{-# LANGUAGE CPP #-} module TcInteract ( solveSimpleGivens, -- Solves [EvVar],GivenLoc solveSimpleWanteds -- Solves Cts ) where #include "HsVersions.h" import BasicTypes () import TcCanonical import TcFlatten import VarSet import Type import Kind (isKind) import Unify import InstEnv( lookupInstEnv, instanceDFunId ) import CoAxiom(sfInteractTop, sfInteractInert) import Var import TcType import PrelNames ( knownNatClassName, knownSymbolClassName, ipClassNameKey , typeableClassName ) import Id( idType ) import Class import TyCon import FunDeps import FamInst import Inst( tyVarsOfCt ) import TcEvidence import Outputable import TcRnTypes import TcErrors import TcSMonad import Bag import Data.List( partition, foldl', deleteFirstsBy ) import VarEnv import Control.Monad import Pair (Pair(..)) import Unique( hasKey ) import FastString ( sLit ) import DynFlags import Util {- ********************************************************************** * * * Main Interaction Solver * * * ********************************************************************** Note [Basic Simplifier Plan] ~~~~~~~~~~~~~~~~~~~~~~~~~~~~ 1. Pick an element from the WorkList if there exists one with depth less than our context-stack depth. 2. Run it down the 'stage' pipeline. Stages are: - canonicalization - inert reactions - spontaneous reactions - top-level intreactions Each stage returns a StopOrContinue and may have sideffected the inerts or worklist. The threading of the stages is as follows: - If (Stop) is returned by a stage then we start again from Step 1. - If (ContinueWith ct) is returned by a stage, we feed 'ct' on to the next stage in the pipeline. 4. If the element has survived (i.e. ContinueWith x) the last stage then we add him in the inerts and jump back to Step 1. If in Step 1 no such element exists, we have exceeded our context-stack depth and will simply fail. Note [Unflatten after solving the simple wanteds] ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~ We unflatten after solving the wc_simples of an implication, and before attempting to float. This means that * The fsk/fmv flatten-skolems only survive during solveSimples. We don't need to worry about then across successive passes over the constraint tree. (E.g. we don't need the old ic_fsk field of an implication. * When floating an equality outwards, we don't need to worry about floating its associated flattening constraints. * Another tricky case becomes easy: Trac #4935 type instance F True a b = a type instance F False a b = b [w] F c a b ~ gamma (c ~ True) => a ~ gamma (c ~ False) => b ~ gamma Obviously this is soluble with gamma := F c a b, and unflattening will do exactly that after solving the simple constraints and before attempting the implications. Before, when we were not unflattening, we had to push Wanted funeqs in as new givens. Yuk! Another example that becomes easy: indexed_types/should_fail/T7786 [W] BuriedUnder sub k Empty ~ fsk [W] Intersect fsk inv ~ s [w] xxx[1] ~ s [W] forall[2] . (xxx[1] ~ Empty) => Intersect (BuriedUnder sub k Empty) inv ~ Empty Note [Running plugins on unflattened wanteds] ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~ There is an annoying mismatch between solveSimpleGivens and solveSimpleWanteds, because the latter needs to fiddle with the inert set, unflatten and and zonk the wanteds. It passes the zonked wanteds to runTcPluginsWanteds, which produces a replacement set of wanteds, some additional insolubles and a flag indicating whether to go round the loop again. If so, prepareInertsForImplications is used to remove the previous wanteds (which will still be in the inert set). Note that prepareInertsForImplications will discard the insolubles, so we must keep track of them separately. -} solveSimpleGivens :: CtLoc -> [EvVar] -> TcS () solveSimpleGivens loc givens | null givens -- Shortcut for common case = return () | otherwise = go (map mk_given_ct givens) where mk_given_ct ev_id = mkNonCanonical (CtGiven { ctev_evtm = EvId ev_id , ctev_pred = evVarPred ev_id , ctev_loc = loc }) go givens = do { solveSimples (listToBag givens) ; new_givens <- runTcPluginsGiven ; when (notNull new_givens) (go new_givens) } solveSimpleWanteds :: Cts -> TcS WantedConstraints solveSimpleWanteds = go emptyBag where go insols0 wanteds = do { solveSimples wanteds ; (implics, tv_eqs, fun_eqs, insols, others) <- getUnsolvedInerts ; unflattened_eqs <- unflatten tv_eqs fun_eqs -- See Note [Unflatten after solving the simple wanteds] ; zonked <- zonkSimples (others `andCts` unflattened_eqs) -- Postcondition is that the wl_simples are zonked ; (wanteds', insols', rerun) <- runTcPluginsWanted zonked -- See Note [Running plugins on unflattened wanteds] ; let all_insols = insols0 `unionBags` insols `unionBags` insols' ; if rerun then do { updInertTcS prepareInertsForImplications ; go all_insols wanteds' } else return (WC { wc_simple = wanteds' , wc_insol = all_insols , wc_impl = implics }) } -- The main solver loop implements Note [Basic Simplifier Plan] --------------------------------------------------------------- solveSimples :: Cts -> TcS () -- Returns the final InertSet in TcS -- Has no effect on work-list or residual-iplications -- The constraints are initially examined in left-to-right order solveSimples cts = {-# SCC "solveSimples" #-} do { dyn_flags <- getDynFlags ; updWorkListTcS (\wl -> foldrBag extendWorkListCt wl cts) ; solve_loop (maxSubGoalDepth dyn_flags) } where solve_loop max_depth = {-# SCC "solve_loop" #-} do { sel <- selectNextWorkItem max_depth ; case sel of NoWorkRemaining -- Done, successfuly (modulo frozen) -> return () MaxDepthExceeded cnt ct -- Failure, depth exceeded -> wrapErrTcS $ solverDepthErrorTcS cnt (ctEvidence ct) NextWorkItem ct -- More work, loop around! -> do { runSolverPipeline thePipeline ct; solve_loop max_depth } } -- | Extract the (inert) givens and invoke the plugins on them. -- Remove solved givens from the inert set and emit insolubles, but -- return new work produced so that 'solveSimpleGivens' can feed it back -- into the main solver. runTcPluginsGiven :: TcS [Ct] runTcPluginsGiven = do (givens,_,_) <- fmap splitInertCans getInertCans if null givens then return [] else do p <- runTcPlugins (givens,[],[]) let (solved_givens, _, _) = pluginSolvedCts p updInertCans (removeInertCts solved_givens) mapM_ emitInsoluble (pluginBadCts p) return (pluginNewCts p) -- | Given a bag of (flattened, zonked) wanteds, invoke the plugins on -- them and produce an updated bag of wanteds (possibly with some new -- work) and a bag of insolubles. The boolean indicates whether -- 'solveSimpleWanteds' should feed the updated wanteds back into the -- main solver. runTcPluginsWanted :: Cts -> TcS (Cts, Cts, Bool) runTcPluginsWanted zonked_wanteds | isEmptyBag zonked_wanteds = return (zonked_wanteds, emptyBag, False) | otherwise = do (given,derived,_) <- fmap splitInertCans getInertCans p <- runTcPlugins (given, derived, bagToList zonked_wanteds) let (solved_givens, solved_deriveds, solved_wanteds) = pluginSolvedCts p (_, _, wanteds) = pluginInputCts p updInertCans (removeInertCts $ solved_givens ++ solved_deriveds) mapM_ setEv solved_wanteds return ( listToBag $ pluginNewCts p ++ wanteds , listToBag $ pluginBadCts p , notNull (pluginNewCts p) ) where setEv :: (EvTerm,Ct) -> TcS () setEv (ev,ct) = case ctEvidence ct of CtWanted {ctev_evar = evar} -> setEvBind evar ev _ -> panic "runTcPluginsWanted.setEv: attempt to solve non-wanted!" -- | A triple of (given, derived, wanted) constraints to pass to plugins type SplitCts = ([Ct], [Ct], [Ct]) -- | A solved triple of constraints, with evidence for wanteds type SolvedCts = ([Ct], [Ct], [(EvTerm,Ct)]) -- | Represents collections of constraints generated by typechecker -- plugins data TcPluginProgress = TcPluginProgress { pluginInputCts :: SplitCts -- ^ Original inputs to the plugins with solved/bad constraints -- removed, but otherwise unmodified , pluginSolvedCts :: SolvedCts -- ^ Constraints solved by plugins , pluginBadCts :: [Ct] -- ^ Constraints reported as insoluble by plugins , pluginNewCts :: [Ct] -- ^ New constraints emitted by plugins } -- | Starting from a triple of (given, derived, wanted) constraints, -- invoke each of the typechecker plugins in turn and return -- -- * the remaining unmodified constraints, -- * constraints that have been solved, -- * constraints that are insoluble, and -- * new work. -- -- Note that new work generated by one plugin will not be seen by -- other plugins on this pass (but the main constraint solver will be -- re-invoked and they will see it later). There is no check that new -- work differs from the original constraints supplied to the plugin: -- the plugin itself should perform this check if necessary. runTcPlugins :: SplitCts -> TcS TcPluginProgress runTcPlugins all_cts = do gblEnv <- getGblEnv foldM do_plugin initialProgress (tcg_tc_plugins gblEnv) where do_plugin :: TcPluginProgress -> TcPluginSolver -> TcS TcPluginProgress do_plugin p solver = do result <- runTcPluginTcS (uncurry3 solver (pluginInputCts p)) return $ progress p result progress :: TcPluginProgress -> TcPluginResult -> TcPluginProgress progress p (TcPluginContradiction bad_cts) = p { pluginInputCts = discard bad_cts (pluginInputCts p) , pluginBadCts = bad_cts ++ pluginBadCts p } progress p (TcPluginOk solved_cts new_cts) = p { pluginInputCts = discard (map snd solved_cts) (pluginInputCts p) , pluginSolvedCts = add solved_cts (pluginSolvedCts p) , pluginNewCts = new_cts ++ pluginNewCts p } initialProgress = TcPluginProgress all_cts ([], [], []) [] [] discard :: [Ct] -> SplitCts -> SplitCts discard cts (xs, ys, zs) = (xs `without` cts, ys `without` cts, zs `without` cts) without :: [Ct] -> [Ct] -> [Ct] without = deleteFirstsBy eqCt eqCt :: Ct -> Ct -> Bool eqCt c c' = case (ctEvidence c, ctEvidence c') of (CtGiven pred _ _, CtGiven pred' _ _) -> pred `eqType` pred' (CtWanted pred _ _, CtWanted pred' _ _) -> pred `eqType` pred' (CtDerived pred _ , CtDerived pred' _ ) -> pred `eqType` pred' (_ , _ ) -> False add :: [(EvTerm,Ct)] -> SolvedCts -> SolvedCts add xs scs = foldl' addOne scs xs addOne :: SolvedCts -> (EvTerm,Ct) -> SolvedCts addOne (givens, deriveds, wanteds) (ev,ct) = case ctEvidence ct of CtGiven {} -> (ct:givens, deriveds, wanteds) CtDerived{} -> (givens, ct:deriveds, wanteds) CtWanted {} -> (givens, deriveds, (ev,ct):wanteds) type WorkItem = Ct type SimplifierStage = WorkItem -> TcS (StopOrContinue Ct) data SelectWorkItem = NoWorkRemaining -- No more work left (effectively we're done!) | MaxDepthExceeded SubGoalCounter Ct -- More work left to do but this constraint has exceeded -- the maximum depth for one of the subgoal counters and we -- must stop | NextWorkItem Ct -- More work left, here's the next item to look at selectNextWorkItem :: SubGoalDepth -- Max depth allowed -> TcS SelectWorkItem selectNextWorkItem max_depth = updWorkListTcS_return pick_next where pick_next :: WorkList -> (SelectWorkItem, WorkList) pick_next wl = case selectWorkItem wl of (Nothing,_) -> (NoWorkRemaining,wl) -- No more work (Just ct, new_wl) | Just cnt <- subGoalDepthExceeded max_depth (ctLocDepth (ctLoc ct)) -- Depth exceeded -> (MaxDepthExceeded cnt ct,new_wl) (Just ct, new_wl) -> (NextWorkItem ct, new_wl) -- New workitem and worklist runSolverPipeline :: [(String,SimplifierStage)] -- The pipeline -> WorkItem -- The work item -> TcS () -- Run this item down the pipeline, leaving behind new work and inerts runSolverPipeline pipeline workItem = do { initial_is <- getTcSInerts ; traceTcS "Start solver pipeline {" $ vcat [ ptext (sLit "work item = ") <+> ppr workItem , ptext (sLit "inerts = ") <+> ppr initial_is] ; bumpStepCountTcS -- One step for each constraint processed ; final_res <- run_pipeline pipeline (ContinueWith workItem) ; final_is <- getTcSInerts ; case final_res of Stop ev s -> do { traceFireTcS ev s ; traceTcS "End solver pipeline (discharged) }" (ptext (sLit "inerts =") <+> ppr final_is) ; return () } ContinueWith ct -> do { traceFireTcS (ctEvidence ct) (ptext (sLit "Kept as inert")) ; traceTcS "End solver pipeline (not discharged) }" $ vcat [ ptext (sLit "final_item =") <+> ppr ct , pprTvBndrs (varSetElems $ tyVarsOfCt ct) , ptext (sLit "inerts =") <+> ppr final_is] ; insertInertItemTcS ct } } where run_pipeline :: [(String,SimplifierStage)] -> StopOrContinue Ct -> TcS (StopOrContinue Ct) run_pipeline [] res = return res run_pipeline _ (Stop ev s) = return (Stop ev s) run_pipeline ((stg_name,stg):stgs) (ContinueWith ct) = do { traceTcS ("runStage " ++ stg_name ++ " {") (text "workitem = " <+> ppr ct) ; res <- stg ct ; traceTcS ("end stage " ++ stg_name ++ " }") empty ; run_pipeline stgs res } {- Example 1: Inert: {c ~ d, F a ~ t, b ~ Int, a ~ ty} (all given) Reagent: a ~ [b] (given) React with (c~d) ==> IR (ContinueWith (a~[b])) True [] React with (F a ~ t) ==> IR (ContinueWith (a~[b])) False [F [b] ~ t] React with (b ~ Int) ==> IR (ContinueWith (a~[Int]) True [] Example 2: Inert: {c ~w d, F a ~g t, b ~w Int, a ~w ty} Reagent: a ~w [b] React with (c ~w d) ==> IR (ContinueWith (a~[b])) True [] React with (F a ~g t) ==> IR (ContinueWith (a~[b])) True [] (can't rewrite given with wanted!) etc. Example 3: Inert: {a ~ Int, F Int ~ b} (given) Reagent: F a ~ b (wanted) React with (a ~ Int) ==> IR (ContinueWith (F Int ~ b)) True [] React with (F Int ~ b) ==> IR Stop True [] -- after substituting we re-canonicalize and get nothing -} thePipeline :: [(String,SimplifierStage)] thePipeline = [ ("canonicalization", TcCanonical.canonicalize) , ("interact with inerts", interactWithInertsStage) , ("top-level reactions", topReactionsStage) ] {- ********************************************************************************* * * The interact-with-inert Stage * * ********************************************************************************* Note [The Solver Invariant] ~~~~~~~~~~~~~~~~~~~~~~~~~~~ We always add Givens first. So you might think that the solver has the invariant If the work-item is Given, then the inert item must Given But this isn't quite true. Suppose we have, c1: [W] beta ~ [alpha], c2 : [W] blah, c3 :[W] alpha ~ Int After processing the first two, we get c1: [G] beta ~ [alpha], c2 : [W] blah Now, c3 does not interact with the the given c1, so when we spontaneously solve c3, we must re-react it with the inert set. So we can attempt a reaction between inert c2 [W] and work-item c3 [G]. It *is* true that [Solver Invariant] If the work-item is Given, AND there is a reaction then the inert item must Given or, equivalently, If the work-item is Given, and the inert item is Wanted/Derived then there is no reaction -} -- Interaction result of WorkItem <~> Ct type StopNowFlag = Bool -- True <=> stop after this interaction interactWithInertsStage :: WorkItem -> TcS (StopOrContinue Ct) -- Precondition: if the workitem is a CTyEqCan then it will not be able to -- react with anything at this stage. interactWithInertsStage wi = do { inerts <- getTcSInerts ; let ics = inert_cans inerts ; case wi of CTyEqCan {} -> interactTyVarEq ics wi CFunEqCan {} -> interactFunEq ics wi CIrredEvCan {} -> interactIrred ics wi CDictCan {} -> interactDict ics wi _ -> pprPanic "interactWithInerts" (ppr wi) } -- CHoleCan are put straight into inert_frozen, so never get here -- CNonCanonical have been canonicalised data InteractResult = IRKeep | IRReplace | IRDelete instance Outputable InteractResult where ppr IRKeep = ptext (sLit "keep") ppr IRReplace = ptext (sLit "replace") ppr IRDelete = ptext (sLit "delete") solveOneFromTheOther :: CtEvidence -- Inert -> CtEvidence -- WorkItem -> TcS (InteractResult, StopNowFlag) -- Preconditions: -- 1) inert and work item represent evidence for the /same/ predicate -- 2) ip/class/irred evidence (no coercions) only solveOneFromTheOther ev_i ev_w | isDerived ev_w = return (IRKeep, True) | isDerived ev_i -- The inert item is Derived, we can just throw it away, -- The ev_w is inert wrt earlier inert-set items, -- so it's safe to continue on from this point = return (IRDelete, False) | CtWanted { ctev_evar = ev_id } <- ev_w = do { setEvBind ev_id (ctEvTerm ev_i) ; return (IRKeep, True) } | CtWanted { ctev_evar = ev_id } <- ev_i = do { setEvBind ev_id (ctEvTerm ev_w) ; return (IRReplace, True) } | otherwise -- If both are Given, we already have evidence; no need to duplicate -- But the work item *overrides* the inert item (hence IRReplace) -- See Note [Shadowing of Implicit Parameters] = return (IRReplace, True) {- ********************************************************************************* * * interactIrred * * ********************************************************************************* -} -- Two pieces of irreducible evidence: if their types are *exactly identical* -- we can rewrite them. We can never improve using this: -- if we want ty1 :: Constraint and have ty2 :: Constraint it clearly does not -- mean that (ty1 ~ ty2) interactIrred :: InertCans -> Ct -> TcS (StopOrContinue Ct) interactIrred inerts workItem@(CIrredEvCan { cc_ev = ev_w }) | let pred = ctEvPred ev_w (matching_irreds, others) = partitionBag (\ct -> ctPred ct `tcEqType` pred) (inert_irreds inerts) , (ct_i : rest) <- bagToList matching_irreds , let ctev_i = ctEvidence ct_i = ASSERT( null rest ) do { (inert_effect, stop_now) <- solveOneFromTheOther ctev_i ev_w ; case inert_effect of IRKeep -> return () IRDelete -> updInertIrreds (\_ -> others) IRReplace -> updInertIrreds (\_ -> others `snocCts` workItem) -- These const upd's assume that solveOneFromTheOther -- has no side effects on InertCans ; if stop_now then return (Stop ev_w (ptext (sLit "Irred equal") <+> parens (ppr inert_effect))) ; else continueWith workItem } | otherwise = continueWith workItem interactIrred _ wi = pprPanic "interactIrred" (ppr wi) {- ********************************************************************************* * * interactDict * * ********************************************************************************* -} interactDict :: InertCans -> Ct -> TcS (StopOrContinue Ct) interactDict inerts workItem@(CDictCan { cc_ev = ev_w, cc_class = cls, cc_tyargs = tys }) | Just ctev_i <- lookupInertDict inerts (ctEvLoc ev_w) cls tys = do { (inert_effect, stop_now) <- solveOneFromTheOther ctev_i ev_w ; case inert_effect of IRKeep -> return () IRDelete -> updInertDicts $ \ ds -> delDict ds cls tys IRReplace -> updInertDicts $ \ ds -> addDict ds cls tys workItem ; if stop_now then return (Stop ev_w (ptext (sLit "Dict equal") <+> parens (ppr inert_effect))) else continueWith workItem } | cls `hasKey` ipClassNameKey , isGiven ev_w = interactGivenIP inerts workItem | otherwise = do { mapBagM_ (addFunDepWork workItem) (findDictsByClass (inert_dicts inerts) cls) -- Standard thing: create derived fds and keep on going. Importantly we don't -- throw workitem back in the worklist because this can cause loops (see #5236) ; continueWith workItem } interactDict _ wi = pprPanic "interactDict" (ppr wi) interactGivenIP :: InertCans -> Ct -> TcS (StopOrContinue Ct) -- Work item is Given (?x:ty) -- See Note [Shadowing of Implicit Parameters] interactGivenIP inerts workItem@(CDictCan { cc_ev = ev, cc_class = cls , cc_tyargs = tys@(ip_str:_) }) = do { updInertCans $ \cans -> cans { inert_dicts = addDict filtered_dicts cls tys workItem } ; stopWith ev "Given IP" } where dicts = inert_dicts inerts ip_dicts = findDictsByClass dicts cls other_ip_dicts = filterBag (not . is_this_ip) ip_dicts filtered_dicts = addDictsByClass dicts cls other_ip_dicts -- Pick out any Given constraints for the same implicit parameter is_this_ip (CDictCan { cc_ev = ev, cc_tyargs = ip_str':_ }) = isGiven ev && ip_str `tcEqType` ip_str' is_this_ip _ = False interactGivenIP _ wi = pprPanic "interactGivenIP" (ppr wi) addFunDepWork :: Ct -> Ct -> TcS () addFunDepWork work_ct inert_ct = do { let fd_eqns :: [Equation CtLoc] fd_eqns = [ eqn { fd_loc = derived_loc } | eqn <- improveFromAnother inert_pred work_pred ] ; rewriteWithFunDeps fd_eqns -- We don't really rewrite tys2, see below _rewritten_tys2, so that's ok -- NB: We do create FDs for given to report insoluble equations that arise -- from pairs of Givens, and also because of floating when we approximate -- implications. The relevant test is: typecheck/should_fail/FDsFromGivens.hs -- Also see Note [When improvement happens] } where work_pred = ctPred work_ct inert_pred = ctPred inert_ct work_loc = ctLoc work_ct inert_loc = ctLoc inert_ct derived_loc = work_loc { ctl_origin = FunDepOrigin1 work_pred work_loc inert_pred inert_loc } {- Note [Shadowing of Implicit Parameters] ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~ Consider the following example: f :: (?x :: Char) => Char f = let ?x = 'a' in ?x The "let ?x = ..." generates an implication constraint of the form: ?x :: Char => ?x :: Char Furthermore, the signature for `f` also generates an implication constraint, so we end up with the following nested implication: ?x :: Char => (?x :: Char => ?x :: Char) Note that the wanted (?x :: Char) constraint may be solved in two incompatible ways: either by using the parameter from the signature, or by using the local definition. Our intention is that the local definition should "shadow" the parameter of the signature, and we implement this as follows: when we add a new *given* implicit parameter to the inert set, it replaces any existing givens for the same implicit parameter. This works for the normal cases but it has an odd side effect in some pathological programs like this: -- This is accepted, the second parameter shadows f1 :: (?x :: Int, ?x :: Char) => Char f1 = ?x -- This is rejected, the second parameter shadows f2 :: (?x :: Int, ?x :: Char) => Int f2 = ?x Both of these are actually wrong: when we try to use either one, we'll get two incompatible wnated constraints (?x :: Int, ?x :: Char), which would lead to an error. I can think of two ways to fix this: 1. Simply disallow multiple constratits for the same implicit parameter---this is never useful, and it can be detected completely syntactically. 2. Move the shadowing machinery to the location where we nest implications, and add some code here that will produce an error if we get multiple givens for the same implicit parameter. ********************************************************************************* * * interactFunEq * * ********************************************************************************* -} interactFunEq :: InertCans -> Ct -> TcS (StopOrContinue Ct) -- Try interacting the work item with the inert set interactFunEq inerts workItem@(CFunEqCan { cc_ev = ev, cc_fun = tc , cc_tyargs = args, cc_fsk = fsk }) | Just (CFunEqCan { cc_ev = ev_i, cc_fsk = fsk_i }) <- matching_inerts = if ev_i `canRewriteOrSame` ev then -- Rewrite work-item using inert do { traceTcS "reactFunEq (discharge work item):" $ vcat [ text "workItem =" <+> ppr workItem , text "inertItem=" <+> ppr ev_i ] ; reactFunEq ev_i fsk_i ev fsk ; stopWith ev "Inert rewrites work item" } else -- Rewrite intert using work-item do { traceTcS "reactFunEq (rewrite inert item):" $ vcat [ text "workItem =" <+> ppr workItem , text "inertItem=" <+> ppr ev_i ] ; updInertFunEqs $ \ feqs -> insertFunEq feqs tc args workItem -- Do the updInertFunEqs before the reactFunEq, so that -- we don't kick out the inertItem as well as consuming it! ; reactFunEq ev fsk ev_i fsk_i ; stopWith ev "Work item rewrites inert" } | Just ops <- isBuiltInSynFamTyCon_maybe tc = do { let matching_funeqs = findFunEqsByTyCon funeqs tc ; let interact = sfInteractInert ops args (lookupFlattenTyVar eqs fsk) do_one (CFunEqCan { cc_tyargs = iargs, cc_fsk = ifsk, cc_ev = iev }) = mapM_ (unifyDerived (ctEvLoc iev) Nominal) (interact iargs (lookupFlattenTyVar eqs ifsk)) do_one ct = pprPanic "interactFunEq" (ppr ct) ; mapM_ do_one matching_funeqs ; traceTcS "builtInCandidates 1: " $ vcat [ ptext (sLit "Candidates:") <+> ppr matching_funeqs , ptext (sLit "TvEqs:") <+> ppr eqs ] ; return (ContinueWith workItem) } | otherwise = return (ContinueWith workItem) where eqs = inert_eqs inerts funeqs = inert_funeqs inerts matching_inerts = findFunEqs funeqs tc args interactFunEq _ wi = pprPanic "interactFunEq" (ppr wi) lookupFlattenTyVar :: TyVarEnv EqualCtList -> TcTyVar -> TcType -- ^ Look up a flatten-tyvar in the inert nominal TyVarEqs; -- this is used only when dealing with a CFunEqCan lookupFlattenTyVar inert_eqs ftv = case lookupVarEnv inert_eqs ftv of Just (CTyEqCan { cc_rhs = rhs, cc_eq_rel = NomEq } : _) -> rhs _ -> mkTyVarTy ftv reactFunEq :: CtEvidence -> TcTyVar -- From this :: F tys ~ fsk1 -> CtEvidence -> TcTyVar -- Solve this :: F tys ~ fsk2 -> TcS () reactFunEq from_this fsk1 (CtGiven { ctev_evtm = tm, ctev_loc = loc }) fsk2 = do { let fsk_eq_co = mkTcSymCo (evTermCoercion tm) `mkTcTransCo` ctEvCoercion from_this -- :: fsk2 ~ fsk1 fsk_eq_pred = mkTcEqPred (mkTyVarTy fsk2) (mkTyVarTy fsk1) ; new_ev <- newGivenEvVar loc (fsk_eq_pred, EvCoercion fsk_eq_co) ; emitWorkNC [new_ev] } reactFunEq from_this fuv1 (CtWanted { ctev_evar = evar }) fuv2 = dischargeFmv evar fuv2 (ctEvCoercion from_this) (mkTyVarTy fuv1) reactFunEq _ _ solve_this@(CtDerived {}) _ = pprPanic "reactFunEq" (ppr solve_this) {- Note [Cache-caused loops] ~~~~~~~~~~~~~~~~~~~~~~~~~ It is very dangerous to cache a rewritten wanted family equation as 'solved' in our solved cache (which is the default behaviour or xCtEvidence), because the interaction may not be contributing towards a solution. Here is an example: Initial inert set: [W] g1 : F a ~ beta1 Work item: [W] g2 : F a ~ beta2 The work item will react with the inert yielding the _same_ inert set plus: i) Will set g2 := g1 `cast` g3 ii) Will add to our solved cache that [S] g2 : F a ~ beta2 iii) Will emit [W] g3 : beta1 ~ beta2 Now, the g3 work item will be spontaneously solved to [G] g3 : beta1 ~ beta2 and then it will react the item in the inert ([W] g1 : F a ~ beta1). So it will set g1 := g ; sym g3 and what is g? Well it would ideally be a new goal of type (F a ~ beta2) but remember that we have this in our solved cache, and it is ... g2! In short we created the evidence loop: g2 := g1 ; g3 g3 := refl g1 := g2 ; sym g3 To avoid this situation we do not cache as solved any workitems (or inert) which did not really made a 'step' towards proving some goal. Solved's are just an optimization so we don't lose anything in terms of completeness of solving. Note [Efficient Orientation] ~~~~~~~~~~~~~~~~~~~~~~~~~~~~ Suppose we are interacting two FunEqCans with the same LHS: (inert) ci :: (F ty ~ xi_i) (work) cw :: (F ty ~ xi_w) We prefer to keep the inert (else we pass the work item on down the pipeline, which is a bit silly). If we keep the inert, we will (a) discharge 'cw' (b) produce a new equality work-item (xi_w ~ xi_i) Notice the orientation (xi_w ~ xi_i) NOT (xi_i ~ xi_w): new_work :: xi_w ~ xi_i cw := ci ; sym new_work Why? Consider the simplest case when xi1 is a type variable. If we generate xi1~xi2, porcessing that constraint will kick out 'ci'. If we generate xi2~xi1, there is less chance of that happening. Of course it can and should still happen if xi1=a, xi1=Int, say. But we want to avoid it happening needlessly. Similarly, if we *can't* keep the inert item (because inert is Wanted, and work is Given, say), we prefer to orient the new equality (xi_i ~ xi_w). Note [Carefully solve the right CFunEqCan] ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~ ---- OLD COMMENT, NOW NOT NEEDED ---- because we now allow multiple ---- wanted FunEqs with the same head Consider the constraints c1 :: F Int ~ a -- Arising from an application line 5 c2 :: F Int ~ Bool -- Arising from an application line 10 Suppose that 'a' is a unification variable, arising only from flattening. So there is no error on line 5; it's just a flattening variable. But there is (or might be) an error on line 10. Two ways to combine them, leaving either (Plan A) c1 :: F Int ~ a -- Arising from an application line 5 c3 :: a ~ Bool -- Arising from an application line 10 or (Plan B) c2 :: F Int ~ Bool -- Arising from an application line 10 c4 :: a ~ Bool -- Arising from an application line 5 Plan A will unify c3, leaving c1 :: F Int ~ Bool as an error on the *totally innocent* line 5. An example is test SimpleFail16 where the expected/actual message comes out backwards if we use the wrong plan. The second is the right thing to do. Hence the isMetaTyVarTy test when solving pairwise CFunEqCan. ********************************************************************************* * * interactTyVarEq * * ********************************************************************************* -} interactTyVarEq :: InertCans -> Ct -> TcS (StopOrContinue Ct) -- CTyEqCans are always consumed, so always returns Stop interactTyVarEq inerts workItem@(CTyEqCan { cc_tyvar = tv , cc_rhs = rhs , cc_ev = ev , cc_eq_rel = eq_rel }) | (ev_i : _) <- [ ev_i | CTyEqCan { cc_ev = ev_i, cc_rhs = rhs_i } <- findTyEqs inerts tv , ev_i `canRewriteOrSame` ev , rhs_i `tcEqType` rhs ] = -- Inert: a ~ b -- Work item: a ~ b do { when (isWanted ev) $ setEvBind (ctev_evar ev) (ctEvTerm ev_i) ; stopWith ev "Solved from inert" } | Just tv_rhs <- getTyVar_maybe rhs , (ev_i : _) <- [ ev_i | CTyEqCan { cc_ev = ev_i, cc_rhs = rhs_i } <- findTyEqs inerts tv_rhs , ev_i `canRewriteOrSame` ev , rhs_i `tcEqType` mkTyVarTy tv ] = -- Inert: a ~ b -- Work item: b ~ a do { when (isWanted ev) $ setEvBind (ctev_evar ev) (EvCoercion (mkTcSymCo (ctEvCoercion ev_i))) ; stopWith ev "Solved from inert (r)" } | otherwise = do { tclvl <- getTcLevel ; if canSolveByUnification tclvl ev eq_rel tv rhs then do { solveByUnification ev tv rhs ; n_kicked <- kickOutRewritable Given NomEq tv -- Given because the tv := xi is given -- NomEq because only nom. equalities are solved -- by unification ; return (Stop ev (ptext (sLit "Spontaneously solved") <+> ppr_kicked n_kicked)) } else do { traceTcS "Can't solve tyvar equality" (vcat [ text "LHS:" <+> ppr tv <+> dcolon <+> ppr (tyVarKind tv) , ppWhen (isMetaTyVar tv) $ nest 4 (text "TcLevel of" <+> ppr tv <+> text "is" <+> ppr (metaTyVarTcLevel tv)) , text "RHS:" <+> ppr rhs <+> dcolon <+> ppr (typeKind rhs) , text "TcLevel =" <+> ppr tclvl ]) ; n_kicked <- kickOutRewritable (ctEvFlavour ev) (ctEvEqRel ev) tv ; updInertCans (\ ics -> addInertCan ics workItem) ; return (Stop ev (ptext (sLit "Kept as inert") <+> ppr_kicked n_kicked)) } } interactTyVarEq _ wi = pprPanic "interactTyVarEq" (ppr wi) -- @trySpontaneousSolve wi@ solves equalities where one side is a -- touchable unification variable. -- Returns True <=> spontaneous solve happened canSolveByUnification :: TcLevel -> CtEvidence -> EqRel -> TcTyVar -> Xi -> Bool canSolveByUnification tclvl gw eq_rel tv xi | ReprEq <- eq_rel -- we never solve representational equalities this way. = False | isGiven gw -- See Note [Touchables and givens] = False | isTouchableMetaTyVar tclvl tv = case metaTyVarInfo tv of SigTv -> is_tyvar xi _ -> True | otherwise -- Untouchable = False where is_tyvar xi = case tcGetTyVar_maybe xi of Nothing -> False Just tv -> case tcTyVarDetails tv of MetaTv { mtv_info = info } -> case info of SigTv -> True _ -> False SkolemTv {} -> True FlatSkol {} -> False RuntimeUnk -> True solveByUnification :: CtEvidence -> TcTyVar -> Xi -> TcS () -- Solve with the identity coercion -- Precondition: kind(xi) is a sub-kind of kind(tv) -- Precondition: CtEvidence is Wanted or Derived -- Precondition: CtEvidence is nominal -- See [New Wanted Superclass Work] to see why solveByUnification -- must work for Derived as well as Wanted -- Returns: workItem where -- workItem = the new Given constraint -- -- NB: No need for an occurs check here, because solveByUnification always -- arises from a CTyEqCan, a *canonical* constraint. Its invariants -- say that in (a ~ xi), the type variable a does not appear in xi. -- See TcRnTypes.Ct invariants. -- -- Post: tv is unified (by side effect) with xi; -- we often write tv := xi solveByUnification wd tv xi = do { let tv_ty = mkTyVarTy tv ; traceTcS "Sneaky unification:" $ vcat [text "Unifies:" <+> ppr tv <+> ptext (sLit ":=") <+> ppr xi, text "Coercion:" <+> pprEq tv_ty xi, text "Left Kind is:" <+> ppr (typeKind tv_ty), text "Right Kind is:" <+> ppr (typeKind xi) ] ; let xi' = defaultKind xi -- We only instantiate kind unification variables -- with simple kinds like *, not OpenKind or ArgKind -- cf TcUnify.uUnboundKVar ; setWantedTyBind tv xi' ; when (isWanted wd) $ setEvBind (ctEvId wd) (EvCoercion (mkTcNomReflCo xi')) } ppr_kicked :: Int -> SDoc ppr_kicked 0 = empty ppr_kicked n = parens (int n <+> ptext (sLit "kicked out")) kickOutRewritable :: CtFlavour -- Flavour of the equality that is -- being added to the inert set -> EqRel -- of the new equality -> TcTyVar -- The new equality is tv ~ ty -> TcS Int kickOutRewritable new_flavour new_eq_rel new_tv | not ((new_flavour, new_eq_rel) `eqCanRewriteFR` (new_flavour, new_eq_rel)) = return 0 -- If new_flavour can't rewrite itself, it can't rewrite -- anything else, so no need to kick out anything -- This is a common case: wanteds can't rewrite wanteds | otherwise = do { ics <- getInertCans ; let (kicked_out, ics') = kick_out new_flavour new_eq_rel new_tv ics ; setInertCans ics' ; updWorkListTcS (appendWorkList kicked_out) ; unless (isEmptyWorkList kicked_out) $ csTraceTcS $ hang (ptext (sLit "Kick out, tv =") <+> ppr new_tv) 2 (vcat [ text "n-kicked =" <+> int (workListSize kicked_out) , text "n-kept fun-eqs =" <+> int (sizeFunEqMap (inert_funeqs ics')) , ppr kicked_out ]) ; return (workListSize kicked_out) } kick_out :: CtFlavour -> EqRel -> TcTyVar -> InertCans -> (WorkList, InertCans) kick_out new_flavour new_eq_rel new_tv (IC { inert_eqs = tv_eqs , inert_dicts = dictmap , inert_funeqs = funeqmap , inert_irreds = irreds , inert_insols = insols }) = (kicked_out, inert_cans_in) where -- NB: Notice that don't rewrite -- inert_solved_dicts, and inert_solved_funeqs -- optimistically. But when we lookup we have to -- take the substitution into account inert_cans_in = IC { inert_eqs = tv_eqs_in , inert_dicts = dicts_in , inert_funeqs = feqs_in , inert_irreds = irs_in , inert_insols = insols_in } kicked_out = WL { wl_eqs = tv_eqs_out , wl_funeqs = feqs_out , wl_rest = bagToList (dicts_out `andCts` irs_out `andCts` insols_out) , wl_implics = emptyBag } (tv_eqs_out, tv_eqs_in) = foldVarEnv kick_out_eqs ([], emptyVarEnv) tv_eqs (feqs_out, feqs_in) = partitionFunEqs kick_out_ct funeqmap (dicts_out, dicts_in) = partitionDicts kick_out_ct dictmap (irs_out, irs_in) = partitionBag kick_out_irred irreds (insols_out, insols_in) = partitionBag kick_out_ct insols -- Kick out even insolubles; see Note [Kick out insolubles] can_rewrite :: CtEvidence -> Bool can_rewrite = ((new_flavour, new_eq_rel) `eqCanRewriteFR`) . ctEvFlavourRole kick_out_ct :: Ct -> Bool kick_out_ct ct = kick_out_ctev (ctEvidence ct) kick_out_ctev :: CtEvidence -> Bool kick_out_ctev ev = can_rewrite ev && new_tv `elemVarSet` tyVarsOfType (ctEvPred ev) -- See Note [Kicking out inert constraints] kick_out_irred :: Ct -> Bool kick_out_irred ct = can_rewrite (cc_ev ct) && new_tv `elemVarSet` closeOverKinds (tyVarsOfCt ct) -- See Note [Kicking out Irreds] kick_out_eqs :: EqualCtList -> ([Ct], TyVarEnv EqualCtList) -> ([Ct], TyVarEnv EqualCtList) kick_out_eqs eqs (acc_out, acc_in) = (eqs_out ++ acc_out, case eqs_in of [] -> acc_in (eq1:_) -> extendVarEnv acc_in (cc_tyvar eq1) eqs_in) where (eqs_in, eqs_out) = partition keep_eq eqs -- implements criteria K1-K3 in Note [The inert equalities] in TcFlatten keep_eq (CTyEqCan { cc_tyvar = tv, cc_rhs = rhs_ty, cc_ev = ev , cc_eq_rel = eq_rel }) | tv == new_tv = not (can_rewrite ev) -- (K1) | otherwise = check_k2 && check_k3 where check_k2 = not (ev `eqCanRewrite` ev) || not (can_rewrite ev) || not (new_tv `elemVarSet` tyVarsOfType rhs_ty) check_k3 | can_rewrite ev = case eq_rel of NomEq -> not (rhs_ty `eqType` mkTyVarTy new_tv) ReprEq -> not (isTyVarExposed new_tv rhs_ty) | otherwise = True keep_eq ct = pprPanic "keep_eq" (ppr ct) {- Note [Kicking out inert constraints] ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~ Given a new (a -> ty) inert, we want to kick out an existing inert constraint if a) the new constraint can rewrite the inert one b) 'a' is free in the inert constraint (so that it *will*) rewrite it if we kick it out. For (b) we use tyVarsOfCt, which returns the type variables /and the kind variables/ that are directly visible in the type. Hence we will have exposed all the rewriting we care about to make the most precise kinds visible for matching classes etc. No need to kick out constraints that mention type variables whose kinds contain this variable! (Except see Note [Kicking out Irreds].) Note [Kicking out Irreds] ~~~~~~~~~~~~~~~~~~~~~~~~~ There is an awkward special case for Irreds. When we have a kind-mis-matched equality constraint (a:k1) ~ (ty:k2), we turn it into an Irred (see Note [Equalities with incompatible kinds] in TcCanonical). So in this case the free kind variables of k1 and k2 are not visible. More precisely, the type looks like (~) k1 (a:k1) (ty:k2) because (~) has kind forall k. k -> k -> Constraint. So the constraint itself is ill-kinded. We can "see" k1 but not k2. That's why we use closeOverKinds to make sure we see k2. This is not pretty. Maybe (~) should have kind (~) :: forall k1 k1. k1 -> k2 -> Constraint Note [Kick out insolubles] ~~~~~~~~~~~~~~~~~~~~~~~~~~ Suppose we have an insoluble alpha ~ [alpha], which is insoluble because an occurs check. And then we unify alpha := [Int]. Then we really want to rewrite the insouluble to [Int] ~ [[Int]]. Now it can be decomposed. Otherwise we end up with a "Can't match [Int] ~ [[Int]]" which is true, but a bit confusing because the outer type constructors match. Note [Avoid double unifications] ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~ The spontaneous solver has to return a given which mentions the unified unification variable *on the left* of the equality. Here is what happens if not: Original wanted: (a ~ alpha), (alpha ~ Int) We spontaneously solve the first wanted, without changing the order! given : a ~ alpha [having unified alpha := a] Now the second wanted comes along, but he cannot rewrite the given, so we simply continue. At the end we spontaneously solve that guy, *reunifying* [alpha := Int] We avoid this problem by orienting the resulting given so that the unification variable is on the left. [Note that alternatively we could attempt to enforce this at canonicalization] See also Note [No touchables as FunEq RHS] in TcSMonad; avoiding double unifications is the main reason we disallow touchable unification variables as RHS of type family equations: F xis ~ alpha. Note [Superclasses and recursive dictionaries] ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~ Overlaps with Note [SUPERCLASS-LOOP 1] Note [SUPERCLASS-LOOP 2] Note [Recursive instances and superclases] ToDo: check overlap and delete redundant stuff Right before adding a given into the inert set, we must produce some more work, that will bring the superclasses of the given into scope. The superclass constraints go into our worklist. When we simplify a wanted constraint, if we first see a matching instance, we may produce new wanted work. To (1) avoid doing this work twice in the future and (2) to handle recursive dictionaries we may ``cache'' this item as given into our inert set WITHOUT adding its superclass constraints, otherwise we'd be in danger of creating a loop [In fact this was the exact reason for doing the isGoodRecEv check in an older version of the type checker]. But now we have added partially solved constraints to the worklist which may interact with other wanteds. Consider the example: Example 1: class Eq b => Foo a b --- 0-th selector instance Eq a => Foo [a] a --- fooDFun and wanted (Foo [t] t). We are first going to see that the instance matches and create an inert set that includes the solved (Foo [t] t) but not its superclasses: d1 :_g Foo [t] t d1 := EvDFunApp fooDFun d3 Our work list is going to contain a new *wanted* goal d3 :_w Eq t Ok, so how do we get recursive dictionaries, at all: Example 2: data D r = ZeroD | SuccD (r (D r)); instance (Eq (r (D r))) => Eq (D r) where ZeroD == ZeroD = True (SuccD a) == (SuccD b) = a == b _ == _ = False; equalDC :: D [] -> D [] -> Bool; equalDC = (==); We need to prove (Eq (D [])). Here's how we go: d1 :_w Eq (D []) by instance decl, holds if d2 :_w Eq [D []] where d1 = dfEqD d2 *BUT* we have an inert set which gives us (no superclasses): d1 :_g Eq (D []) By the instance declaration of Eq we can show the 'd2' goal if d3 :_w Eq (D []) where d2 = dfEqList d3 d1 = dfEqD d2 Now, however this wanted can interact with our inert d1 to set: d3 := d1 and solve the goal. Why was this interaction OK? Because, if we chase the evidence of d1 ~~> dfEqD d2 ~~-> dfEqList d3, so by setting d3 := d1 we are really setting d3 := dfEqD2 (dfEqList d3) which is FINE because the use of d3 is protected by the instance function applications. So, our strategy is to try to put solved wanted dictionaries into the inert set along with their superclasses (when this is meaningful, i.e. when new wanted goals are generated) but solve a wanted dictionary from a given only in the case where the evidence variable of the wanted is mentioned in the evidence of the given (recursively through the evidence binds) in a protected way: more instance function applications than superclass selectors. Here are some more examples from GHC's previous type checker Example 3: This code arises in the context of "Scrap Your Boilerplate with Class" class Sat a class Data ctx a instance Sat (ctx Char) => Data ctx Char -- dfunData1 instance (Sat (ctx [a]), Data ctx a) => Data ctx [a] -- dfunData2 class Data Maybe a => Foo a instance Foo t => Sat (Maybe t) -- dfunSat instance Data Maybe a => Foo a -- dfunFoo1 instance Foo a => Foo [a] -- dfunFoo2 instance Foo [Char] -- dfunFoo3 Consider generating the superclasses of the instance declaration instance Foo a => Foo [a] So our problem is this [G] d0 : Foo t [W] d1 : Data Maybe [t] -- Desired superclass We may add the given in the inert set, along with its superclasses [assuming we don't fail because there is a matching instance, see topReactionsStage, given case ] Inert: [G] d0 : Foo t [G] d01 : Data Maybe t -- Superclass of d0 WorkList [W] d1 : Data Maybe [t] Solve d1 using instance dfunData2; d1 := dfunData2 d2 d3 Inert: [G] d0 : Foo t [G] d01 : Data Maybe t -- Superclass of d0 Solved: d1 : Data Maybe [t] WorkList [W] d2 : Sat (Maybe [t]) [W] d3 : Data Maybe t Now, we may simplify d2 using dfunSat; d2 := dfunSat d4 Inert: [G] d0 : Foo t [G] d01 : Data Maybe t -- Superclass of d0 Solved: d1 : Data Maybe [t] d2 : Sat (Maybe [t]) WorkList: [W] d3 : Data Maybe t [W] d4 : Foo [t] Now, we can just solve d3 from d01; d3 := d01 Inert [G] d0 : Foo t [G] d01 : Data Maybe t -- Superclass of d0 Solved: d1 : Data Maybe [t] d2 : Sat (Maybe [t]) WorkList [W] d4 : Foo [t] Now, solve d4 using dfunFoo2; d4 := dfunFoo2 d5 Inert [G] d0 : Foo t [G] d01 : Data Maybe t -- Superclass of d0 Solved: d1 : Data Maybe [t] d2 : Sat (Maybe [t]) d4 : Foo [t] WorkList: [W] d5 : Foo t Now, d5 can be solved! d5 := d0 Result d1 := dfunData2 d2 d3 d2 := dfunSat d4 d3 := d01 d4 := dfunFoo2 d5 d5 := d0 d0 :_g Foo t d1 :_s Data Maybe [t] d1 := dfunData2 d2 d3 d2 :_g Sat (Maybe [t]) d2 := dfunSat d4 d4 :_g Foo [t] d4 := dfunFoo2 d5 d5 :_g Foo t d5 := dfunFoo1 d7 WorkList: d7 :_w Data Maybe t d6 :_g Data Maybe [t] d8 :_g Data Maybe t d8 := EvDictSuperClass d5 0 d01 :_g Data Maybe t Now, two problems: [1] Suppose we pick d8 and we react him with d01. Which of the two givens should we keep? Well, we *MUST NOT* drop d01 because d8 contains recursive evidence that must not be used (look at case interactInert where both inert and workitem are givens). So we have several options: - Drop the workitem always (this will drop d8) This feels very unsafe -- what if the work item was the "good" one that should be used later to solve another wanted? - Don't drop anyone: the inert set may contain multiple givens! [This is currently implemented] The "don't drop anyone" seems the most safe thing to do, so now we come to problem 2: [2] We have added both d6 and d01 in the inert set, and we are interacting our wanted d7. Now the [isRecDictEv] function in the ineration solver [case inert-given workitem-wanted] will prevent us from interacting d7 := d8 precisely because chasing the evidence of d8 leads us to an unguarded use of d7. So, no interaction happens there. Then we meet d01 and there is no recursion problem there [isRectDictEv] gives us the OK to interact and we do solve d7 := d01! Note [SUPERCLASS-LOOP 1] ~~~~~~~~~~~~~~~~~~~~~~~~ We have to be very, very careful when generating superclasses, lest we accidentally build a loop. Here's an example: class S a class S a => C a where { opc :: a -> a } class S b => D b where { opd :: b -> b } instance C Int where opc = opd instance D Int where opd = opc From (instance C Int) we get the constraint set {ds1:S Int, dd:D Int} Simplifying, we may well get: $dfCInt = :C ds1 (opd dd) dd = $dfDInt ds1 = $p1 dd Notice that we spot that we can extract ds1 from dd. Alas! Alack! We can do the same for (instance D Int): $dfDInt = :D ds2 (opc dc) dc = $dfCInt ds2 = $p1 dc And now we've defined the superclass in terms of itself. Two more nasty cases are in tcrun021 tcrun033 Solution: - Satisfy the superclass context *all by itself* (tcSimplifySuperClasses) - And do so completely; i.e. no left-over constraints to mix with the constraints arising from method declarations Note [SUPERCLASS-LOOP 2] ~~~~~~~~~~~~~~~~~~~~~~~~ We need to be careful when adding "the constaint we are trying to prove". Suppose we are *given* d1:Ord a, and want to deduce (d2:C [a]) where class Ord a => C a where instance Ord [a] => C [a] where ... Then we'll use the instance decl to deduce C [a] from Ord [a], and then add the superclasses of C [a] to avails. But we must not overwrite the binding for Ord [a] (which is obtained from Ord a) with a superclass selection or we'll just build a loop! Here's another variant, immortalised in tcrun020 class Monad m => C1 m class C1 m => C2 m x instance C2 Maybe Bool For the instance decl we need to build (C1 Maybe), and it's no good if we run around and add (C2 Maybe Bool) and its superclasses to the avails before we search for C1 Maybe. Here's another example class Eq b => Foo a b instance Eq a => Foo [a] a If we are reducing (Foo [t] t) we'll first deduce that it holds (via the instance decl). We must not then overwrite the Eq t constraint with a superclass selection! At first I had a gross hack, whereby I simply did not add superclass constraints in addWanted, though I did for addGiven and addIrred. This was sub-optimal, because it lost legitimate superclass sharing, and it still didn't do the job: I found a very obscure program (now tcrun021) in which improvement meant the simplifier got two bites a the cherry... so something seemed to be an Stop first time, but reducible next time. Now we implement the Right Solution, which is to check for loops directly when adding superclasses. It's a bit like the occurs check in unification. Note [Recursive instances and superclases] ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~ Consider this code, which arises in the context of "Scrap Your Boilerplate with Class". class Sat a class Data ctx a instance Sat (ctx Char) => Data ctx Char instance (Sat (ctx [a]), Data ctx a) => Data ctx [a] class Data Maybe a => Foo a instance Foo t => Sat (Maybe t) instance Data Maybe a => Foo a instance Foo a => Foo [a] instance Foo [Char] In the instance for Foo [a], when generating evidence for the superclasses (ie in tcSimplifySuperClasses) we need a superclass (Data Maybe [a]). Using the instance for Data, we therefore need (Sat (Maybe [a], Data Maybe a) But we are given (Foo a), and hence its superclass (Data Maybe a). So that leaves (Sat (Maybe [a])). Using the instance for Sat means we need (Foo [a]). And that is the very dictionary we are bulding an instance for! So we must put that in the "givens". So in this case we have Given: Foo a, Foo [a] Wanted: Data Maybe [a] BUT we must *not not not* put the *superclasses* of (Foo [a]) in the givens, which is what 'addGiven' would normally do. Why? Because (Data Maybe [a]) is the superclass, so we'd "satisfy" the wanted by selecting a superclass from Foo [a], which simply makes a loop. On the other hand we *must* put the superclasses of (Foo a) in the givens, as you can see from the derivation described above. Conclusion: in the very special case of tcSimplifySuperClasses we have one 'given' (namely the "this" dictionary) whose superclasses must not be added to 'givens' by addGiven. There is a complication though. Suppose there are equalities instance (Eq a, a~b) => Num (a,b) Then we normalise the 'givens' wrt the equalities, so the original given "this" dictionary is cast to one of a different type. So it's a bit trickier than before to identify the "special" dictionary whose superclasses must not be added. See test indexed-types/should_run/EqInInstance We need a persistent property of the dictionary to record this special-ness. Current I'm using the InstLocOrigin (a bit of a hack, but cool), which is maintained by dictionary normalisation. Specifically, the InstLocOrigin is NoScOrigin then the no-superclass thing kicks in. WATCH OUT if you fiddle with InstLocOrigin! ************************************************************************ * * * Functional dependencies, instantiation of equations * * ************************************************************************ When we spot an equality arising from a functional dependency, we now use that equality (a "wanted") to rewrite the work-item constraint right away. This avoids two dangers Danger 1: If we send the original constraint on down the pipeline it may react with an instance declaration, and in delicate situations (when a Given overlaps with an instance) that may produce new insoluble goals: see Trac #4952 Danger 2: If we don't rewrite the constraint, it may re-react with the same thing later, and produce the same equality again --> termination worries. To achieve this required some refactoring of FunDeps.lhs (nicer now!). -} rewriteWithFunDeps :: [Equation CtLoc] -> TcS () -- NB: The returned constraints are all Derived -- Post: returns no trivial equalities (identities) and all EvVars returned are fresh rewriteWithFunDeps eqn_pred_locs = mapM_ instFunDepEqn eqn_pred_locs instFunDepEqn :: Equation CtLoc -> TcS () -- Post: Returns the position index as well as the corresponding FunDep equality instFunDepEqn (FDEqn { fd_qtvs = tvs, fd_eqs = eqs, fd_loc = loc }) = do { (subst, _) <- instFlexiTcS tvs -- Takes account of kind substitution ; mapM_ (do_one subst) eqs } where do_one subst (FDEq { fd_ty_left = ty1, fd_ty_right = ty2 }) = unifyDerived loc Nominal $ Pair (Type.substTy subst ty1) (Type.substTy subst ty2) {- ********************************************************************************* * * The top-reaction Stage * * ********************************************************************************* -} topReactionsStage :: WorkItem -> TcS (StopOrContinue Ct) topReactionsStage wi = do { inerts <- getTcSInerts ; tir <- doTopReact inerts wi ; case tir of ContinueWith wi -> return (ContinueWith wi) Stop ev s -> return (Stop ev (ptext (sLit "Top react:") <+> s)) } doTopReact :: InertSet -> WorkItem -> TcS (StopOrContinue Ct) -- The work item does not react with the inert set, so try interaction with top-level -- instances. Note: -- -- (a) The place to add superclasses in not here in doTopReact stage. -- Instead superclasses are added in the worklist as part of the -- canonicalization process. See Note [Adding superclasses]. -- -- (b) See Note [Given constraint that matches an instance declaration] -- for some design decisions for given dictionaries. doTopReact inerts work_item = do { traceTcS "doTopReact" (ppr work_item) ; case work_item of CDictCan {} -> doTopReactDict inerts work_item CFunEqCan {} -> doTopReactFunEq work_item _ -> -- Any other work item does not react with any top-level equations return (ContinueWith work_item) } -------------------- doTopReactDict :: InertSet -> Ct -> TcS (StopOrContinue Ct) -- Try to use type-class instance declarations to simplify the constraint doTopReactDict inerts work_item@(CDictCan { cc_ev = fl, cc_class = cls , cc_tyargs = xis }) | not (isWanted fl) -- Never use instances for Given or Derived constraints = try_fundeps_and_return | Just ev <- lookupSolvedDict inerts loc cls xis -- Cached = do { setEvBind dict_id (ctEvTerm ev); ; stopWith fl "Dict/Top (cached)" } | otherwise -- Not cached = do { lkup_inst_res <- matchClassInst inerts cls xis loc ; case lkup_inst_res of GenInst wtvs ev_term -> do { addSolvedDict fl cls xis ; solve_from_instance wtvs ev_term } NoInstance -> try_fundeps_and_return } where dict_id = ASSERT( isWanted fl ) ctEvId fl pred = mkClassPred cls xis loc = ctEvLoc fl solve_from_instance :: [CtEvidence] -> EvTerm -> TcS (StopOrContinue Ct) -- Precondition: evidence term matches the predicate workItem solve_from_instance evs ev_term | null evs = do { traceTcS "doTopReact/found nullary instance for" $ ppr dict_id ; setEvBind dict_id ev_term ; stopWith fl "Dict/Top (solved, no new work)" } | otherwise = do { traceTcS "doTopReact/found non-nullary instance for" $ ppr dict_id ; setEvBind dict_id ev_term ; let mk_new_wanted ev = mkNonCanonical (ev {ctev_loc = bumpCtLocDepth CountConstraints loc }) ; updWorkListTcS (extendWorkListCts (map mk_new_wanted evs)) ; stopWith fl "Dict/Top (solved, more work)" } -- We didn't solve it; so try functional dependencies with -- the instance environment, and return -- NB: even if there *are* some functional dependencies against the -- instance environment, there might be a unique match, and if -- so we make sure we get on and solve it first. See Note [Weird fundeps] try_fundeps_and_return = do { instEnvs <- getInstEnvs ; let fd_eqns :: [Equation CtLoc] fd_eqns = [ fd { fd_loc = loc { ctl_origin = FunDepOrigin2 pred (ctl_origin loc) inst_pred inst_loc } } | fd@(FDEqn { fd_loc = inst_loc, fd_pred1 = inst_pred }) <- improveFromInstEnv instEnvs pred ] ; rewriteWithFunDeps fd_eqns ; continueWith work_item } doTopReactDict _ w = pprPanic "doTopReactDict" (ppr w) -------------------- doTopReactFunEq :: Ct -> TcS (StopOrContinue Ct) doTopReactFunEq work_item@(CFunEqCan { cc_ev = old_ev, cc_fun = fam_tc , cc_tyargs = args , cc_fsk = fsk }) = ASSERT(isTypeFamilyTyCon fam_tc) -- No associated data families -- have reached this far ASSERT( not (isDerived old_ev) ) -- CFunEqCan is never Derived -- Look up in top-level instances, or built-in axiom do { match_res <- matchFam fam_tc args -- See Note [MATCHING-SYNONYMS] ; case match_res of { Nothing -> do { try_improvement; continueWith work_item } ; Just (ax_co, rhs_ty) -- Found a top-level instance | Just (tc, tc_args) <- tcSplitTyConApp_maybe rhs_ty , isTypeFamilyTyCon tc , tc_args `lengthIs` tyConArity tc -- Short-cut -> shortCutReduction old_ev fsk ax_co tc tc_args -- Try shortcut; see Note [Short cut for top-level reaction] | isGiven old_ev -- Not shortcut -> do { let final_co = mkTcSymCo (ctEvCoercion old_ev) `mkTcTransCo` ax_co -- final_co :: fsk ~ rhs_ty ; new_ev <- newGivenEvVar deeper_loc (mkTcEqPred (mkTyVarTy fsk) rhs_ty, EvCoercion final_co) ; emitWorkNC [new_ev] -- Non-cannonical; that will mean we flatten rhs_ty ; stopWith old_ev "Fun/Top (given)" } | not (fsk `elemVarSet` tyVarsOfType rhs_ty) -> do { dischargeFmv (ctEvId old_ev) fsk ax_co rhs_ty ; traceTcS "doTopReactFunEq" $ vcat [ text "old_ev:" <+> ppr old_ev , nest 2 (text ":=") <+> ppr ax_co ] ; stopWith old_ev "Fun/Top (wanted)" } | otherwise -- We must not assign ufsk := ...ufsk...! -> do { alpha_ty <- newFlexiTcSTy (tyVarKind fsk) ; new_ev <- newWantedEvVarNC loc (mkTcEqPred alpha_ty rhs_ty) ; emitWorkNC [new_ev] -- By emitting this as non-canonical, we deal with all -- flattening, occurs-check, and ufsk := ufsk issues ; let final_co = ax_co `mkTcTransCo` mkTcSymCo (ctEvCoercion new_ev) -- ax_co :: fam_tc args ~ rhs_ty -- ev :: alpha ~ rhs_ty -- ufsk := alpha -- final_co :: fam_tc args ~ alpha ; dischargeFmv (ctEvId old_ev) fsk final_co alpha_ty ; traceTcS "doTopReactFunEq (occurs)" $ vcat [ text "old_ev:" <+> ppr old_ev , nest 2 (text ":=") <+> ppr final_co , text "new_ev:" <+> ppr new_ev ] ; stopWith old_ev "Fun/Top (wanted)" } } } where loc = ctEvLoc old_ev deeper_loc = bumpCtLocDepth CountTyFunApps loc try_improvement | Just ops <- isBuiltInSynFamTyCon_maybe fam_tc = do { inert_eqs <- getInertEqs ; let eqns = sfInteractTop ops args (lookupFlattenTyVar inert_eqs fsk) ; mapM_ (unifyDerived loc Nominal) eqns } | otherwise = return () doTopReactFunEq w = pprPanic "doTopReactFunEq" (ppr w) shortCutReduction :: CtEvidence -> TcTyVar -> TcCoercion -> TyCon -> [TcType] -> TcS (StopOrContinue Ct) shortCutReduction old_ev fsk ax_co fam_tc tc_args | isGiven old_ev = ASSERT( ctEvEqRel old_ev == NomEq ) runFlatten $ do { let fmode = mkFlattenEnv FM_FlattenAll old_ev ; (xis, cos) <- flatten_many fmode (repeat Nominal) tc_args -- ax_co :: F args ~ G tc_args -- cos :: xis ~ tc_args -- old_ev :: F args ~ fsk -- G cos ; sym ax_co ; old_ev :: G xis ~ fsk ; new_ev <- newGivenEvVar deeper_loc ( mkTcEqPred (mkTyConApp fam_tc xis) (mkTyVarTy fsk) , EvCoercion (mkTcTyConAppCo Nominal fam_tc cos `mkTcTransCo` mkTcSymCo ax_co `mkTcTransCo` ctEvCoercion old_ev) ) ; let new_ct = CFunEqCan { cc_ev = new_ev, cc_fun = fam_tc, cc_tyargs = xis, cc_fsk = fsk } ; emitFlatWork new_ct ; stopWith old_ev "Fun/Top (given, shortcut)" } | otherwise = ASSERT( not (isDerived old_ev) ) -- Caller ensures this ASSERT( ctEvEqRel old_ev == NomEq ) runFlatten $ do { let fmode = mkFlattenEnv FM_FlattenAll old_ev ; (xis, cos) <- flatten_many fmode (repeat Nominal) tc_args -- ax_co :: F args ~ G tc_args -- cos :: xis ~ tc_args -- G cos ; sym ax_co ; old_ev :: G xis ~ fsk -- new_ev :: G xis ~ fsk -- old_ev :: F args ~ fsk := ax_co ; sym (G cos) ; new_ev ; new_ev <- newWantedEvVarNC loc (mkTcEqPred (mkTyConApp fam_tc xis) (mkTyVarTy fsk)) ; setEvBind (ctEvId old_ev) (EvCoercion (ax_co `mkTcTransCo` mkTcSymCo (mkTcTyConAppCo Nominal fam_tc cos) `mkTcTransCo` ctEvCoercion new_ev)) ; let new_ct = CFunEqCan { cc_ev = new_ev, cc_fun = fam_tc, cc_tyargs = xis, cc_fsk = fsk } ; emitFlatWork new_ct ; stopWith old_ev "Fun/Top (wanted, shortcut)" } where loc = ctEvLoc old_ev deeper_loc = bumpCtLocDepth CountTyFunApps loc dischargeFmv :: EvVar -> TcTyVar -> TcCoercion -> TcType -> TcS () -- (dischargeFmv x fmv co ty) -- [W] x :: F tys ~ fuv -- co :: F tys ~ ty -- Precondition: fuv is not filled, and fuv `notElem` ty -- -- Then set fuv := ty, -- set x := co -- kick out any inert things that are now rewritable dischargeFmv evar fmv co xi = ASSERT2( not (fmv `elemVarSet` tyVarsOfType xi), ppr evar $$ ppr fmv $$ ppr xi ) do { setWantedTyBind fmv xi ; setEvBind evar (EvCoercion co) ; n_kicked <- kickOutRewritable Given NomEq fmv ; traceTcS "dischargeFuv" (ppr fmv <+> equals <+> ppr xi $$ ppr_kicked n_kicked) } {- Note [Cached solved FunEqs] ~~~~~~~~~~~~~~~~~~~~~~~~~~~ When trying to solve, say (FunExpensive big-type ~ ty), it's important to see if we have reduced (FunExpensive big-type) before, lest we simply repeat it. Hence the lookup in inert_solved_funeqs. Moreover we must use `canRewriteOrSame` because both uses might (say) be Wanteds, and we *still* want to save the re-computation. Note [MATCHING-SYNONYMS] ~~~~~~~~~~~~~~~~~~~~~~~~ When trying to match a dictionary (D tau) to a top-level instance, or a type family equation (F taus_1 ~ tau_2) to a top-level family instance, we do *not* need to expand type synonyms because the matcher will do that for us. Note [RHS-FAMILY-SYNONYMS] ~~~~~~~~~~~~~~~~~~~~~~~~~~ The RHS of a family instance is represented as yet another constructor which is like a type synonym for the real RHS the programmer declared. Eg: type instance F (a,a) = [a] Becomes: :R32 a = [a] -- internal type synonym introduced F (a,a) ~ :R32 a -- instance When we react a family instance with a type family equation in the work list we keep the synonym-using RHS without expansion. Note [FunDep and implicit parameter reactions] ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~ Currently, our story of interacting two dictionaries (or a dictionary and top-level instances) for functional dependencies, and implicit paramters, is that we simply produce new Derived equalities. So for example class D a b | a -> b where ... Inert: d1 :g D Int Bool WorkItem: d2 :w D Int alpha We generate the extra work item cv :d alpha ~ Bool where 'cv' is currently unused. However, this new item can perhaps be spontaneously solved to become given and react with d2, discharging it in favour of a new constraint d2' thus: d2' :w D Int Bool d2 := d2' |> D Int cv Now d2' can be discharged from d1 We could be more aggressive and try to *immediately* solve the dictionary using those extra equalities, but that requires those equalities to carry evidence and derived do not carry evidence. If that were the case with the same inert set and work item we might dischard d2 directly: cv :w alpha ~ Bool d2 := d1 |> D Int cv But in general it's a bit painful to figure out the necessary coercion, so we just take the first approach. Here is a better example. Consider: class C a b c | a -> b And: [Given] d1 : C T Int Char [Wanted] d2 : C T beta Int In this case, it's *not even possible* to solve the wanted immediately. So we should simply output the functional dependency and add this guy [but NOT its superclasses] back in the worklist. Even worse: [Given] d1 : C T Int beta [Wanted] d2: C T beta Int Then it is solvable, but its very hard to detect this on the spot. It's exactly the same with implicit parameters, except that the "aggressive" approach would be much easier to implement. Note [When improvement happens] ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~ We fire an improvement rule when * Two constraints match (modulo the fundep) e.g. C t1 t2, C t1 t3 where C a b | a->b The two match because the first arg is identical Note that we *do* fire the improvement if one is Given and one is Derived (e.g. a superclass of a Wanted goal) or if both are Given. Example (tcfail138) class L a b | a -> b class (G a, L a b) => C a b instance C a b' => G (Maybe a) instance C a b => C (Maybe a) a instance L (Maybe a) a When solving the superclasses of the (C (Maybe a) a) instance, we get Given: C a b ... and hance by superclasses, (G a, L a b) Wanted: G (Maybe a) Use the instance decl to get Wanted: C a b' The (C a b') is inert, so we generate its Derived superclasses (L a b'), and now we need improvement between that derived superclass an the Given (L a b) Test typecheck/should_fail/FDsFromGivens also shows why it's a good idea to emit Derived FDs for givens as well. Note [Weird fundeps] ~~~~~~~~~~~~~~~~~~~~ Consider class Het a b | a -> b where het :: m (f c) -> a -> m b class GHet (a :: * -> *) (b :: * -> *) | a -> b instance GHet (K a) (K [a]) instance Het a b => GHet (K a) (K b) The two instances don't actually conflict on their fundeps, although it's pretty strange. So they are both accepted. Now try [W] GHet (K Int) (K Bool) This triggers fudeps from both instance decls; but it also matches a *unique* instance decl, and we should go ahead and pick that one right now. Otherwise, if we don't, it ends up unsolved in the inert set and is reported as an error. Trac #7875 is a case in point. Note [Overriding implicit parameters] ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~ Consider f :: (?x::a) -> Bool -> a g v = let ?x::Int = 3 in (f v, let ?x::Bool = True in f v) This should probably be well typed, with g :: Bool -> (Int, Bool) So the inner binding for ?x::Bool *overrides* the outer one. Hence a work-item Given overrides an inert-item Given. Note [Given constraint that matches an instance declaration] ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~ What should we do when we discover that one (or more) top-level instances match a given (or solved) class constraint? We have two possibilities: 1. Reject the program. The reason is that there may not be a unique best strategy for the solver. Example, from the OutsideIn(X) paper: instance P x => Q [x] instance (x ~ y) => R [x] y wob :: forall a b. (Q [b], R b a) => a -> Int g :: forall a. Q [a] => [a] -> Int g x = wob x will generate the impliation constraint: Q [a] => (Q [beta], R beta [a]) If we react (Q [beta]) with its top-level axiom, we end up with a (P beta), which we have no way of discharging. On the other hand, if we react R beta [a] with the top-level we get (beta ~ a), which is solvable and can help us rewrite (Q [beta]) to (Q [a]) which is now solvable by the given Q [a]. However, this option is restrictive, for instance [Example 3] from Note [Recursive instances and superclases] will fail to work. 2. Ignore the problem, hoping that the situations where there exist indeed such multiple strategies are rare: Indeed the cause of the previous problem is that (R [x] y) yields the new work (x ~ y) which can be *spontaneously* solved, not using the givens. We are choosing option 2 below but we might consider having a flag as well. Note [New Wanted Superclass Work] ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~ Even in the case of wanted constraints, we may add some superclasses as new given work. The reason is: To allow FD-like improvement for type families. Assume that we have a class class C a b | a -> b and we have to solve the implication constraint: C a b => C a beta Then, FD improvement can help us to produce a new wanted (beta ~ b) We want to have the same effect with the type family encoding of functional dependencies. Namely, consider: class (F a ~ b) => C a b Now suppose that we have: given: C a b wanted: C a beta By interacting the given we will get given (F a ~ b) which is not enough by itself to make us discharge (C a beta). However, we may create a new derived equality from the super-class of the wanted constraint (C a beta), namely derived (F a ~ beta). Now we may interact this with given (F a ~ b) to get: derived : beta ~ b But 'beta' is a touchable unification variable, and hence OK to unify it with 'b', replacing the derived evidence with the identity. This requires trySpontaneousSolve to solve *derived* equalities that have a touchable in their RHS, *in addition* to solving wanted equalities. We also need to somehow use the superclasses to quantify over a minimal, constraint see note [Minimize by Superclasses] in TcSimplify. Finally, here is another example where this is useful. Example 1: ---------- class (F a ~ b) => C a b And we are given the wanteds: w1 : C a b w2 : C a c w3 : b ~ c We surely do *not* want to quantify over (b ~ c), since if someone provides dictionaries for (C a b) and (C a c), these dictionaries can provide a proof of (b ~ c), hence no extra evidence is necessary. Here is what will happen: Step 1: We will get new *given* superclass work, provisionally to our solving of w1 and w2 g1: F a ~ b, g2 : F a ~ c, w1 : C a b, w2 : C a c, w3 : b ~ c The evidence for g1 and g2 is a superclass evidence term: g1 := sc w1, g2 := sc w2 Step 2: The givens will solve the wanted w3, so that w3 := sym (sc w1) ; sc w2 Step 3: Now, one may naively assume that then w2 can be solve from w1 after rewriting with the (now solved equality) (b ~ c). But this rewriting is ruled out by the isGoodRectDict! Conclusion, we will (correctly) end up with the unsolved goals (C a b, C a c) NB: The desugarer needs be more clever to deal with equalities that participate in recursive dictionary bindings. -} data LookupInstResult = NoInstance | GenInst [CtEvidence] EvTerm instance Outputable LookupInstResult where ppr NoInstance = text "NoInstance" ppr (GenInst ev t) = text "GenInst" <+> ppr ev <+> ppr t matchClassInst :: InertSet -> Class -> [Type] -> CtLoc -> TcS LookupInstResult matchClassInst _ clas [ ty ] _ | className clas == knownNatClassName , Just n <- isNumLitTy ty = makeDict (EvNum n) | className clas == knownSymbolClassName , Just s <- isStrLitTy ty = makeDict (EvStr s) where {- This adds a coercion that will convert the literal into a dictionary of the appropriate type. See Note [KnownNat & KnownSymbol and EvLit] in TcEvidence. The coercion happens in 2 steps: Integer -> SNat n -- representation of literal to singleton SNat n -> KnownNat n -- singleton to dictionary The process is mirrored for Symbols: String -> SSymbol n SSymbol n -> KnownSymbol n -} makeDict evLit | Just (_, co_dict) <- tcInstNewTyCon_maybe (classTyCon clas) [ty] -- co_dict :: KnownNat n ~ SNat n , [ meth ] <- classMethods clas , Just tcRep <- tyConAppTyCon_maybe -- SNat $ funResultTy -- SNat n $ dropForAlls -- KnownNat n => SNat n $ idType meth -- forall n. KnownNat n => SNat n , Just (_, co_rep) <- tcInstNewTyCon_maybe tcRep [ty] -- SNat n ~ Integer = return (GenInst [] $ mkEvCast (EvLit evLit) (mkTcSymCo (mkTcTransCo co_dict co_rep))) | otherwise = panicTcS (text "Unexpected evidence for" <+> ppr (className clas) $$ vcat (map (ppr . idType) (classMethods clas))) matchClassInst _ clas [k,t] loc | className clas == typeableClassName = matchTypeableClass clas k t loc matchClassInst inerts clas tys loc = do { dflags <- getDynFlags ; tclvl <- getTcLevel ; traceTcS "matchClassInst" $ vcat [ text "pred =" <+> ppr pred , text "inerts=" <+> ppr inerts , text "untouchables=" <+> ppr tclvl ] ; instEnvs <- getInstEnvs ; case lookupInstEnv instEnvs clas tys of ([], _, _) -- Nothing matches -> do { traceTcS "matchClass not matching" $ vcat [ text "dict" <+> ppr pred ] ; return NoInstance } ([(ispec, inst_tys)], [], _) -- A single match | not (xopt Opt_IncoherentInstances dflags) , given_overlap tclvl -> -- See Note [Instance and Given overlap] do { traceTcS "Delaying instance application" $ vcat [ text "Workitem=" <+> pprType (mkClassPred clas tys) , text "Relevant given dictionaries=" <+> ppr givens_for_this_clas ] ; return NoInstance } | otherwise -> do { let dfun_id = instanceDFunId ispec ; traceTcS "matchClass success" $ vcat [text "dict" <+> ppr pred, text "witness" <+> ppr dfun_id <+> ppr (idType dfun_id) ] -- Record that this dfun is needed ; match_one dfun_id inst_tys } (matches, _, _) -- More than one matches -- Defer any reactions of a multitude -- until we learn more about the reagent -> do { traceTcS "matchClass multiple matches, deferring choice" $ vcat [text "dict" <+> ppr pred, text "matches" <+> ppr matches] ; return NoInstance } } where pred = mkClassPred clas tys match_one :: DFunId -> [Maybe TcType] -> TcS LookupInstResult -- See Note [DFunInstType: instantiating types] in InstEnv match_one dfun_id mb_inst_tys = do { checkWellStagedDFun pred dfun_id loc ; (tys, dfun_phi) <- instDFunType dfun_id mb_inst_tys ; let (theta, _) = tcSplitPhiTy dfun_phi ; if null theta then return (GenInst [] (EvDFunApp dfun_id tys [])) else do { evc_vars <- instDFunConstraints loc theta ; let new_ev_vars = freshGoals evc_vars -- new_ev_vars are only the real new variables that can be emitted dfun_app = EvDFunApp dfun_id tys (map (ctEvTerm . fst) evc_vars) ; return $ GenInst new_ev_vars dfun_app } } givens_for_this_clas :: Cts givens_for_this_clas = filterBag isGivenCt (findDictsByClass (inert_dicts $ inert_cans inerts) clas) given_overlap :: TcLevel -> Bool given_overlap tclvl = anyBag (matchable tclvl) givens_for_this_clas matchable tclvl (CDictCan { cc_class = clas_g, cc_tyargs = sys , cc_ev = fl }) | isGiven fl = ASSERT( clas_g == clas ) case tcUnifyTys (\tv -> if isTouchableMetaTyVar tclvl tv && tv `elemVarSet` tyVarsOfTypes tys then BindMe else Skolem) tys sys of -- We can't learn anything more about any variable at this point, so the only -- cause of overlap can be by an instantiation of a touchable unification -- variable. Hence we only bind touchable unification variables. In addition, -- we use tcUnifyTys instead of tcMatchTys to rule out cyclic substitutions. Nothing -> False Just _ -> True | otherwise = False -- No overlap with a solved, already been taken care of -- by the overlap check with the instance environment. matchable _tys ct = pprPanic "Expecting dictionary!" (ppr ct) {- Note [Instance and Given overlap] ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~ Assume that we have an inert set that looks as follows: [Given] D [Int] And an instance declaration: instance C a => D [a] A new wanted comes along of the form: [Wanted] D [alpha] One possibility is to apply the instance declaration which will leave us with an unsolvable goal (C alpha). However, later on a new constraint may arise (for instance due to a functional dependency between two later dictionaries), that will add the equality (alpha ~ Int), in which case our ([Wanted] D [alpha]) will be transformed to [Wanted] D [Int], which could have been discharged by the given. The solution is that in matchClassInst and eventually in topReact, we get back with a matching instance, only when there is no Given in the inerts which is unifiable to this particular dictionary. The end effect is that, much as we do for overlapping instances, we delay choosing a class instance if there is a possibility of another instance OR a given to match our constraint later on. This fixes bugs #4981 and #5002. This is arguably not easy to appear in practice due to our aggressive prioritization of equality solving over other constraints, but it is possible. I've added a test case in typecheck/should-compile/GivenOverlapping.hs We ignore the overlap problem if -XIncoherentInstances is in force: see Trac #6002 for a worked-out example where this makes a difference. Moreover notice that our goals here are different than the goals of the top-level overlapping checks. There we are interested in validating the following principle: If we inline a function f at a site where the same global instance environment is available as the instance environment at the definition site of f then we should get the same behaviour. But for the Given Overlap check our goal is just related to completeness of constraint solving. -} -- | Assumes that we've checked that this is the 'Typeable' class, -- and it was applied to the correc arugment. matchTypeableClass :: Class -> Kind -> Type -> CtLoc -> TcS LookupInstResult matchTypeableClass clas k t loc | isForAllTy k = return NoInstance | Just (tc, ks_tys) <- splitTyConApp_maybe t = doTyConApp tc ks_tys | Just (f,kt) <- splitAppTy_maybe t = doTyApp f kt | Just _ <- isNumLitTy t = mkEv [] (EvTypeableTyLit t) | Just _ <- isStrLitTy t = mkEv [] (EvTypeableTyLit t) | otherwise = return NoInstance where -- Representation for type constructor applied to some kinds and some types. doTyConApp tc ks_ts = case mapM kindRep ks of Nothing -> return NoInstance -- Not concrete kinds Just kReps -> do tCts <- mapM subGoal ts mkEv tCts (EvTypeableTyCon tc kReps (map ctEvTerm tCts `zip` ts)) where (ks,ts) = span isKind ks_ts {- Representation for an application of a type to a type-or-kind. This may happen when the type expression starts with a type variable. Example (ignoring kind parameter): Typeable (f Int Char) --> (Typeable (f Int), Typeable Char) --> (Typeable f, Typeable Int, Typeable Char) --> (after some simp. steps) Typeable f -} doTyApp f tk | isKind tk = return NoInstance -- We can't solve until we know the ctr. | otherwise = do ct1 <- subGoal f ct2 <- subGoal tk mkEv [ct1,ct2] (EvTypeableTyApp (ctEvTerm ct1,f) (ctEvTerm ct2,tk)) -- Representation for concrete kinds. We just use the kind itself, -- but first check to make sure that it is "simple" (i.e., made entirely -- out of kind constructors). kindRep ki = do (_,ks) <- splitTyConApp_maybe ki mapM_ kindRep ks return ki -- Emit a `Typeable` constraint for the given type. subGoal ty = do let goal = mkClassPred clas [ typeKind ty, ty ] ev <- newWantedEvVarNC loc goal return ev mkEv subs ev = return (GenInst subs (EvTypeable ev))