-- -- Copyright (c) 2014 Joachim Breitner -- module CallArity ( callArityAnalProgram , callArityRHS -- for testing ) where import VarSet import VarEnv import DynFlags ( DynFlags ) import BasicTypes import CoreSyn import Id import CoreArity ( typeArity ) import CoreUtils ( exprIsHNF ) --import Outputable import UnVarGraph import Demand import Control.Arrow ( first, second ) {- %************************************************************************ %* * Call Arity Analyis %* * %************************************************************************ Note [Call Arity: The goal] ~~~~~~~~~~~~~~~~~~~~~~~~~~~ The goal of this analysis is to find out if we can eta-expand a local function, based on how it is being called. The motivating example is this code, which comes up when we implement foldl using foldr, and do list fusion: let go = \x -> let d = case ... of False -> go (x+1) True -> id in \z -> d (x + z) in go 1 0 If we do not eta-expand `go` to have arity 2, we are going to allocate a lot of partial function applications, which would be bad. The function `go` has a type of arity two, but only one lambda is manifest. Furthermore, an analysis that only looks at the RHS of go cannot be sufficient to eta-expand go: If `go` is ever called with one argument (and the result used multiple times), we would be doing the work in `...` multiple times. So `callArityAnalProgram` looks at the whole let expression to figure out if all calls are nice, i.e. have a high enough arity. It then stores the result in the `calledArity` field of the `IdInfo` of `go`, which the next simplifier phase will eta-expand. The specification of the `calledArity` field is: No work will be lost if you eta-expand me to the arity in `calledArity`. What we want to know for a variable ----------------------------------- For every let-bound variable we'd like to know: 1. A lower bound on the arity of all calls to the variable, and 2. whether the variable is being called at most once or possible multiple times. It is always ok to lower the arity, or pretend that there are multiple calls. In particular, "Minimum arity 0 and possible called multiple times" is always correct. What we want to know from an expression --------------------------------------- In order to obtain that information for variables, we analyize expression and obtain bits of information: I. The arity analysis: For every variable, whether it is absent, or called, and if called, which what arity. II. The Co-Called analysis: For every two variables, whether there is a possibility that both are being called. We obtain as a special case: For every variables, whether there is a possibility that it is being called twice. For efficiency reasons, we gather this information only for a set of *interesting variables*, to avoid spending time on, e.g., variables from pattern matches. The two analysis are not completely independent, as a higher arity can improve the information about what variables are being called once or multiple times. Note [Analysis I: The arity analyis] ------------------------------------ The arity analysis is quite straight forward: The information about an expression is an VarEnv Arity where absent variables are bound to Nothing and otherwise to a lower bound to their arity. When we analyize an expression, we analyize it with a given context arity. Lambdas decrease and applications increase the incoming arity. Analysizing a variable will put that arity in the environment. In lets or cases all the results from the various subexpressions are lubed, which takes the point-wise minimum (considering Nothing an infinity). Note [Analysis II: The Co-Called analysis] ------------------------------------------ The second part is more sophisticated. For reasons explained below, it is not sufficient to simply know how often an expression evalutes a variable. Instead we need to know which variables are possibly called together. The data structure here is an undirected graph of variables, which is provided by the abstract UnVarGraph It is safe to return a larger graph, i.e. one with more edges. The worst case (i.e. the least useful and always correct result) is the complete graph on all free variables, which means that anything can be called together with anything (including itself). Notation for the following: C(e) is the co-called result for e. G₁∪G₂ is the union of two graphs fv is the set of free variables (conveniently the domain of the arity analysis result) S₁×S₂ is the complete bipartite graph { {a,b} | a ∈ S₁, b ∈ S₂ } S² is the complete graph on the set of variables S, S² = S×S C'(e) is a variant for bound expression: If e is called at most once, or it is and stays a thunk (after the analysis), it is simply C(e). Otherwise, the expression can be called multiple times and we return (fv e)² The interesting cases of the analysis: * Var v: No other variables are being called. Return {} (the empty graph) * Lambda v e, under arity 0: This means that e can be evaluated many times and we cannot get any useful co-call information. Return (fv e)² * Case alternatives alt₁,alt₂,...: Only one can be execuded, so Return (alt₁ ∪ alt₂ ∪...) * App e₁ e₂ (and analogously Case scrut alts): We get the results from both sides. Additionally, anything called by e₁ can possibly called with anything from e₂. Return: C(e₁) ∪ C(e₂) ∪ (fv e₁) × (fv e₂) * Let v = rhs in body: In addition to the results from the subexpressions, add all co-calls from everything that the body calls together with v to everthing that is called by v. Return: C'(rhs) ∪ C(body) ∪ (fv rhs) × {v'| {v,v'} ∈ C(body)} * Letrec v₁ = rhs₁ ... vₙ = rhsₙ in body Tricky. We assume that it is really mutually recursive, i.e. that every variable calls one of the others, and that this is strongly connected (otherwise we return an over-approximation, so that's ok), see note [Recursion and fixpointing]. Let V = {v₁,...vₙ}. Assume that the vs have been analysed with an incoming demand and cardinality consistent with the final result (this is the fixed-pointing). Again we can use the results from all subexpressions. In addition, for every variable vᵢ, we need to find out what it is called with (call this set Sᵢ). There are two cases: * If vᵢ is a function, we need to go through all right-hand-sides and bodies, and collect every variable that is called together with any variable from V: Sᵢ = {v' | j ∈ {1,...,n}, {v',vⱼ} ∈ C'(rhs₁) ∪ ... ∪ C'(rhsₙ) ∪ C(body) } * If vᵢ is a thunk, then its rhs is evaluated only once, so we need to exclude it from this set: Sᵢ = {v' | j ∈ {1,...,n}, j≠i, {v',vⱼ} ∈ C'(rhs₁) ∪ ... ∪ C'(rhsₙ) ∪ C(body) } Finally, combine all this: Return: C(body) ∪ C'(rhs₁) ∪ ... ∪ C'(rhsₙ) ∪ (fv rhs₁) × S₁) ∪ ... ∪ (fv rhsₙ) × Sₙ) Using the result: Eta-Expansion ------------------------------- We use the result of these two analyses to decide whether we can eta-expand the rhs of a let-bound variable. If the variable is already a function (exprIsHNF), and all calls to the variables have a higher arity than the current manifest arity (i.e. the number of lambdas), expand. If the variable is a thunk we must be careful: Eta-Expansion will prevent sharing of work, so this is only safe if there is at most one call to the function. Therefore, we check whether {v,v} ∈ G. Example: let n = case .. of .. -- A thunk! in n 0 + n 1 vs. let n = case .. of .. in case .. of T -> n 0 F -> n 1 We are only allowed to eta-expand `n` if it is going to be called at most once in the body of the outer let. So we need to know, for each variable individually, that it is going to be called at most once. Why the co-call graph? ---------------------- Why is it not sufficient to simply remember which variables are called once and which are called multiple times? It would be in the previous example, but consider let n = case .. of .. in case .. of True -> let go = \y -> case .. of True -> go (y + n 1) False > n in go 1 False -> n vs. let n = case .. of .. in case .. of True -> let go = \y -> case .. of True -> go (y+1) False > n in go 1 False -> n In both cases, the body and the rhs of the inner let call n at most once. But only in the second case that holds for the whole expression! The crucial difference is that in the first case, the rhs of `go` can call *both* `go` and `n`, and hence can call `n` multiple times as it recurses, while in the second case find out that `go` and `n` are not called together. Why co-call information for functions? -------------------------------------- Although for eta-expansion we need the information only for thunks, we still need to know whether functions are being called once or multiple times, and together with what other functions. Example: let n = case .. of .. f x = n (x+1) in f 1 + f 2 vs. let n = case .. of .. f x = n (x+1) in case .. of T -> f 0 F -> f 1 Here, the body of f calls n exactly once, but f itself is being called multiple times, so eta-expansion is not allowed. Note [Analysis type signature] ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~ The work-hourse of the analysis is the function `callArityAnal`, with the following type: type CallArityRes = (UnVarGraph, VarEnv Arity) callArityAnal :: Arity -> -- The arity this expression is called with VarSet -> -- The set of interesting variables CoreExpr -> -- The expression to analyse (CallArityRes, CoreExpr) and the following specification: ((coCalls, callArityEnv), expr') = callArityEnv arity interestingIds expr <=> Assume the expression `expr` is being passed `arity` arguments. Then it holds that * The domain of `callArityEnv` is a subset of `interestingIds`. * Any variable from `interestingIds` that is not mentioned in the `callArityEnv` is absent, i.e. not called at all. * Every call from `expr` to a variable bound to n in `callArityEnv` has at least n value arguments. * For two interesting variables `v1` and `v2`, they are not adjacent in `coCalls`, then in no execution of `expr` both are being called. Furthermore, expr' is expr with the callArity field of the `IdInfo` updated. Note [Which variables are interesting] ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~ The analysis would quickly become prohibitive expensive if we would analyse all variables; for most variables we simply do not care about how often they are called, i.e. variables bound in a pattern match. So interesting are variables that are * top-level or let bound * and possibly functions (typeArity > 0) Note [Information about boring variables] ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~ If we decide that the variable bound in `let x = e1 in e2` is not interesting, the analysis of `e2` will not report anything about `x`. To ensure that `callArityBind` does still do the right thing we have to extend the result from `e2` with a safe approximation. This is done using `fakeBoringCalls` and has the effect of analysing x `seq` x `seq` e2 instead, i.e. with `both` the result from `e2` with the most conservative result about the uninteresting value. Note [Recursion and fixpointing] ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~ For a mutually recursive let, we begin by 1. analysing the body, using the same incoming arity as for the whole expression. 2. Then we iterate, memoizing for each of the bound variables the last analysis call, i.e. incoming arity, whether it is called once, and the CallArityRes. 3. We combine the analysis result from the body and the memoized results for the arguments (if already present). 4. For each variable, we find out the incoming arity and whether it is called once, based on the the current analysis result. If this differs from the memoized results, we re-analyse the rhs and update the memoized table. 5. If nothing had to be reanalized, we are done. Otherwise, repeat from step 3. Note [Thunks in recursive groups] ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~ We never eta-expand a thunk in a recursive group, on the grounds that if it is part of a recursive group, then it will be called multipe times. This is not necessarily true, e.g. it would be safe to eta-expand t2 (but not t1) in the follwing code: let go x = t1 t1 = if ... then t2 else ... t2 = if ... then go 1 else ... in go 0 Detecting this would reqiure finding out what variables are only ever called from thunks. While this is certainly possible, we yet have to see this to be relevant in the wild. Note [Analysing top-level binds] ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~ We can eta-expand top-level-binds if they are not exported, as we see all calls to them. The plan is as follows: Treat the top-level binds as nested lets around a body representing “all external calls”, which returns a pessimistic CallArityRes (the co-call graph is the complete graph, all arityies 0). Note [Trimming arity] ~~~~~~~~~~~~~~~~~~~~~~~~~~~~ In the Call Arity papers, we are working on an untyped lambda calculus with no other id annotations, where eta-expansion is always possible. But this is not the case for Core! 1. We need to ensure the invariant callArity e <= typeArity (exprType e) for the same reasons that exprArity needs this invariant (see Note [exprArity invariant] in CoreArity). If we are not doing that, a too-high arity annotation will be stored with the id, confusing the simplifier later on. 2. Eta-expanding a right hand side might invalidate existing annotations. In particular, if an id has a strictness annotation of <...><...>b, then passing one argument to it will definitely bottom out, so the simplifier will throw away additional parameters. This conflicts with Call Arity! So we ensure that we never eta-expand such a value beyond the number of arguments mentioned in the strictness signature. See #10176 for a real-world-example. -} -- Main entry point callArityAnalProgram :: DynFlags -> CoreProgram -> CoreProgram callArityAnalProgram _dflags binds = binds' where (_, binds') = callArityTopLvl [] emptyVarSet binds -- See Note [Analysing top-level-binds] callArityTopLvl :: [Var] -> VarSet -> [CoreBind] -> (CallArityRes, [CoreBind]) callArityTopLvl exported _ [] = ( calledMultipleTimes $ (emptyUnVarGraph, mkVarEnv $ [(v, 0) | v <- exported]) , [] ) callArityTopLvl exported int1 (b:bs) = (ae2, b':bs') where int2 = bindersOf b exported' = filter isExportedId int2 ++ exported int' = int1 `addInterestingBinds` b (ae1, bs') = callArityTopLvl exported' int' bs ae1' = fakeBoringCalls int' b ae1 -- See Note [Information about boring variables] (ae2, b') = callArityBind ae1' int1 b callArityRHS :: CoreExpr -> CoreExpr callArityRHS = snd . callArityAnal 0 emptyVarSet -- The main analysis function. See Note [Analysis type signature] callArityAnal :: Arity -> -- The arity this expression is called with VarSet -> -- The set of interesting variables CoreExpr -> -- The expression to analyse (CallArityRes, CoreExpr) -- How this expression uses its interesting variables -- and the expression with IdInfo updated -- The trivial base cases callArityAnal _ _ e@(Lit _) = (emptyArityRes, e) callArityAnal _ _ e@(Type _) = (emptyArityRes, e) callArityAnal _ _ e@(Coercion _) = (emptyArityRes, e) -- The transparent cases callArityAnal arity int (Tick t e) = second (Tick t) $ callArityAnal arity int e callArityAnal arity int (Cast e co) = second (\e -> Cast e co) $ callArityAnal arity int e -- The interesting case: Variables, Lambdas, Lets, Applications, Cases callArityAnal arity int e@(Var v) | v `elemVarSet` int = (unitArityRes v arity, e) | otherwise = (emptyArityRes, e) -- Non-value lambdas are ignored callArityAnal arity int (Lam v e) | not (isId v) = second (Lam v) $ callArityAnal arity (int `delVarSet` v) e -- We have a lambda that may be called multiple times, so its free variables -- can all be co-called. callArityAnal 0 int (Lam v e) = (ae', Lam v e') where (ae, e') = callArityAnal 0 (int `delVarSet` v) e ae' = calledMultipleTimes ae -- We have a lambda that we are calling. decrease arity. callArityAnal arity int (Lam v e) = (ae, Lam v e') where (ae, e') = callArityAnal (arity - 1) (int `delVarSet` v) e -- Application. Increase arity for the called expresion, nothing to know about -- the second callArityAnal arity int (App e (Type t)) = second (\e -> App e (Type t)) $ callArityAnal arity int e callArityAnal arity int (App e1 e2) = (final_ae, App e1' e2') where (ae1, e1') = callArityAnal (arity + 1) int e1 (ae2, e2') = callArityAnal 0 int e2 -- See Note [Case and App: Which side to take?] final_ae = ae1 `both` ae2 -- Case expression. callArityAnal arity int (Case scrut bndr ty alts) = -- pprTrace "callArityAnal:Case" -- (vcat [ppr scrut, ppr final_ae]) (final_ae, Case scrut' bndr ty alts') where (alt_aes, alts') = unzip $ map go alts go (dc, bndrs, e) = let (ae, e') = callArityAnal arity int e in (ae, (dc, bndrs, e')) alt_ae = lubRess alt_aes (scrut_ae, scrut') = callArityAnal 0 int scrut -- See Note [Case and App: Which side to take?] final_ae = scrut_ae `both` alt_ae -- For lets, use callArityBind callArityAnal arity int (Let bind e) = -- pprTrace "callArityAnal:Let" -- (vcat [ppr v, ppr arity, ppr n, ppr final_ae ]) (final_ae, Let bind' e') where int_body = int `addInterestingBinds` bind (ae_body, e') = callArityAnal arity int_body e ae_body' = fakeBoringCalls int_body bind ae_body -- See Note [Information about boring variables] (final_ae, bind') = callArityBind ae_body' int bind -- Which bindings should we look at? -- See Note [Which variables are interesting] interestingBinds :: CoreBind -> [Var] interestingBinds = filter go . bindersOf where go v = 0 < length (typeArity (idType v)) addInterestingBinds :: VarSet -> CoreBind -> VarSet addInterestingBinds int bind = int `delVarSetList` bindersOf bind -- Possible shadowing `extendVarSetList` interestingBinds bind -- For every boring variable in the binder, add a safe approximation -- See Note [Information about boring variables] fakeBoringCalls :: VarSet -> CoreBind -> CallArityRes -> CallArityRes fakeBoringCalls int bind res = boring `both` res where boring = calledMultipleTimes $ ( emptyUnVarGraph , mkVarEnv [ (v, 0) | v <- bindersOf bind, not (v `elemVarSet` int)]) -- Used for both local and top-level binds -- First argument is the demand from the body callArityBind :: CallArityRes -> VarSet -> CoreBind -> (CallArityRes, CoreBind) -- Non-recursive let callArityBind ae_body int (NonRec v rhs) | otherwise = -- pprTrace "callArityBind:NonRec" -- (vcat [ppr v, ppr ae_body, ppr int, ppr ae_rhs, ppr safe_arity]) (final_ae, NonRec v' rhs') where is_thunk = not (exprIsHNF rhs) (arity, called_once) = lookupCallArityRes ae_body v safe_arity | called_once = arity | is_thunk = 0 -- A thunk! Do not eta-expand | otherwise = arity -- See Note [Trimming arity] trimmed_arity = trimArity v safe_arity (ae_rhs, rhs') = callArityAnal trimmed_arity int rhs ae_rhs'| called_once = ae_rhs | safe_arity == 0 = ae_rhs -- If it is not a function, its body is evaluated only once | otherwise = calledMultipleTimes ae_rhs final_ae = callArityNonRecEnv v ae_rhs' ae_body v' = v `setIdCallArity` trimmed_arity -- Recursive let. See Note [Recursion and fixpointing] callArityBind ae_body int b@(Rec binds) = -- pprTrace "callArityBind:Rec" -- (vcat [ppr (Rec binds'), ppr ae_body, ppr int, ppr ae_rhs]) $ (final_ae, Rec binds') where int_body = int `addInterestingBinds` b (ae_rhs, binds') = fix initial_binds final_ae = bindersOf b `resDelList` ae_rhs initial_binds = [(i,Nothing,e) | (i,e) <- binds] fix :: [(Id, Maybe (Bool, Arity, CallArityRes), CoreExpr)] -> (CallArityRes, [(Id, CoreExpr)]) fix ann_binds | -- pprTrace "callArityBind:fix" (vcat [ppr ann_binds, ppr any_change, ppr ae]) $ any_change = fix ann_binds' | otherwise = (ae, map (\(i, _, e) -> (i, e)) ann_binds') where aes_old = [ (i,ae) | (i, Just (_,_,ae), _) <- ann_binds ] ae = callArityRecEnv aes_old ae_body rerun (i, mbLastRun, rhs) | i `elemVarSet` int_body && not (i `elemUnVarSet` domRes ae) -- No call to this yet, so do nothing = (False, (i, Nothing, rhs)) | Just (old_called_once, old_arity, _) <- mbLastRun , called_once == old_called_once , new_arity == old_arity -- No change, no need to re-analize = (False, (i, mbLastRun, rhs)) | otherwise -- We previously analized this with a different arity (or not at all) = let is_thunk = not (exprIsHNF rhs) safe_arity | is_thunk = 0 -- See Note [Thunks in recursive groups] | otherwise = new_arity -- See Note [Trimming arity] trimmed_arity = trimArity i safe_arity (ae_rhs, rhs') = callArityAnal trimmed_arity int_body rhs ae_rhs' | called_once = ae_rhs | safe_arity == 0 = ae_rhs -- If it is not a function, its body is evaluated only once | otherwise = calledMultipleTimes ae_rhs in (True, (i `setIdCallArity` trimmed_arity, Just (called_once, new_arity, ae_rhs'), rhs')) where (new_arity, called_once) = lookupCallArityRes ae i (changes, ann_binds') = unzip $ map rerun ann_binds any_change = or changes -- See Note [Trimming arity] trimArity :: Id -> Arity -> Arity trimArity v a = minimum [a, max_arity_by_type, max_arity_by_strsig] where max_arity_by_type = length (typeArity (idType v)) max_arity_by_strsig | isBotRes result_info = length demands | otherwise = a (demands, result_info) = splitStrictSig (idStrictness v) -- Combining the results from body and rhs, non-recursive case -- See Note [Analysis II: The Co-Called analysis] callArityNonRecEnv :: Var -> CallArityRes -> CallArityRes -> CallArityRes callArityNonRecEnv v ae_rhs ae_body = addCrossCoCalls called_by_v called_with_v $ ae_rhs `lubRes` resDel v ae_body where called_by_v = domRes ae_rhs called_with_v = calledWith ae_body v `delUnVarSet` v -- Combining the results from body and rhs, (mutually) recursive case -- See Note [Analysis II: The Co-Called analysis] callArityRecEnv :: [(Var, CallArityRes)] -> CallArityRes -> CallArityRes callArityRecEnv ae_rhss ae_body = -- pprTrace "callArityRecEnv" (vcat [ppr ae_rhss, ppr ae_body, ppr ae_new]) ae_new where vars = map fst ae_rhss ae_combined = lubRess (map snd ae_rhss) `lubRes` ae_body cross_calls = unionUnVarGraphs $ map cross_call ae_rhss cross_call (v, ae_rhs) = completeBipartiteGraph called_by_v called_with_v where is_thunk = idCallArity v == 0 -- What rhs are relevant as happening before (or after) calling v? -- If v is a thunk, everything from all the _other_ variables -- If v is not a thunk, everything can happen. ae_before_v | is_thunk = lubRess (map snd $ filter ((/= v) . fst) ae_rhss) `lubRes` ae_body | otherwise = ae_combined -- What do we want to know from these? -- Which calls can happen next to any recursive call. called_with_v = unionUnVarSets $ map (calledWith ae_before_v) vars called_by_v = domRes ae_rhs ae_new = first (cross_calls `unionUnVarGraph`) ae_combined --------------------------------------- -- Functions related to CallArityRes -- --------------------------------------- -- Result type for the two analyses. -- See Note [Analysis I: The arity analyis] -- and Note [Analysis II: The Co-Called analysis] type CallArityRes = (UnVarGraph, VarEnv Arity) emptyArityRes :: CallArityRes emptyArityRes = (emptyUnVarGraph, emptyVarEnv) unitArityRes :: Var -> Arity -> CallArityRes unitArityRes v arity = (emptyUnVarGraph, unitVarEnv v arity) resDelList :: [Var] -> CallArityRes -> CallArityRes resDelList vs ae = foldr resDel ae vs resDel :: Var -> CallArityRes -> CallArityRes resDel v (g, ae) = (g `delNode` v, ae `delVarEnv` v) domRes :: CallArityRes -> UnVarSet domRes (_, ae) = varEnvDom ae -- In the result, find out the minimum arity and whether the variable is called -- at most once. lookupCallArityRes :: CallArityRes -> Var -> (Arity, Bool) lookupCallArityRes (g, ae) v = case lookupVarEnv ae v of Just a -> (a, not (v `elemUnVarSet` (neighbors g v))) Nothing -> (0, False) calledWith :: CallArityRes -> Var -> UnVarSet calledWith (g, _) v = neighbors g v addCrossCoCalls :: UnVarSet -> UnVarSet -> CallArityRes -> CallArityRes addCrossCoCalls set1 set2 = first (completeBipartiteGraph set1 set2 `unionUnVarGraph`) -- Replaces the co-call graph by a complete graph (i.e. no information) calledMultipleTimes :: CallArityRes -> CallArityRes calledMultipleTimes res = first (const (completeGraph (domRes res))) res -- Used for application and cases both :: CallArityRes -> CallArityRes -> CallArityRes both r1 r2 = addCrossCoCalls (domRes r1) (domRes r2) $ r1 `lubRes` r2 -- Used when combining results from alternative cases; take the minimum lubRes :: CallArityRes -> CallArityRes -> CallArityRes lubRes (g1, ae1) (g2, ae2) = (g1 `unionUnVarGraph` g2, ae1 `lubArityEnv` ae2) lubArityEnv :: VarEnv Arity -> VarEnv Arity -> VarEnv Arity lubArityEnv = plusVarEnv_C min lubRess :: [CallArityRes] -> CallArityRes lubRess = foldl lubRes emptyArityRes