rhs' | otherwise = rhs' in (fs, rhs_floats, NonRec var rhs'') } floatBind (Rec pairs) = case floatList do_pair pairs of { (fs, rhs_floats, new_pairs) -> (fs, rhs_floats, Rec (concat new_pairs)) } where do_pair (TB name spec, rhs) | isTopLvl dest_lvl -- See Note [floatBind for top level] = case (floatExpr rhs) of { (fs, rhs_floats, rhs') -> (fs, emptyFloats, addTopFloatPairs (flattenTopFloats rhs_floats) [(name, rhs')])} | otherwise -- Note [Floating out of Rec rhss] = case (floatExpr rhs) of { (fs, rhs_floats, rhs') -> case (partitionByLevel dest_lvl rhs_floats) of { (rhs_floats', heres) -> case (splitRecFloats heres) of { (pairs, case_heres) -> (fs, rhs_floats', (name, installUnderLambdas case_heres rhs') : pairs) }}} where dest_lvl = floatSpecLevel spec splitRecFloats :: Bag FloatBind -> ([(Id,CoreExpr)], Bag FloatBind) -- The "tail" begins with a case -- See Note [Floating out of Rec rhss] splitRecFloats fs = go [] (bagToList fs) where go prs (FloatLet (NonRec b r) : fs) = go ((b,r):prs) fs go prs (FloatLet (Rec prs') : fs) = go (prs' ++ prs) fs go prs fs = (prs, listToBag fs) installUnderLambdas :: Bag FloatBind -> CoreExpr -> CoreExpr -- Note [Floating out of Rec rhss] installUnderLambdas floats e | isEmptyBag floats = e | otherwise = go e where go (Lam b e) = Lam b (go e) go e = install floats e --------------- floatList :: (a -> (FloatStats, FloatBinds, b)) -> [a] -> (FloatStats, FloatBinds, [b]) floatList _ [] = (zeroStats, emptyFloats, []) floatList f (a:as) = case f a of { (fs_a, binds_a, b) -> case floatList f as of { (fs_as, binds_as, bs) -> (fs_a `add_stats` fs_as, binds_a `plusFloats` binds_as, b:bs) }} {- Note [Floating out of Rec rhss] ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~ Consider Rec { f<1,0> = \xy. body } From the body we may get some floats. The ones with level <1,0> must stay here, since they may mention f. Ideally we'd like to make them part of the Rec block pairs -- but we can't if there are any FloatCases involved. Nor is it a good idea to dump them in the rhs, but outside the lambda f = case x of I# y -> \xy. body because now f's arity might get worse, which is Not Good. (And if there's an SCC around the RHS it might not get better again. See Trac #5342.) So, gruesomely, we split the floats into * the outer FloatLets, which can join the Rec, and * an inner batch starting in a FloatCase, which are then pushed *inside* the lambdas. This loses full-laziness the rare situation where there is a FloatCase and a Rec interacting. Note [floatBind for top level] ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~ We may have a *nested* binding whose destination level is (FloatMe tOP_LEVEL), thus letrec { foo <0,0> = .... (let bar<0,0> = .. in ..) .... } The binding for bar will be in the "tops" part of the floating binds, and thus not partioned by floatBody. We could perhaps get rid of the 'tops' component of the floating binds, but this case works just as well. ************************************************************************ \subsection[FloatOut-Expr]{Floating in expressions} * * ************************************************************************ -} floatBody :: Level -> LevelledExpr -> (FloatStats, FloatBinds, CoreExpr) floatBody lvl arg -- Used rec rhss, and case-alternative rhss = case (floatExpr arg) of { (fsa, floats, arg') -> case (partitionByLevel lvl floats) of { (floats', heres) -> -- Dump bindings are bound here (fsa, floats', install heres arg') }} ----------------- {- Note [Floating past breakpoints] ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~ Notes from Peter Wortmann (re: #10052) "This case clearly means we're trying to float past a breakpoint..." Further: "Breakpoints as they currently exist are the only Tikish that is not scoped, counting, and not splittable. This means that we can't: - Simply float code out of it, because the payload must still be covered (scoped) - Copy the tick, because it would change entry counts (here: duplicate breakpoints)" While this seems like an odd case, it can apparently occur in real life: through the combination of optimizations + GHCi usage. For an example, see #10052 as mentioned above. So not only does the interpreter not like some compiler-generated things (like unboxed tuples), the compiler doesn't like interpreter-introduced things! Also see Note [GHCi and -O] in GHC.hs. -} floatExpr :: LevelledExpr -> (FloatStats, FloatBinds, CoreExpr) floatExpr (Var v) = (zeroStats, emptyFloats, Var v) floatExpr (Type ty) = (zeroStats, emptyFloats, Type ty) floatExpr (Coercion co) = (zeroStats, emptyFloats, Coercion co) floatExpr (Lit lit) = (zeroStats, emptyFloats, Lit lit) floatExpr (App e a) = case (floatExpr e) of { (fse, floats_e, e') -> case (floatExpr a) of { (fsa, floats_a, a') -> (fse `add_stats` fsa, floats_e `plusFloats` floats_a, App e' a') }} floatExpr lam@(Lam (TB _ lam_spec) _) = let (bndrs_w_lvls, body) = collectBinders lam bndrs = [b | TB b _ <- bndrs_w_lvls] bndr_lvl = floatSpecLevel lam_spec -- All the binders have the same level -- See SetLevels.lvlLamBndrs in case (floatBody bndr_lvl body) of { (fs, floats, body') -> (add_to_stats fs floats, floats, mkLams bndrs body') } floatExpr (Tick tickish expr) | tickish `tickishScopesLike` SoftScope -- not scoped, can just float = case (floatExpr expr) of { (fs, floating_defns, expr') -> (fs, floating_defns, Tick tickish expr') } | not (tickishCounts tickish) || tickishCanSplit tickish = case (floatExpr expr) of { (fs, floating_defns, expr') -> let -- Annotate bindings floated outwards past an scc expression -- with the cc. We mark that cc as "duplicated", though. annotated_defns = wrapTick (mkNoCount tickish) floating_defns in (fs, annotated_defns, Tick tickish expr') } -- Note [Floating past breakpoints] | otherwise = pprPanic "floatExpr tick" (ppr tickish) floatExpr (Cast expr co) = case (floatExpr expr) of { (fs, floating_defns, expr') -> (fs, floating_defns, Cast expr' co) } floatExpr (Let bind body) = case bind_spec of FloatMe dest_lvl -> case (floatBind bind) of { (fsb, bind_floats, bind') -> case (floatExpr body) of { (fse, body_floats, body') -> ( add_stats fsb fse , bind_floats `plusFloats` unitLetFloat dest_lvl bind' `plusFloats` body_floats , body') }} StayPut bind_lvl -- See Note [Avoiding unnecessary floating] -> case (floatBind bind) of { (fsb, bind_floats, bind') -> case (floatBody bind_lvl body) of { (fse, body_floats, body') -> ( add_stats fsb fse , bind_floats `plusFloats` body_floats , Let bind' body') }} where bind_spec = case bind of NonRec (TB _ s) _ -> s Rec ((TB _ s, _) : _) -> s Rec [] -> panic "floatExpr:rec" floatExpr (Case scrut (TB case_bndr case_spec) ty alts) = case case_spec of FloatMe dest_lvl -- Case expression moves | [(con@(DataAlt {}), bndrs, rhs)] <- alts -> case floatExpr scrut of { (fse, fde, scrut') -> case floatExpr rhs of { (fsb, fdb, rhs') -> let float = unitCaseFloat dest_lvl scrut' case_bndr con [b | TB b _ <- bndrs] in (add_stats fse fsb, fde `plusFloats` float `plusFloats` fdb, rhs') }} | otherwise -> pprPanic "Floating multi-case" (ppr alts) StayPut bind_lvl -- Case expression stays put -> case floatExpr scrut of { (fse, fde, scrut') -> case floatList (float_alt bind_lvl) alts of { (fsa, fda, alts') -> (add_stats fse fsa, fda `plusFloats` fde, Case scrut' case_bndr ty alts') }} where float_alt bind_lvl (con, bs, rhs) = case (floatBody bind_lvl rhs) of { (fs, rhs_floats, rhs') -> (fs, rhs_floats, (con, [b | TB b _ <- bs], rhs')) } {- Note [Avoiding unnecessary floating] ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~ In general we want to avoid floating a let unnecessarily, because it might worsen strictness: let x = ...(let y = e in y+y).... Here y is demanded. If we float it outside the lazy 'x=..' then we'd have to zap its demand info, and it may never be restored. So at a 'let' we leave the binding right where the are unless the binding will escape a value lambda, e.g. (\x -> let y = fac 100 in y) That's what the partitionByMajorLevel does in the floatExpr (Let ...) case. Notice, though, that we must take care to drop any bindings from the body of the let that depend on the staying-put bindings. We used instead to do the partitionByMajorLevel on the RHS of an '=', in floatRhs. But that was quite tiresome. We needed to test for values or trival rhss, because (in particular) we don't want to insert new bindings between the "=" and the "\". E.g. f = \x -> let <bind> in <body> We do not want f = let <bind> in \x -> <body> (a) The simplifier will immediately float it further out, so we may as well do so right now; in general, keeping rhss as manifest values is good (b) If a float-in pass follows immediately, it might add yet more bindings just after the '='. And some of them might (correctly) be strict even though the 'let f' is lazy, because f, being a value, gets its demand-info zapped by the simplifier. And even all that turned out to be very fragile, and broke altogether when profiling got in the way. So now we do the partition right at the (Let..) itself. ************************************************************************ * * \subsection{Utility bits for floating stats} * * ************************************************************************ I didn't implement this with unboxed numbers. I don't want to be too strict in this stuff, as it is rarely turned on. (WDP 95/09) -} data FloatStats = FlS Int -- Number of top-floats * lambda groups they've been past Int -- Number of non-top-floats * lambda groups they've been past Int -- Number of lambda (groups) seen get_stats :: FloatStats -> (Int, Int, Int) get_stats (FlS a b c) = (a, b, c) zeroStats :: FloatStats zeroStats = FlS 0 0 0 sum_stats :: [FloatStats] -> FloatStats sum_stats xs = foldr add_stats zeroStats xs add_stats :: FloatStats -> FloatStats -> FloatStats add_stats (FlS a1 b1 c1) (FlS a2 b2 c2) = FlS (a1 + a2) (b1 + b2) (c1 + c2) add_to_stats :: FloatStats -> FloatBinds -> FloatStats add_to_stats (FlS a b c) (FB tops others) = FlS (a + lengthBag tops) (b + lengthBag (flattenMajor others)) (c + 1) {- ************************************************************************ * * \subsection{Utility bits for floating} * * ************************************************************************ Note [Representation of FloatBinds] ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~ The FloatBinds types is somewhat important. We can get very large numbers of floating bindings, often all destined for the top level. A typical example is x = [4,2,5,2,5, .... ] Then we get lots of small expressions like (fromInteger 4), which all get lifted to top level. The trouble is that (a) we partition these floating bindings *at every binding site* (b) SetLevels introduces a new bindings site for every float So we had better not look at each binding at each binding site! That is why MajorEnv is represented as a finite map. We keep the bindings destined for the *top* level separate, because we float them out even if they don't escape a *value* lambda; see partitionByMajorLevel. -} type FloatLet = CoreBind -- INVARIANT: a FloatLet is always lifted type MajorEnv = M.IntMap MinorEnv -- Keyed by major level type MinorEnv = M.IntMap (Bag FloatBind) -- Keyed by minor level data FloatBinds = FB !(Bag FloatLet) -- Destined for top level !MajorEnv -- Levels other than top -- See Note [Representation of FloatBinds] instance Outputable FloatBinds where ppr (FB fbs defs) = ptext (sLit "FB") <+> (braces $ vcat [ ptext (sLit "tops =") <+> ppr fbs , ptext (sLit "non-tops =") <+> ppr defs ]) flattenTopFloats :: FloatBinds -> Bag CoreBind flattenTopFloats (FB tops defs) = ASSERT2( isEmptyBag (flattenMajor defs), ppr defs ) tops addTopFloatPairs :: Bag CoreBind -> [(Id,CoreExpr)] -> [(Id,CoreExpr)] addTopFloatPairs float_bag prs = foldrBag add prs float_bag where add (NonRec b r) prs = (b,r):prs add (Rec prs1) prs2 = prs1 ++ prs2 flattenMajor :: MajorEnv -> Bag FloatBind flattenMajor = M.fold (unionBags . flattenMinor) emptyBag flattenMinor :: MinorEnv -> Bag FloatBind flattenMinor = M.fold unionBags emptyBag emptyFloats :: FloatBinds emptyFloats = FB emptyBag M.empty unitCaseFloat :: Level -> CoreExpr -> Id -> AltCon -> [Var] -> FloatBinds unitCaseFloat (Level major minor) e b con bs = FB emptyBag (M.singleton major (M.singleton minor (unitBag (FloatCase e b con bs)))) unitLetFloat :: Level -> FloatLet -> FloatBinds unitLetFloat lvl@(Level major minor) b | isTopLvl lvl = FB (unitBag b) M.empty | otherwise = FB emptyBag (M.singleton major (M.singleton minor floats)) where floats = unitBag (FloatLet b) plusFloats :: FloatBinds -> FloatBinds -> FloatBinds plusFloats (FB t1 l1) (FB t2 l2) = FB (t1 `unionBags` t2) (l1 `plusMajor` l2) plusMajor :: MajorEnv -> MajorEnv -> MajorEnv plusMajor = M.unionWith plusMinor plusMinor :: MinorEnv -> MinorEnv -> MinorEnv plusMinor = M.unionWith unionBags install :: Bag FloatBind -> CoreExpr -> CoreExpr install defn_groups expr = foldrBag wrapFloat expr defn_groups partitionByLevel :: Level -- Partitioning level -> FloatBinds -- Defns to be divided into 2 piles... -> (FloatBinds, -- Defns with level strictly < partition level, Bag FloatBind) -- The rest {- -- ---- partitionByMajorLevel ---- -- Float it if we escape a value lambda, -- *or* if we get to the top level -- *or* if it's a case-float and its minor level is < current -- -- If we can get to the top level, say "yes" anyway. This means that -- x = f e -- transforms to -- lvl = e -- x = f lvl -- which is as it should be partitionByMajorLevel (Level major _) (FB tops defns) = (FB tops outer, heres `unionBags` flattenMajor inner) where (outer, mb_heres, inner) = M.splitLookup major defns heres = case mb_heres of Nothing -> emptyBag Just h -> flattenMinor h -} partitionByLevel (Level major minor) (FB tops defns) = (FB tops (outer_maj `plusMajor` M.singleton major outer_min), here_min `unionBags` flattenMinor inner_min `unionBags` flattenMajor inner_maj) where (outer_maj, mb_here_maj, inner_maj) = M.splitLookup major defns (outer_min, mb_here_min, inner_min) = case mb_here_maj of Nothing -> (M.empty, Nothing, M.empty) Just min_defns -> M.splitLookup minor min_defns here_min = mb_here_min `orElse` emptyBag wrapTick :: Tickish Id -> FloatBinds -> FloatBinds wrapTick t (FB tops defns) = FB (mapBag wrap_bind tops) (M.map (M.map wrap_defns) defns) where wrap_defns = mapBag wrap_one wrap_bind (NonRec binder rhs) = NonRec binder (maybe_tick rhs) wrap_bind (Rec pairs) = Rec (mapSnd maybe_tick pairs) wrap_one (FloatLet bind) = FloatLet (wrap_bind bind) wrap_one (FloatCase e b c bs) = FloatCase (maybe_tick e) b c bs maybe_tick e | exprIsHNF e = tickHNFArgs t e | otherwise = mkTick t e -- we don't need to wrap a tick around an HNF when we float it -- outside a tick: that is an invariant of the tick semantics -- Conversely, inlining of HNFs inside an SCC is allowed, and -- indeed the HNF we're floating here might well be inlined back -- again, and we don't want to end up with duplicate ticks.