{-# LANGUAGE CPP #-} {-# LANGUAGE MultiWayIf #-} {-# LANGUAGE TupleSections #-} {-# OPTIONS_GHC -Wno-incomplete-record-updates #-} {- (c) The University of Glasgow 2006 (c) The GRASP/AQUA Project, Glasgow University, 1992-1998 -} -- | Monadic type operations -- -- This module contains monadic operations over types that contain mutable type -- variables. module GHC.Tc.Utils.TcMType ( TcTyVar, TcKind, TcType, TcTauType, TcThetaType, TcTyVarSet, -------------------------------- -- Creating new mutable type variables newFlexiTyVar, newNamedFlexiTyVar, newFlexiTyVarTy, -- Kind -> TcM TcType newFlexiTyVarTys, -- Int -> Kind -> TcM [TcType] newOpenFlexiTyVar, newOpenFlexiTyVarTy, newOpenTypeKind, newOpenBoxedTypeKind, newMetaKindVar, newMetaKindVars, newMetaTyVarTyAtLevel, newAnonMetaTyVar, cloneMetaTyVar, newCycleBreakerTyVar, newMultiplicityVar, readMetaTyVar, writeMetaTyVar, writeMetaTyVarRef, newTauTvDetailsAtLevel, newMetaDetails, newMetaTyVarName, isFilledMetaTyVar_maybe, isFilledMetaTyVar, isUnfilledMetaTyVar, -------------------------------- -- Creating new evidence variables newEvVar, newEvVars, newDict, newWanted, newWanteds, cloneWanted, cloneWC, emitWanted, emitWantedEq, emitWantedEvVar, emitWantedEvVars, emitDerivedEqs, newTcEvBinds, newNoTcEvBinds, addTcEvBind, emitNewExprHole, newCoercionHole, fillCoercionHole, isFilledCoercionHole, unpackCoercionHole, unpackCoercionHole_maybe, checkCoercionHole, newImplication, -------------------------------- -- Instantiation newMetaTyVars, newMetaTyVarX, newMetaTyVarsX, newMetaTyVarTyVarX, newTyVarTyVar, cloneTyVarTyVar, newPatSigTyVar, newSkolemTyVar, newWildCardX, -------------------------------- -- Expected types ExpType(..), ExpSigmaType, ExpRhoType, mkCheckExpType, newInferExpType, tcInfer, readExpType, readExpType_maybe, readScaledExpType, expTypeToType, scaledExpTypeToType, checkingExpType_maybe, checkingExpType, inferResultToType, fillInferResult, promoteTcType, -------------------------------- -- Zonking and tidying zonkTidyTcType, zonkTidyTcTypes, zonkTidyOrigin, tidyEvVar, tidyCt, tidyHole, tidySkolemInfo, zonkTcTyVar, zonkTcTyVars, zonkTcTyVarToTyVar, zonkInvisTVBinder, zonkTyCoVarsAndFV, zonkTcTypeAndFV, zonkDTyCoVarSetAndFV, zonkTyCoVarsAndFVList, zonkTcType, zonkTcTypes, zonkCo, zonkTyCoVarKind, zonkTyCoVarKindBinder, zonkEvVar, zonkWC, zonkImplication, zonkSimples, zonkId, zonkCoVar, zonkCt, zonkSkolemInfo, --------------------------------- -- Promotion, defaulting, skolemisation defaultTyVar, promoteMetaTyVarTo, promoteTyVarSet, quantifyTyVars, isQuantifiableTv, skolemiseUnboundMetaTyVar, zonkAndSkolemise, skolemiseQuantifiedTyVar, doNotQuantifyTyVars, candidateQTyVarsOfType, candidateQTyVarsOfKind, candidateQTyVarsOfTypes, candidateQTyVarsOfKinds, CandidatesQTvs(..), delCandidates, candidateKindVars, partitionCandidates, ------------------------------ -- Levity polymorphism ensureNotLevPoly, checkForLevPoly, checkForLevPolyX, formatLevPolyErr ) where #include "HsVersions.h" -- friends: import GHC.Prelude import {-# SOURCE #-} GHC.Tc.Utils.Unify( unifyType {- , unifyKind -} ) import GHC.Core.TyCo.Rep import GHC.Core.TyCo.Ppr import GHC.Tc.Utils.TcType import GHC.Core.Type import GHC.Core.TyCon import GHC.Core.Coercion import GHC.Core.Class import GHC.Types.Var import GHC.Core.Predicate import GHC.Tc.Types.Origin -- others: import GHC.Tc.Utils.Monad -- TcType, amongst others import GHC.Tc.Types.Constraint import GHC.Tc.Types.Evidence import GHC.Types.Id as Id import GHC.Types.Name import GHC.Types.Var.Set import GHC.Builtin.Types import GHC.Types.Var.Env import GHC.Types.Name.Env import GHC.Utils.Misc import GHC.Utils.Outputable import GHC.Utils.Panic import GHC.Data.FastString import GHC.Data.Bag import GHC.Data.Pair import GHC.Types.Unique.Set import GHC.Driver.Session import GHC.Driver.Ppr import qualified GHC.LanguageExtensions as LangExt import GHC.Types.Basic ( TypeOrKind(..) ) import Control.Monad import GHC.Data.Maybe import qualified Data.Semigroup as Semi {- ************************************************************************ * * Kind variables * * ************************************************************************ -} newMetaKindVar :: TcM TcKind newMetaKindVar = do { details <- newMetaDetails TauTv ; name <- newMetaTyVarName (fsLit "k") -- All MetaKindVars are called "k" -- They may be jiggled by tidying ; let kv = mkTcTyVar name liftedTypeKind details ; traceTc "newMetaKindVar" (ppr kv) ; return (mkTyVarTy kv) } newMetaKindVars :: Int -> TcM [TcKind] newMetaKindVars n = replicateM n newMetaKindVar {- ************************************************************************ * * Evidence variables; range over constraints we can abstract over * * ************************************************************************ -} newEvVars :: TcThetaType -> TcM [EvVar] newEvVars theta = mapM newEvVar theta -------------- newEvVar :: TcPredType -> TcRnIf gbl lcl EvVar -- Creates new *rigid* variables for predicates newEvVar ty = do { name <- newSysName (predTypeOccName ty) ; return (mkLocalIdOrCoVar name Many ty) } newWanted :: CtOrigin -> Maybe TypeOrKind -> PredType -> TcM CtEvidence -- Deals with both equality and non-equality predicates newWanted orig t_or_k pty = do loc <- getCtLocM orig t_or_k d <- if isEqPrimPred pty then HoleDest <$> newCoercionHole pty else EvVarDest <$> newEvVar pty return $ CtWanted { ctev_dest = d , ctev_pred = pty , ctev_nosh = WDeriv , ctev_loc = loc } newWanteds :: CtOrigin -> ThetaType -> TcM [CtEvidence] newWanteds orig = mapM (newWanted orig Nothing) ---------------------------------------------- -- Cloning constraints ---------------------------------------------- cloneWanted :: Ct -> TcM Ct cloneWanted ct | ev@(CtWanted { ctev_pred = pty, ctev_dest = HoleDest _ }) <- ctEvidence ct = do { co_hole <- newCoercionHole pty ; return (mkNonCanonical (ev { ctev_dest = HoleDest co_hole })) } | otherwise = return ct cloneWC :: WantedConstraints -> TcM WantedConstraints -- Clone all the evidence bindings in -- a) the ic_bind field of any implications -- b) the CoercionHoles of any wanted constraints -- so that solving the WantedConstraints will not have any visible side -- effect, /except/ from causing unifications cloneWC wc@(WC { wc_simple = simples, wc_impl = implics }) = do { simples' <- mapBagM cloneWanted simples ; implics' <- mapBagM cloneImplication implics ; return (wc { wc_simple = simples', wc_impl = implics' }) } cloneImplication :: Implication -> TcM Implication cloneImplication implic@(Implic { ic_binds = binds, ic_wanted = inner_wanted }) = do { binds' <- cloneEvBindsVar binds ; inner_wanted' <- cloneWC inner_wanted ; return (implic { ic_binds = binds', ic_wanted = inner_wanted' }) } ---------------------------------------------- -- Emitting constraints ---------------------------------------------- -- | Emits a new Wanted. Deals with both equalities and non-equalities. emitWanted :: CtOrigin -> TcPredType -> TcM EvTerm emitWanted origin pty = do { ev <- newWanted origin Nothing pty ; emitSimple $ mkNonCanonical ev ; return $ ctEvTerm ev } emitDerivedEqs :: CtOrigin -> [(TcType,TcType)] -> TcM () -- Emit some new derived nominal equalities emitDerivedEqs origin pairs | null pairs = return () | otherwise = do { loc <- getCtLocM origin Nothing ; emitSimples (listToBag (map (mk_one loc) pairs)) } where mk_one loc (ty1, ty2) = mkNonCanonical $ CtDerived { ctev_pred = mkPrimEqPred ty1 ty2 , ctev_loc = loc } -- | Emits a new equality constraint emitWantedEq :: CtOrigin -> TypeOrKind -> Role -> TcType -> TcType -> TcM Coercion emitWantedEq origin t_or_k role ty1 ty2 = do { hole <- newCoercionHole pty ; loc <- getCtLocM origin (Just t_or_k) ; emitSimple $ mkNonCanonical $ CtWanted { ctev_pred = pty, ctev_dest = HoleDest hole , ctev_nosh = WDeriv, ctev_loc = loc } ; return (HoleCo hole) } where pty = mkPrimEqPredRole role ty1 ty2 -- | Creates a new EvVar and immediately emits it as a Wanted. -- No equality predicates here. emitWantedEvVar :: CtOrigin -> TcPredType -> TcM EvVar emitWantedEvVar origin ty = do { new_cv <- newEvVar ty ; loc <- getCtLocM origin Nothing ; let ctev = CtWanted { ctev_dest = EvVarDest new_cv , ctev_pred = ty , ctev_nosh = WDeriv , ctev_loc = loc } ; emitSimple $ mkNonCanonical ctev ; return new_cv } emitWantedEvVars :: CtOrigin -> [TcPredType] -> TcM [EvVar] emitWantedEvVars orig = mapM (emitWantedEvVar orig) -- | Emit a new wanted expression hole emitNewExprHole :: OccName -- of the hole -> Type -> TcM HoleExprRef emitNewExprHole occ ty = do { u <- newUnique ; ref <- newTcRef (pprPanic "unfilled unbound-variable evidence" (ppr u)) ; let her = HER ref ty u ; loc <- getCtLocM (ExprHoleOrigin occ) (Just TypeLevel) ; let hole = Hole { hole_sort = ExprHole her , hole_occ = occ , hole_ty = ty , hole_loc = loc } ; emitHole hole ; return her } newDict :: Class -> [TcType] -> TcM DictId newDict cls tys = do { name <- newSysName (mkDictOcc (getOccName cls)) ; return (mkLocalId name Many (mkClassPred cls tys)) } predTypeOccName :: PredType -> OccName predTypeOccName ty = case classifyPredType ty of ClassPred cls _ -> mkDictOcc (getOccName cls) EqPred {} -> mkVarOccFS (fsLit "co") IrredPred {} -> mkVarOccFS (fsLit "irred") ForAllPred {} -> mkVarOccFS (fsLit "df") -- | Create a new 'Implication' with as many sensible defaults for its fields -- as possible. Note that the 'ic_tclvl', 'ic_binds', and 'ic_info' fields do -- /not/ have sensible defaults, so they are initialized with lazy thunks that -- will 'panic' if forced, so one should take care to initialize these fields -- after creation. -- -- This is monadic to look up the 'TcLclEnv', which is used to initialize -- 'ic_env', and to set the -Winaccessible-code flag. See -- Note [Avoid -Winaccessible-code when deriving] in "GHC.Tc.TyCl.Instance". newImplication :: TcM Implication newImplication = do env <- getLclEnv warn_inaccessible <- woptM Opt_WarnInaccessibleCode return (implicationPrototype { ic_env = env , ic_warn_inaccessible = warn_inaccessible }) {- ************************************************************************ * * Coercion holes * * ************************************************************************ -} newCoercionHole :: TcPredType -> TcM CoercionHole newCoercionHole pred_ty = do { co_var <- newEvVar pred_ty ; traceTc "New coercion hole:" (ppr co_var) ; ref <- newMutVar Nothing ; return $ CoercionHole { ch_co_var = co_var, ch_ref = ref } } -- | Put a value in a coercion hole fillCoercionHole :: CoercionHole -> Coercion -> TcM () fillCoercionHole (CoercionHole { ch_ref = ref, ch_co_var = cv }) co = do { #if defined(DEBUG) ; cts <- readTcRef ref ; whenIsJust cts $ \old_co -> pprPanic "Filling a filled coercion hole" (ppr cv $$ ppr co $$ ppr old_co) #endif ; traceTc "Filling coercion hole" (ppr cv <+> text ":=" <+> ppr co) ; writeTcRef ref (Just co) } -- | Is a coercion hole filled in? isFilledCoercionHole :: CoercionHole -> TcM Bool isFilledCoercionHole (CoercionHole { ch_ref = ref }) = isJust <$> readTcRef ref -- | Retrieve the contents of a coercion hole. Panics if the hole -- is unfilled unpackCoercionHole :: CoercionHole -> TcM Coercion unpackCoercionHole hole = do { contents <- unpackCoercionHole_maybe hole ; case contents of Just co -> return co Nothing -> pprPanic "Unfilled coercion hole" (ppr hole) } -- | Retrieve the contents of a coercion hole, if it is filled unpackCoercionHole_maybe :: CoercionHole -> TcM (Maybe Coercion) unpackCoercionHole_maybe (CoercionHole { ch_ref = ref }) = readTcRef ref -- | Check that a coercion is appropriate for filling a hole. (The hole -- itself is needed only for printing.) -- Always returns the checked coercion, but this return value is necessary -- so that the input coercion is forced only when the output is forced. checkCoercionHole :: CoVar -> Coercion -> TcM Coercion checkCoercionHole cv co | debugIsOn = do { cv_ty <- zonkTcType (varType cv) -- co is already zonked, but cv might not be ; return $ ASSERT2( ok cv_ty , (text "Bad coercion hole" <+> ppr cv <> colon <+> vcat [ ppr t1, ppr t2, ppr role , ppr cv_ty ]) ) co } | otherwise = return co where (Pair t1 t2, role) = coercionKindRole co ok cv_ty | EqPred cv_rel cv_t1 cv_t2 <- classifyPredType cv_ty = t1 `eqType` cv_t1 && t2 `eqType` cv_t2 && role == eqRelRole cv_rel | otherwise = False {- ********************************************************************** * ExpType functions * ********************************************************************** -} {- Note [ExpType] ~~~~~~~~~~~~~~~~~ An ExpType is used as the "expected type" when type-checking an expression. An ExpType can hold a "hole" that can be filled in by the type-checker. This allows us to have one tcExpr that works in both checking mode and synthesis mode (that is, bidirectional type-checking). Previously, this was achieved by using ordinary unification variables, but we don't need or want that generality. (For example, #11397 was caused by doing the wrong thing with unification variables.) Instead, we observe that these holes should 1. never be nested 2. never appear as the type of a variable 3. be used linearly (never be duplicated) By defining ExpType, separately from Type, we can achieve goals 1 and 2 statically. See also [wiki:typechecking] Note [TcLevel of ExpType] ~~~~~~~~~~~~~~~~~~~~~~~~~ Consider data G a where MkG :: G Bool foo MkG = True This is a classic untouchable-variable / ambiguous GADT return type scenario. But, with ExpTypes, we'll be inferring the type of the RHS. We thus must track a TcLevel in an Inferring ExpType. If we try to fill the ExpType and find that the TcLevels don't work out, we fill the ExpType with a tau-tv at the low TcLevel, hopefully to be worked out later by some means -- see fillInferResult, and Note [fillInferResult] This behaviour triggered in test gadt/gadt-escape1. -} -- actual data definition is in GHC.Tc.Utils.TcType newInferExpType :: TcM ExpType newInferExpType = do { u <- newUnique ; tclvl <- getTcLevel ; traceTc "newInferExpType" (ppr u <+> ppr tclvl) ; ref <- newMutVar Nothing ; return (Infer (IR { ir_uniq = u, ir_lvl = tclvl , ir_ref = ref })) } -- | Extract a type out of an ExpType, if one exists. But one should always -- exist. Unless you're quite sure you know what you're doing. readExpType_maybe :: ExpType -> TcM (Maybe TcType) readExpType_maybe (Check ty) = return (Just ty) readExpType_maybe (Infer (IR { ir_ref = ref})) = readMutVar ref -- | Same as readExpType, but for Scaled ExpTypes readScaledExpType :: Scaled ExpType -> TcM (Scaled Type) readScaledExpType (Scaled m exp_ty) = do { ty <- readExpType exp_ty ; return (Scaled m ty) } -- | Extract a type out of an ExpType. Otherwise, panics. readExpType :: ExpType -> TcM TcType readExpType exp_ty = do { mb_ty <- readExpType_maybe exp_ty ; case mb_ty of Just ty -> return ty Nothing -> pprPanic "Unknown expected type" (ppr exp_ty) } -- | Returns the expected type when in checking mode. checkingExpType_maybe :: ExpType -> Maybe TcType checkingExpType_maybe (Check ty) = Just ty checkingExpType_maybe (Infer {}) = Nothing -- | Returns the expected type when in checking mode. Panics if in inference -- mode. checkingExpType :: String -> ExpType -> TcType checkingExpType _ (Check ty) = ty checkingExpType err et = pprPanic "checkingExpType" (text err $$ ppr et) scaledExpTypeToType :: Scaled ExpType -> TcM (Scaled TcType) scaledExpTypeToType (Scaled m exp_ty) = do { ty <- expTypeToType exp_ty ; return (Scaled m ty) } -- | Extracts the expected type if there is one, or generates a new -- TauTv if there isn't. expTypeToType :: ExpType -> TcM TcType expTypeToType (Check ty) = return ty expTypeToType (Infer inf_res) = inferResultToType inf_res inferResultToType :: InferResult -> TcM Type inferResultToType (IR { ir_uniq = u, ir_lvl = tc_lvl , ir_ref = ref }) = do { mb_inferred_ty <- readTcRef ref ; tau <- case mb_inferred_ty of Just ty -> do { ensureMonoType ty -- See Note [inferResultToType] ; return ty } Nothing -> do { rr <- newMetaTyVarTyAtLevel tc_lvl runtimeRepTy ; tau <- newMetaTyVarTyAtLevel tc_lvl (tYPE rr) -- See Note [TcLevel of ExpType] ; writeMutVar ref (Just tau) ; return tau } ; traceTc "Forcing ExpType to be monomorphic:" (ppr u <+> text ":=" <+> ppr tau) ; return tau } {- Note [inferResultToType] ~~~~~~~~~~~~~~~~~~~~~~~~~~~ expTypeToType and inferResultType convert an InferResult to a monotype. It must be a monotype because if the InferResult isn't already filled in, we fill it in with a unification variable (hence monotype). So to preserve order-independence we check for mono-type-ness even if it *is* filled in already. See also Note [TcLevel of ExpType] above, and Note [fillInferResult]. -} -- | Infer a type using a fresh ExpType -- See also Note [ExpType] in "GHC.Tc.Utils.TcMType" tcInfer :: (ExpSigmaType -> TcM a) -> TcM (a, TcSigmaType) tcInfer tc_check = do { res_ty <- newInferExpType ; result <- tc_check res_ty ; res_ty <- readExpType res_ty ; return (result, res_ty) } fillInferResult :: TcType -> InferResult -> TcM TcCoercionN -- If co = fillInferResult t1 t2 -- => co :: t1 ~ t2 -- See Note [fillInferResult] fillInferResult act_res_ty (IR { ir_uniq = u, ir_lvl = res_lvl , ir_ref = ref }) = do { mb_exp_res_ty <- readTcRef ref ; case mb_exp_res_ty of Just exp_res_ty -> do { traceTc "Joining inferred ExpType" $ ppr u <> colon <+> ppr act_res_ty <+> char '~' <+> ppr exp_res_ty ; cur_lvl <- getTcLevel ; unless (cur_lvl `sameDepthAs` res_lvl) $ ensureMonoType act_res_ty ; unifyType Nothing act_res_ty exp_res_ty } Nothing -> do { traceTc "Filling inferred ExpType" $ ppr u <+> text ":=" <+> ppr act_res_ty ; (prom_co, act_res_ty) <- promoteTcType res_lvl act_res_ty ; writeTcRef ref (Just act_res_ty) ; return prom_co } } {- Note [fillInferResult] ~~~~~~~~~~~~~~~~~~~~~~~~~ When inferring, we use fillInferResult to "fill in" the hole in InferResult data InferResult = IR { ir_uniq :: Unique , ir_lvl :: TcLevel , ir_ref :: IORef (Maybe TcType) } There are two things to worry about: 1. What if it is under a GADT or existential pattern match? - GADTs: a unification variable (and Infer's hole is similar) is untouchable - Existentials: be careful about skolem-escape 2. What if it is filled in more than once? E.g. multiple branches of a case case e of T1 -> e1 T2 -> e2 Our typing rules are: * The RHS of a existential or GADT alternative must always be a monotype, regardless of the number of alternatives. * Multiple non-existential/GADT branches can have (the same) higher rank type (#18412). E.g. this is OK: case e of True -> hr False -> hr where hr:: (forall a. a->a) -> Int c.f. Section 7.1 of "Practical type inference for arbitrary-rank types" We use choice (2) in that Section. (GHC 8.10 and earlier used choice (1).) But note that case e of True -> hr False -> \x -> hr x will fail, because we still /infer/ both branches, so the \x will get a (monotype) unification variable, which will fail to unify with (forall a. a->a) For (1) we can detect the GADT/existential situation by seeing that the current TcLevel is greater than that stored in ir_lvl of the Infer ExpType. We bump the level whenever we go past a GADT/existential match. Then, before filling the hole use promoteTcType to promote the type to the outer ir_lvl. promoteTcType does this - create a fresh unification variable alpha at level ir_lvl - emits an equality alpha[ir_lvl] ~ ty - fills the hole with alpha That forces the type to be a monotype (since unification variables can only unify with monotypes); and catches skolem-escapes because the alpha is untouchable until the equality floats out. For (2), we simply look to see if the hole is filled already. - if not, we promote (as above) and fill the hole - if it is filled, we simply unify with the type that is already there There is one wrinkle. Suppose we have case e of T1 -> e1 :: (forall a. a->a) -> Int G2 -> e2 where T1 is not GADT or existential, but G2 is a GADT. Then supppose the T1 alternative fills the hole with (forall a. a->a) -> Int, which is fine. But now the G2 alternative must not *just* unify with that else we'd risk allowing through (e2 :: (forall a. a->a) -> Int). If we'd checked G2 first we'd have filled the hole with a unification variable, which enforces a monotype. So if we check G2 second, we still want to emit a constraint that restricts the RHS to be a monotype. This is done by ensureMonoType, and it works by simply generating a constraint (alpha ~ ty), where alpha is a fresh unification variable. We discard the evidence. -} {- ********************************************************************* * * Promoting types * * ********************************************************************* -} ensureMonoType :: TcType -> TcM () -- Assuming that the argument type is of kind (TYPE r), -- ensure that it is a /monotype/ -- If it is not a monotype we can see right away (since unification -- varibles and type-function applications stand for monotypes), but -- we emit a Wanted equality just to delay the error message until later ensureMonoType res_ty | isTauTy res_ty -- isTauTy doesn't need zonking or anything = return () | otherwise = do { mono_ty <- newOpenFlexiTyVarTy ; let eq_orig = TypeEqOrigin { uo_actual = res_ty , uo_expected = mono_ty , uo_thing = Nothing , uo_visible = False } ; _co <- emitWantedEq eq_orig TypeLevel Nominal res_ty mono_ty ; return () } promoteTcType :: TcLevel -> TcType -> TcM (TcCoercionN, TcType) -- See Note [Promoting a type] -- See also Note [fillInferResult] -- promoteTcType level ty = (co, ty') -- * Returns ty' whose max level is just 'level' -- and whose kind is ~# to the kind of 'ty' -- and whose kind has form TYPE rr -- * and co :: ty ~ ty' -- * and emits constraints to justify the coercion -- -- NB: we expect that 'ty' has already kind (TYPE rr) for -- some rr::RuntimeRep. It is, after all, the type of a term. promoteTcType dest_lvl ty = do { cur_lvl <- getTcLevel ; if (cur_lvl `sameDepthAs` dest_lvl) then return (mkTcNomReflCo ty, ty) else promote_it } where promote_it :: TcM (TcCoercion, TcType) promote_it -- Emit a constraint (alpha :: TYPE rr) ~ ty -- where alpha and rr are fresh and from level dest_lvl = do { rr <- newMetaTyVarTyAtLevel dest_lvl runtimeRepTy ; prom_ty <- newMetaTyVarTyAtLevel dest_lvl (tYPE rr) ; let eq_orig = TypeEqOrigin { uo_actual = ty , uo_expected = prom_ty , uo_thing = Nothing , uo_visible = False } ; co <- emitWantedEq eq_orig TypeLevel Nominal ty prom_ty ; return (co, prom_ty) } {- Note [Promoting a type] ~~~~~~~~~~~~~~~~~~~~~~~~~~ Consider (#12427) data T where MkT :: (Int -> Int) -> a -> T h y = case y of MkT v w -> v We'll infer the RHS type with an expected type ExpType of (IR { ir_lvl = l, ir_ref = ref, ... ) where 'l' is the TcLevel of the RHS of 'h'. Then the MkT pattern match will increase the level, so we'll end up in tcSubType, trying to unify the type of v, v :: Int -> Int with the expected type. But this attempt takes place at level (l+1), rightly so, since v's type could have mentioned existential variables, (like w's does) and we want to catch that. So we - create a new meta-var alpha[l+1] - fill in the InferRes ref cell 'ref' with alpha - emit an equality constraint, thus [W] alpha[l+1] ~ (Int -> Int) That constraint will float outwards, as it should, unless v's type mentions a skolem-captured variable. This approach fails if v has a higher rank type; see Note [Promotion and higher rank types] Note [Promotion and higher rank types] ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~ If v had a higher-rank type, say v :: (forall a. a->a) -> Int, then we'd emit an equality [W] alpha[l+1] ~ ((forall a. a->a) -> Int) which will sadly fail because we can't unify a unification variable with a polytype. But there is nothing really wrong with the program here. We could just about solve this by "promote the type" of v, to expose its polymorphic "shape" while still leaving constraints that will prevent existential escape. But we must be careful! Exposing the "shape" of the type is precisely what we must NOT do under a GADT pattern match! So in this case we might promote the type to (forall a. a->a) -> alpha[l+1] and emit the constraint [W] alpha[l+1] ~ Int Now the promoted type can fill the ref cell, while the emitted equality can float or not, according to the usual rules. But that's not quite right! We are exposing the arrow! We could deal with that too: (forall a. mu[l+1] a a) -> alpha[l+1] with constraints [W] alpha[l+1] ~ Int [W] mu[l+1] ~ (->) Here we abstract over the '->' inside the forall, in case that is subject to an equality constraint from a GADT match. Note that we kept the outer (->) because that's part of the polymorphic "shape". And because of impredicativity, GADT matches can't give equalities that affect polymorphic shape. This reasoning just seems too complicated, so I decided not to do it. These higher-rank notes are just here to record the thinking. -} {- ********************************************************************* * * MetaTvs (meta type variables; mutable) * * ********************************************************************* -} {- Note [TyVarTv] ~~~~~~~~~~~~~~~~~ A TyVarTv can unify with type *variables* only, including other TyVarTvs and skolems. They are used in two places: 1. In kind signatures, see GHC.Tc.TyCl Note [Inferring kinds for type declarations] and Note [Kind checking for GADTs] 2. In partial type signatures. See GHC.Tc.Types Note [Quantified variables in partial type signatures] Sometimes, they can unify with type variables that the user would rather keep distinct; see #11203 for an example. So, any client of this function needs to either allow the TyVarTvs to unify with each other or check that they don't. In the case of (1) the check is done in GHC.Tc.TyCl.swizzleTcTyConBndrs. In case of (2) it's done by findDupTyVarTvs in GHC.Tc.Gen.Bind.chooseInferredQuantifiers. Historical note: Before #15050 this (under the name SigTv) was also used for ScopedTypeVariables in patterns, to make sure these type variables only refer to other type variables, but this restriction was dropped, and ScopedTypeVariables can now refer to full types (GHC Proposal 29). -} newMetaTyVarName :: FastString -> TcM Name -- Makes a /System/ Name, which is eagerly eliminated by -- the unifier; see GHC.Tc.Utils.Unify.nicer_to_update_tv1, and -- GHC.Tc.Solver.Canonical.canEqTyVarTyVar (nicer_to_update_tv2) newMetaTyVarName str = do { uniq <- newUnique ; return (mkSystemName uniq (mkTyVarOccFS str)) } cloneMetaTyVarName :: Name -> TcM Name cloneMetaTyVarName name = do { uniq <- newUnique ; return (mkSystemName uniq (nameOccName name)) } -- See Note [Name of an instantiated type variable] {- Note [Name of an instantiated type variable] ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~ At the moment we give a unification variable a System Name, which influences the way it is tidied; see TypeRep.tidyTyVarBndr. -} metaInfoToTyVarName :: MetaInfo -> FastString metaInfoToTyVarName meta_info = case meta_info of TauTv -> fsLit "t" TyVarTv -> fsLit "a" RuntimeUnkTv -> fsLit "r" CycleBreakerTv -> fsLit "b" newAnonMetaTyVar :: MetaInfo -> Kind -> TcM TcTyVar newAnonMetaTyVar mi = newNamedAnonMetaTyVar (metaInfoToTyVarName mi) mi newNamedAnonMetaTyVar :: FastString -> MetaInfo -> Kind -> TcM TcTyVar -- Make a new meta tyvar out of thin air newNamedAnonMetaTyVar tyvar_name meta_info kind = do { name <- newMetaTyVarName tyvar_name ; details <- newMetaDetails meta_info ; let tyvar = mkTcTyVar name kind details ; traceTc "newAnonMetaTyVar" (ppr tyvar) ; return tyvar } -- makes a new skolem tv newSkolemTyVar :: Name -> Kind -> TcM TcTyVar newSkolemTyVar name kind = do { lvl <- getTcLevel ; return (mkTcTyVar name kind (SkolemTv lvl False)) } newTyVarTyVar :: Name -> Kind -> TcM TcTyVar -- See Note [TyVarTv] -- Does not clone a fresh unique newTyVarTyVar name kind = do { details <- newMetaDetails TyVarTv ; let tyvar = mkTcTyVar name kind details ; traceTc "newTyVarTyVar" (ppr tyvar) ; return tyvar } cloneTyVarTyVar :: Name -> Kind -> TcM TcTyVar -- See Note [TyVarTv] -- Clones a fresh unique cloneTyVarTyVar name kind = do { details <- newMetaDetails TyVarTv ; uniq <- newUnique ; let name' = name `setNameUnique` uniq tyvar = mkTcTyVar name' kind details -- Don't use cloneMetaTyVar, which makes a SystemName -- We want to keep the original more user-friendly Name -- In practical terms that means that in error messages, -- when the Name is tidied we get 'a' rather than 'a0' ; traceTc "cloneTyVarTyVar" (ppr tyvar) ; return tyvar } newPatSigTyVar :: Name -> Kind -> TcM TcTyVar newPatSigTyVar name kind = do { details <- newMetaDetails TauTv ; uniq <- newUnique ; let name' = name `setNameUnique` uniq tyvar = mkTcTyVar name' kind details -- Don't use cloneMetaTyVar; -- same reasoning as in newTyVarTyVar ; traceTc "newPatSigTyVar" (ppr tyvar) ; return tyvar } cloneAnonMetaTyVar :: MetaInfo -> TyVar -> TcKind -> TcM TcTyVar -- Make a fresh MetaTyVar, basing the name -- on that of the supplied TyVar cloneAnonMetaTyVar info tv kind = do { details <- newMetaDetails info ; name <- cloneMetaTyVarName (tyVarName tv) ; let tyvar = mkTcTyVar name kind details ; traceTc "cloneAnonMetaTyVar" (ppr tyvar <+> dcolon <+> ppr (tyVarKind tyvar)) ; return tyvar } -- Make a new CycleBreakerTv. See Note [Type equality cycles] -- in GHC.Tc.Solver.Canonical. newCycleBreakerTyVar :: TcKind -> TcM TcTyVar newCycleBreakerTyVar kind = do { details <- newMetaDetails CycleBreakerTv ; name <- newMetaTyVarName (fsLit "cbv") ; return (mkTcTyVar name kind details) } newMetaDetails :: MetaInfo -> TcM TcTyVarDetails newMetaDetails info = do { ref <- newMutVar Flexi ; tclvl <- getTcLevel ; return (MetaTv { mtv_info = info , mtv_ref = ref , mtv_tclvl = tclvl }) } newTauTvDetailsAtLevel :: TcLevel -> TcM TcTyVarDetails newTauTvDetailsAtLevel tclvl = do { ref <- newMutVar Flexi ; return (MetaTv { mtv_info = TauTv , mtv_ref = ref , mtv_tclvl = tclvl }) } cloneMetaTyVar :: TcTyVar -> TcM TcTyVar cloneMetaTyVar tv = ASSERT( isTcTyVar tv ) do { ref <- newMutVar Flexi ; name' <- cloneMetaTyVarName (tyVarName tv) ; let details' = case tcTyVarDetails tv of details@(MetaTv {}) -> details { mtv_ref = ref } _ -> pprPanic "cloneMetaTyVar" (ppr tv) tyvar = mkTcTyVar name' (tyVarKind tv) details' ; traceTc "cloneMetaTyVar" (ppr tyvar) ; return tyvar } -- Works for both type and kind variables readMetaTyVar :: TyVar -> TcM MetaDetails readMetaTyVar tyvar = ASSERT2( isMetaTyVar tyvar, ppr tyvar ) readMutVar (metaTyVarRef tyvar) isFilledMetaTyVar_maybe :: TcTyVar -> TcM (Maybe Type) isFilledMetaTyVar_maybe tv | MetaTv { mtv_ref = ref } <- tcTyVarDetails tv = do { cts <- readTcRef ref ; case cts of Indirect ty -> return (Just ty) Flexi -> return Nothing } | otherwise = return Nothing isFilledMetaTyVar :: TyVar -> TcM Bool -- True of a filled-in (Indirect) meta type variable isFilledMetaTyVar tv = isJust <$> isFilledMetaTyVar_maybe tv isUnfilledMetaTyVar :: TyVar -> TcM Bool -- True of a un-filled-in (Flexi) meta type variable -- NB: Not the opposite of isFilledMetaTyVar isUnfilledMetaTyVar tv | MetaTv { mtv_ref = ref } <- tcTyVarDetails tv = do { details <- readMutVar ref ; return (isFlexi details) } | otherwise = return False -------------------- -- Works with both type and kind variables writeMetaTyVar :: TcTyVar -> TcType -> TcM () -- Write into a currently-empty MetaTyVar writeMetaTyVar tyvar ty | not debugIsOn = writeMetaTyVarRef tyvar (metaTyVarRef tyvar) ty -- Everything from here on only happens if DEBUG is on | not (isTcTyVar tyvar) = ASSERT2( False, text "Writing to non-tc tyvar" <+> ppr tyvar ) return () | MetaTv { mtv_ref = ref } <- tcTyVarDetails tyvar = writeMetaTyVarRef tyvar ref ty | otherwise = ASSERT2( False, text "Writing to non-meta tyvar" <+> ppr tyvar ) return () -------------------- writeMetaTyVarRef :: TcTyVar -> TcRef MetaDetails -> TcType -> TcM () -- Here the tyvar is for error checking only; -- the ref cell must be for the same tyvar writeMetaTyVarRef tyvar ref ty | not debugIsOn = do { traceTc "writeMetaTyVar" (ppr tyvar <+> dcolon <+> ppr (tyVarKind tyvar) <+> text ":=" <+> ppr ty) ; writeTcRef ref (Indirect ty) } -- Everything from here on only happens if DEBUG is on -- Need to zonk 'ty' because we may only recently have promoted -- its free meta-tyvars (see Solver.Interact.tryToSolveByUnification) | otherwise = do { meta_details <- readMutVar ref; -- Zonk kinds to allow the error check to work ; zonked_tv_kind <- zonkTcType tv_kind ; zonked_ty <- zonkTcType ty ; let zonked_ty_kind = tcTypeKind zonked_ty zonked_ty_lvl = tcTypeLevel zonked_ty level_check_ok = not (zonked_ty_lvl `strictlyDeeperThan` tv_lvl) level_check_msg = ppr zonked_ty_lvl $$ ppr tv_lvl $$ ppr tyvar $$ ppr ty kind_check_ok = tcIsConstraintKind zonked_tv_kind || tcEqKind zonked_ty_kind zonked_tv_kind -- Hack alert! tcIsConstraintKind: see GHC.Tc.Gen.HsType -- Note [Extra-constraint holes in partial type signatures] kind_msg = hang (text "Ill-kinded update to meta tyvar") 2 ( ppr tyvar <+> text "::" <+> (ppr tv_kind $$ ppr zonked_tv_kind) <+> text ":=" <+> ppr ty <+> text "::" <+> (ppr zonked_ty_kind) ) ; traceTc "writeMetaTyVar" (ppr tyvar <+> text ":=" <+> ppr ty) -- Check for double updates ; MASSERT2( isFlexi meta_details, double_upd_msg meta_details ) -- Check for level OK ; MASSERT2( level_check_ok, level_check_msg ) -- Check Kinds ok ; MASSERT2( kind_check_ok, kind_msg ) -- Do the write ; writeMutVar ref (Indirect ty) } where tv_kind = tyVarKind tyvar tv_lvl = tcTyVarLevel tyvar double_upd_msg details = hang (text "Double update of meta tyvar") 2 (ppr tyvar $$ ppr details) {- ************************************************************************ * * MetaTvs: TauTvs * * ************************************************************************ Note [Never need to instantiate coercion variables] ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~ With coercion variables sloshing around in types, it might seem that we sometimes need to instantiate coercion variables. This would be problematic, because coercion variables inhabit unboxed equality (~#), and the constraint solver thinks in terms only of boxed equality (~). The solution is that we never need to instantiate coercion variables in the first place. The tyvars that we need to instantiate come from the types of functions, data constructors, and patterns. These will never be quantified over coercion variables, except for the special case of the promoted Eq#. But, that can't ever appear in user code, so we're safe! -} newMultiplicityVar :: TcM TcType newMultiplicityVar = newFlexiTyVarTy multiplicityTy newFlexiTyVar :: Kind -> TcM TcTyVar newFlexiTyVar kind = newAnonMetaTyVar TauTv kind -- | Create a new flexi ty var with a specific name newNamedFlexiTyVar :: FastString -> Kind -> TcM TcTyVar newNamedFlexiTyVar fs kind = newNamedAnonMetaTyVar fs TauTv kind newFlexiTyVarTy :: Kind -> TcM TcType newFlexiTyVarTy kind = do tc_tyvar <- newFlexiTyVar kind return (mkTyVarTy tc_tyvar) newFlexiTyVarTys :: Int -> Kind -> TcM [TcType] newFlexiTyVarTys n kind = replicateM n (newFlexiTyVarTy kind) newOpenTypeKind :: TcM TcKind newOpenTypeKind = do { rr <- newFlexiTyVarTy runtimeRepTy ; return (tYPE rr) } -- | Create a tyvar that can be a lifted or unlifted type. -- Returns alpha :: TYPE kappa, where both alpha and kappa are fresh newOpenFlexiTyVarTy :: TcM TcType newOpenFlexiTyVarTy = do { tv <- newOpenFlexiTyVar ; return (mkTyVarTy tv) } newOpenFlexiTyVar :: TcM TcTyVar newOpenFlexiTyVar = do { kind <- newOpenTypeKind ; newFlexiTyVar kind } newOpenBoxedTypeKind :: TcM TcKind newOpenBoxedTypeKind = do { lev <- newFlexiTyVarTy (mkTyConTy levityTyCon) ; let rr = mkTyConApp boxedRepDataConTyCon [lev] ; return (tYPE rr) } newMetaTyVars :: [TyVar] -> TcM (TCvSubst, [TcTyVar]) -- Instantiate with META type variables -- Note that this works for a sequence of kind, type, and coercion variables -- variables. Eg [ (k:*), (a:k->k) ] -- Gives [ (k7:*), (a8:k7->k7) ] newMetaTyVars = newMetaTyVarsX emptyTCvSubst -- emptyTCvSubst has an empty in-scope set, but that's fine here -- Since the tyvars are freshly made, they cannot possibly be -- captured by any existing for-alls. newMetaTyVarsX :: TCvSubst -> [TyVar] -> TcM (TCvSubst, [TcTyVar]) -- Just like newMetaTyVars, but start with an existing substitution. newMetaTyVarsX subst = mapAccumLM newMetaTyVarX subst newMetaTyVarX :: TCvSubst -> TyVar -> TcM (TCvSubst, TcTyVar) -- Make a new unification variable tyvar whose Name and Kind come from -- an existing TyVar. We substitute kind variables in the kind. newMetaTyVarX = new_meta_tv_x TauTv newMetaTyVarTyVarX :: TCvSubst -> TyVar -> TcM (TCvSubst, TcTyVar) -- Just like newMetaTyVarX, but make a TyVarTv newMetaTyVarTyVarX = new_meta_tv_x TyVarTv newWildCardX :: TCvSubst -> TyVar -> TcM (TCvSubst, TcTyVar) newWildCardX subst tv = do { new_tv <- newAnonMetaTyVar TauTv (substTy subst (tyVarKind tv)) ; return (extendTvSubstWithClone subst tv new_tv, new_tv) } new_meta_tv_x :: MetaInfo -> TCvSubst -> TyVar -> TcM (TCvSubst, TcTyVar) new_meta_tv_x info subst tv = do { new_tv <- cloneAnonMetaTyVar info tv substd_kind ; let subst1 = extendTvSubstWithClone subst tv new_tv ; return (subst1, new_tv) } where substd_kind = substTyUnchecked subst (tyVarKind tv) -- NOTE: #12549 is fixed so we could use -- substTy here, but the tc_infer_args problem -- is not yet fixed so leaving as unchecked for now. -- OLD NOTE: -- Unchecked because we call newMetaTyVarX from -- tcInstTyBinder, which is called from tcInferTyApps -- which does not yet take enough trouble to ensure -- the in-scope set is right; e.g. #12785 trips -- if we use substTy here newMetaTyVarTyAtLevel :: TcLevel -> TcKind -> TcM TcType newMetaTyVarTyAtLevel tc_lvl kind = do { details <- newTauTvDetailsAtLevel tc_lvl ; name <- newMetaTyVarName (fsLit "p") ; return (mkTyVarTy (mkTcTyVar name kind details)) } {- ********************************************************************* * * Finding variables to quantify over * * ********************************************************************* -} {- Note [Dependent type variables] ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~ In Haskell type inference we quantify over type variables; but we only quantify over /kind/ variables when -XPolyKinds is on. Without -XPolyKinds we default the kind variables to *. So, to support this defaulting, and only for that reason, when collecting the free vars of a type (in candidateQTyVarsOfType and friends), prior to quantifying, we must keep the type and kind variables separate. But what does that mean in a system where kind variables /are/ type variables? It's a fairly arbitrary distinction based on how the variables appear: - "Kind variables" appear in the kind of some other free variable or in the kind of a locally quantified type variable (forall (a :: kappa). ...) or in the kind of a coercion (a |> (co :: kappa1 ~ kappa2)). These are the ones we default to * if -XPolyKinds is off - "Type variables" are all free vars that are not kind variables E.g. In the type T k (a::k) 'k' is a kind variable, because it occurs in the kind of 'a', even though it also appears at "top level" of the type 'a' is a type variable, because it doesn't We gather these variables using a CandidatesQTvs record: DV { dv_kvs: Variables free in the kind of a free type variable or of a forall-bound type variable , dv_tvs: Variables syntactically free in the type } So: dv_kvs are the kind variables of the type (dv_tvs - dv_kvs) are the type variable of the type Note that * A variable can occur in both. T k (x::k) The first occurrence of k makes it show up in dv_tvs, the second in dv_kvs * We include any coercion variables in the "dependent", "kind-variable" set because we never quantify over them. * The "kind variables" might depend on each other; e.g (k1 :: k2), (k2 :: *) The "type variables" do not depend on each other; if one did, it'd be classified as a kind variable! Note [CandidatesQTvs determinism and order] ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~ * Determinism: when we quantify over type variables we decide the order in which they appear in the final type. Because the order of type variables in the type can end up in the interface file and affects some optimizations like worker-wrapper, we want this order to be deterministic. To achieve that we use deterministic sets of variables that can be converted to lists in a deterministic order. For more information about deterministic sets see Note [Deterministic UniqFM] in GHC.Types.Unique.DFM. * Order: as well as being deterministic, we use an accumulating-parameter style for candidateQTyVarsOfType so that we add variables one at a time, left to right. That means we tend to produce the variables in left-to-right order. This is just to make it bit more predictable for the programmer. Note [Naughty quantification candidates] ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~ Consider (#14880, dependent/should_compile/T14880-2), suppose we are trying to generalise this type: forall arg. ... (alpha[tau]:arg) ... We have a metavariable alpha whose kind mentions a skolem variable bound inside the very type we are generalising. This can arise while type-checking a user-written type signature (see the test case for the full code). We cannot generalise over alpha! That would produce a type like forall {a :: arg}. forall arg. ...blah... The fact that alpha's kind mentions arg renders it completely ineligible for generalisation. However, we are not going to learn any new constraints on alpha, because its kind isn't even in scope in the outer context (but see Wrinkle). So alpha is entirely unconstrained. What then should we do with alpha? During generalization, every metavariable is either (A) promoted, (B) generalized, or (C) zapped (according to Note [Recipe for checking a signature] in GHC.Tc.Gen.HsType). * We can't generalise it. * We can't promote it, because its kind prevents that * We can't simply leave it be, because this type is about to go into the typing environment (as the type of some let-bound variable, say), and then chaos erupts when we try to instantiate. Previously, we zapped it to Any. This worked, but it had the unfortunate effect of causing Any sometimes to appear in error messages. If this kind of signature happens, the user probably has made a mistake -- no one really wants Any in their types. So we now error. This must be a hard error (failure in the monad) to avoid other messages from mentioning Any. We do this eager erroring in candidateQTyVars, which always precedes generalisation, because at that moment we have a clear picture of what skolems are in scope within the type itself (e.g. that 'forall arg'). This change is inspired by and described in Section 7.2 of "Kind Inference for Datatypes", POPL'20. Wrinkle: We must make absolutely sure that alpha indeed is not from an outer context. (Otherwise, we might indeed learn more information about it.) This can be done easily: we just check alpha's TcLevel. That level must be strictly greater than the ambient TcLevel in order to treat it as naughty. We say "strictly greater than" because the call to candidateQTyVars is made outside the bumped TcLevel, as stated in the comment to candidateQTyVarsOfType. The level check is done in go_tv in collect_cand_qtvs. Skipping this check caused #16517. -} data CandidatesQTvs -- See Note [Dependent type variables] -- See Note [CandidatesQTvs determinism and order] -- -- Invariants: -- * All variables are fully zonked, including their kinds -- * All variables are at a level greater than the ambient level -- See Note [Use level numbers for quantification] -- -- This *can* contain skolems. For example, in `data X k :: k -> Type` -- we need to know that the k is a dependent variable. This is done -- by collecting the candidates in the kind after skolemising. It also -- comes up when generalizing a associated type instance, where instance -- variables are skolems. (Recall that associated type instances are generalized -- independently from their enclosing class instance, and the associated -- type instance may be generalized by more, fewer, or different variables -- than the class instance.) -- = DV { dv_kvs :: DTyVarSet -- "kind" metavariables (dependent) , dv_tvs :: DTyVarSet -- "type" metavariables (non-dependent) -- A variable may appear in both sets -- E.g. T k (x::k) The first occurrence of k makes it -- show up in dv_tvs, the second in dv_kvs -- See Note [Dependent type variables] , dv_cvs :: CoVarSet -- These are covars. Included only so that we don't repeatedly -- look at covars' kinds in accumulator. Not used by quantifyTyVars. } instance Semi.Semigroup CandidatesQTvs where (DV { dv_kvs = kv1, dv_tvs = tv1, dv_cvs = cv1 }) <> (DV { dv_kvs = kv2, dv_tvs = tv2, dv_cvs = cv2 }) = DV { dv_kvs = kv1 `unionDVarSet` kv2 , dv_tvs = tv1 `unionDVarSet` tv2 , dv_cvs = cv1 `unionVarSet` cv2 } instance Monoid CandidatesQTvs where mempty = DV { dv_kvs = emptyDVarSet, dv_tvs = emptyDVarSet, dv_cvs = emptyVarSet } mappend = (Semi.<>) instance Outputable CandidatesQTvs where ppr (DV {dv_kvs = kvs, dv_tvs = tvs, dv_cvs = cvs }) = text "DV" <+> braces (pprWithCommas id [ text "dv_kvs =" <+> ppr kvs , text "dv_tvs =" <+> ppr tvs , text "dv_cvs =" <+> ppr cvs ]) isEmptyCandidates :: CandidatesQTvs -> Bool isEmptyCandidates (DV { dv_kvs = kvs, dv_tvs = tvs }) = isEmptyDVarSet kvs && isEmptyDVarSet tvs -- | Extract out the kind vars (in order) and type vars (in order) from -- a 'CandidatesQTvs'. The lists are guaranteed to be distinct. Keeping -- the lists separate is important only in the -XNoPolyKinds case. candidateVars :: CandidatesQTvs -> ([TcTyVar], [TcTyVar]) candidateVars (DV { dv_kvs = dep_kv_set, dv_tvs = nondep_tkv_set }) = (dep_kvs, nondep_tvs) where dep_kvs = scopedSort $ dVarSetElems dep_kv_set -- scopedSort: put the kind variables into -- well-scoped order. -- E.g. [k, (a::k)] not the other way round nondep_tvs = dVarSetElems (nondep_tkv_set `minusDVarSet` dep_kv_set) -- See Note [Dependent type variables] -- The `minus` dep_tkvs removes any kind-level vars -- e.g. T k (a::k) Since k appear in a kind it'll -- be in dv_kvs, and is dependent. So remove it from -- dv_tvs which will also contain k -- NB kinds of tvs are already zonked candidateKindVars :: CandidatesQTvs -> TyVarSet candidateKindVars dvs = dVarSetToVarSet (dv_kvs dvs) partitionCandidates :: CandidatesQTvs -> (TyVar -> Bool) -> (TyVarSet, CandidatesQTvs) -- The selected TyVars are returned as a non-deterministic TyVarSet partitionCandidates dvs@(DV { dv_kvs = kvs, dv_tvs = tvs }) pred = (extracted, dvs { dv_kvs = rest_kvs, dv_tvs = rest_tvs }) where (extracted_kvs, rest_kvs) = partitionDVarSet pred kvs (extracted_tvs, rest_tvs) = partitionDVarSet pred tvs extracted = dVarSetToVarSet extracted_kvs `unionVarSet` dVarSetToVarSet extracted_tvs -- | Gathers free variables to use as quantification candidates (in -- 'quantifyTyVars'). This might output the same var -- in both sets, if it's used in both a type and a kind. -- The variables to quantify must have a TcLevel strictly greater than -- the ambient level. (See Wrinkle in Note [Naughty quantification candidates]) -- See Note [CandidatesQTvs determinism and order] -- See Note [Dependent type variables] candidateQTyVarsOfType :: TcType -- not necessarily zonked -> TcM CandidatesQTvs candidateQTyVarsOfType ty = collect_cand_qtvs ty False emptyVarSet mempty ty -- | Like 'candidateQTyVarsOfType', but over a list of types -- The variables to quantify must have a TcLevel strictly greater than -- the ambient level. (See Wrinkle in Note [Naughty quantification candidates]) candidateQTyVarsOfTypes :: [Type] -> TcM CandidatesQTvs candidateQTyVarsOfTypes tys = foldlM (\acc ty -> collect_cand_qtvs ty False emptyVarSet acc ty) mempty tys -- | Like 'candidateQTyVarsOfType', but consider every free variable -- to be dependent. This is appropriate when generalizing a *kind*, -- instead of a type. (That way, -XNoPolyKinds will default the variables -- to Type.) candidateQTyVarsOfKind :: TcKind -- Not necessarily zonked -> TcM CandidatesQTvs candidateQTyVarsOfKind ty = collect_cand_qtvs ty True emptyVarSet mempty ty candidateQTyVarsOfKinds :: [TcKind] -- Not necessarily zonked -> TcM CandidatesQTvs candidateQTyVarsOfKinds tys = foldM (\acc ty -> collect_cand_qtvs ty True emptyVarSet acc ty) mempty tys delCandidates :: CandidatesQTvs -> [Var] -> CandidatesQTvs delCandidates (DV { dv_kvs = kvs, dv_tvs = tvs, dv_cvs = cvs }) vars = DV { dv_kvs = kvs `delDVarSetList` vars , dv_tvs = tvs `delDVarSetList` vars , dv_cvs = cvs `delVarSetList` vars } collect_cand_qtvs :: TcType -- original type that we started recurring into; for errors -> Bool -- True <=> consider every fv in Type to be dependent -> VarSet -- Bound variables (locals only) -> CandidatesQTvs -- Accumulating parameter -> Type -- Not necessarily zonked -> TcM CandidatesQTvs -- Key points: -- * Looks through meta-tyvars as it goes; -- no need to zonk in advance -- -- * Needs to be monadic anyway, because it handles naughty -- quantification; see Note [Naughty quantification candidates] -- -- * Returns fully-zonked CandidateQTvs, including their kinds -- so that subsequent dependency analysis (to build a well -- scoped telescope) works correctly collect_cand_qtvs orig_ty is_dep bound dvs ty = go dvs ty where is_bound tv = tv `elemVarSet` bound ----------------- go :: CandidatesQTvs -> TcType -> TcM CandidatesQTvs -- Uses accumulating-parameter style go dv (AppTy t1 t2) = foldlM go dv [t1, t2] go dv (TyConApp tc tys) = go_tc_args dv (tyConBinders tc) tys go dv (FunTy _ w arg res) = foldlM go dv [w, arg, res] go dv (LitTy {}) = return dv go dv (CastTy ty co) = do dv1 <- go dv ty collect_cand_qtvs_co orig_ty bound dv1 co go dv (CoercionTy co) = collect_cand_qtvs_co orig_ty bound dv co go dv (TyVarTy tv) | is_bound tv = return dv | otherwise = do { m_contents <- isFilledMetaTyVar_maybe tv ; case m_contents of Just ind_ty -> go dv ind_ty Nothing -> go_tv dv tv } go dv (ForAllTy (Bndr tv _) ty) = do { dv1 <- collect_cand_qtvs orig_ty True bound dv (tyVarKind tv) ; collect_cand_qtvs orig_ty is_dep (bound `extendVarSet` tv) dv1 ty } -- This makes sure that we default e.g. the alpha in Proxy alpha (Any alpha). -- Tested in polykinds/NestedProxies. -- We just might get this wrong in AppTy, but I don't think that's possible -- with -XNoPolyKinds. And fixing it would be non-performant, as we'd need -- to look at kinds. go_tc_args dv (tc_bndr:tc_bndrs) (ty:tys) = do { dv1 <- collect_cand_qtvs orig_ty (is_dep || isNamedTyConBinder tc_bndr) bound dv ty ; go_tc_args dv1 tc_bndrs tys } go_tc_args dv _bndrs tys -- _bndrs might be non-empty: undersaturation -- tys might be non-empty: oversaturation -- either way, the foldlM is correct = foldlM go dv tys ----------------- go_tv dv@(DV { dv_kvs = kvs, dv_tvs = tvs }) tv | tv `elemDVarSet` kvs = return dv -- We have met this tyvar already | not is_dep , tv `elemDVarSet` tvs = return dv -- We have met this tyvar already | otherwise = do { tv_kind <- zonkTcType (tyVarKind tv) -- This zonk is annoying, but it is necessary, both to -- ensure that the collected candidates have zonked kinds -- (#15795) and to make the naughty check -- (which comes next) works correctly ; let tv_kind_vars = tyCoVarsOfType tv_kind ; cur_lvl <- getTcLevel ; if | tcTyVarLevel tv <= cur_lvl -> return dv -- this variable is from an outer context; skip -- See Note [Use level numbers for quantification] | intersectsVarSet bound tv_kind_vars -- the tyvar must not be from an outer context, but we have -- already checked for this. -- See Note [Naughty quantification candidates] -> do { traceTc "Naughty quantifier" $ vcat [ ppr tv <+> dcolon <+> ppr tv_kind , text "bound:" <+> pprTyVars (nonDetEltsUniqSet bound) , text "fvs:" <+> pprTyVars (nonDetEltsUniqSet tv_kind_vars) ] ; let escapees = intersectVarSet bound tv_kind_vars ; naughtyQuantification orig_ty tv escapees } | otherwise -> do { let tv' = tv `setTyVarKind` tv_kind dv' | is_dep = dv { dv_kvs = kvs `extendDVarSet` tv' } | otherwise = dv { dv_tvs = tvs `extendDVarSet` tv' } -- See Note [Order of accumulation] -- See Note [Recurring into kinds for candidateQTyVars] ; collect_cand_qtvs orig_ty True bound dv' tv_kind } } collect_cand_qtvs_co :: TcType -- original type at top of recursion; for errors -> VarSet -- bound variables -> CandidatesQTvs -> Coercion -> TcM CandidatesQTvs collect_cand_qtvs_co orig_ty bound = go_co where go_co dv (Refl ty) = collect_cand_qtvs orig_ty True bound dv ty go_co dv (GRefl _ ty mco) = do dv1 <- collect_cand_qtvs orig_ty True bound dv ty go_mco dv1 mco go_co dv (TyConAppCo _ _ cos) = foldlM go_co dv cos go_co dv (AppCo co1 co2) = foldlM go_co dv [co1, co2] go_co dv (FunCo _ w co1 co2) = foldlM go_co dv [w, co1, co2] go_co dv (AxiomInstCo _ _ cos) = foldlM go_co dv cos go_co dv (AxiomRuleCo _ cos) = foldlM go_co dv cos go_co dv (UnivCo prov _ t1 t2) = do dv1 <- go_prov dv prov dv2 <- collect_cand_qtvs orig_ty True bound dv1 t1 collect_cand_qtvs orig_ty True bound dv2 t2 go_co dv (SymCo co) = go_co dv co go_co dv (TransCo co1 co2) = foldlM go_co dv [co1, co2] go_co dv (NthCo _ _ co) = go_co dv co go_co dv (LRCo _ co) = go_co dv co go_co dv (InstCo co1 co2) = foldlM go_co dv [co1, co2] go_co dv (KindCo co) = go_co dv co go_co dv (SubCo co) = go_co dv co go_co dv (HoleCo hole) = do m_co <- unpackCoercionHole_maybe hole case m_co of Just co -> go_co dv co Nothing -> go_cv dv (coHoleCoVar hole) go_co dv (CoVarCo cv) = go_cv dv cv go_co dv (ForAllCo tcv kind_co co) = do { dv1 <- go_co dv kind_co ; collect_cand_qtvs_co orig_ty (bound `extendVarSet` tcv) dv1 co } go_mco dv MRefl = return dv go_mco dv (MCo co) = go_co dv co go_prov dv (PhantomProv co) = go_co dv co go_prov dv (ProofIrrelProv co) = go_co dv co go_prov dv (PluginProv _) = return dv go_prov dv (CorePrepProv _) = return dv go_cv :: CandidatesQTvs -> CoVar -> TcM CandidatesQTvs go_cv dv@(DV { dv_cvs = cvs }) cv | is_bound cv = return dv | cv `elemVarSet` cvs = return dv -- See Note [Recurring into kinds for candidateQTyVars] | otherwise = collect_cand_qtvs orig_ty True bound (dv { dv_cvs = cvs `extendVarSet` cv }) (idType cv) is_bound tv = tv `elemVarSet` bound {- Note [Order of accumulation] ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~ You might be tempted (like I was) to use unitDVarSet and mappend rather than extendDVarSet. However, the union algorithm for deterministic sets depends on (roughly) the size of the sets. The elements from the smaller set end up to the right of the elements from the larger one. When sets are equal, the left-hand argument to `mappend` goes to the right of the right-hand argument. In our case, if we use unitDVarSet and mappend, we learn that the free variables of (a -> b -> c -> d) are [b, a, c, d], and we then quantify over them in that order. (The a comes after the b because we union the singleton sets as ({a} `mappend` {b}), producing {b, a}. Thereafter, the size criterion works to our advantage.) This is just annoying to users, so I use `extendDVarSet`, which unambiguously puts the new element to the right. Note that the unitDVarSet/mappend implementation would not be wrong against any specification -- just suboptimal and confounding to users. Note [Recurring into kinds for candidateQTyVars] ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~ First, read Note [Closing over free variable kinds] in GHC.Core.TyCo.FVs, paying attention to the end of the Note about using an empty bound set when traversing a variable's kind. That Note concludes with the recommendation that we empty out the bound set when recurring into the kind of a type variable. Yet, we do not do this here. I have two tasks in order to convince you that this code is right. First, I must show why it is safe to ignore the reasoning in that Note. Then, I must show why is is necessary to contradict the reasoning in that Note. Why it is safe: There can be no shadowing in the candidateQ... functions: they work on the output of type inference, which is seeded by the renamer and its insistence to use different Uniques for different variables. (In contrast, the Core functions work on the output of optimizations, which may introduce shadowing.) Without shadowing, the problem studied by Note [Closing over free variable kinds] in GHC.Core.TyCo.FVs cannot happen. Why it is necessary: Wiping the bound set would be just plain wrong here. Consider forall k1 k2 (a :: k1). Proxy k2 (a |> (hole :: k1 ~# k2)) We really don't want to think k1 and k2 are free here. (It's true that we'll never be able to fill in `hole`, but we don't want to go off the rails just because we have an insoluble coercion hole.) So: why is it wrong to wipe the bound variables here but right in Core? Because the final statement in Note [Closing over free variable kinds] in GHC.Core.TyCo.FVs is wrong: not every variable is either free or bound. A variable can be a hole, too! The reasoning in that Note then breaks down. And the reasoning applies just as well to free non-hole variables, so we retain the bound set always. -} {- ********************************************************************* * * Quantification * * ************************************************************************ Note [quantifyTyVars] ~~~~~~~~~~~~~~~~~~~~~ quantifyTyVars is given the free vars of a type that we are about to wrap in a forall. It takes these free type/kind variables (partitioned into dependent and non-dependent variables) skolemises metavariables with a TcLevel greater than the ambient level (see Note [Use level numbers for quantification]). * This function distinguishes between dependent and non-dependent variables only to keep correct defaulting behavior with -XNoPolyKinds. With -XPolyKinds, it treats both classes of variables identically. * quantifyTyVars never quantifies over - a coercion variable (or any tv mentioned in the kind of a covar) - a runtime-rep variable Note [Use level numbers for quantification] ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~ The level numbers assigned to metavariables are very useful. Not only do they track touchability (Note [TcLevel invariants] in GHC.Tc.Utils.TcType), but they also allow us to determine which variables to generalise. The rule is this: When generalising, quantify only metavariables with a TcLevel greater than the ambient level. This works because we bump the level every time we go inside a new source-level construct. In a traditional generalisation algorithm, we would gather all free variables that aren't free in an environment. However, if a variable is in that environment, it will always have a lower TcLevel: it came from an outer scope. So we can replace the "free in environment" check with a level-number check. Here is an example: f x = x + (z True) where z y = x * x We start by saying (x :: alpha[1]). When inferring the type of z, we'll quickly discover that z :: alpha[1]. But it would be disastrous to generalise over alpha in the type of z. So we need to know that alpha comes from an outer environment. By contrast, the type of y is beta[2], and we are free to generalise over it. What's the difference between alpha[1] and beta[2]? Their levels. beta[2] has the right TcLevel for generalisation, and so we generalise it. alpha[1] does not, and so we leave it alone. Note that not *every* variable with a higher level will get generalised, either due to the monomorphism restriction or other quirks. See, for example, the code in GHC.Tc.Solver.decideMonoTyVars and in GHC.Tc.Gen.HsType.kindGeneralizeSome, both of which exclude certain otherwise-eligible variables from being generalised. Using level numbers for quantification is implemented in the candidateQTyVars... functions, by adding only those variables with a level strictly higher than the ambient level to the set of candidates. Note [quantifyTyVars determinism] ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~ The results of quantifyTyVars are wrapped in a forall and can end up in the interface file. One such example is inferred type signatures. They also affect the results of optimizations, for example worker-wrapper. This means that to get deterministic builds quantifyTyVars needs to be deterministic. To achieve this CandidatesQTvs is backed by deterministic sets which allows them to be later converted to a list in a deterministic order. For more information about deterministic sets see Note [Deterministic UniqFM] in GHC.Types.Unique.DFM. -} quantifyTyVars :: CandidatesQTvs -- See Note [Dependent type variables] -- Already zonked -> TcM [TcTyVar] -- See Note [quantifyTyVars] -- Can be given a mixture of TcTyVars and TyVars, in the case of -- associated type declarations. Also accepts covars, but *never* returns any. -- According to Note [Use level numbers for quantification] and the -- invariants on CandidateQTvs, we do not have to filter out variables -- free in the environment here. Just quantify unconditionally, subject -- to the restrictions in Note [quantifyTyVars]. quantifyTyVars dvs -- short-circuit common case | isEmptyCandidates dvs = do { traceTc "quantifyTyVars has nothing to quantify" empty ; return [] } | otherwise = do { traceTc "quantifyTyVars {" (ppr dvs) ; undefaulted <- defaultTyVars dvs ; final_qtvs <- mapMaybeM zonk_quant undefaulted ; traceTc "quantifyTyVars }" (vcat [ text "undefaulted:" <+> pprTyVars undefaulted , text "final_qtvs:" <+> pprTyVars final_qtvs ]) -- We should never quantify over coercion variables; check this ; let co_vars = filter isCoVar final_qtvs ; MASSERT2( null co_vars, ppr co_vars ) ; return final_qtvs } where -- zonk_quant returns a tyvar if it should be quantified over; -- otherwise, it returns Nothing. The latter case happens for -- non-meta-tyvars zonk_quant tkv | not (isTyVar tkv) = return Nothing -- this can happen for a covar that's associated with -- a coercion hole. Test case: typecheck/should_compile/T2494 | not (isTcTyVar tkv) = return (Just tkv) -- For associated types in a class with a standalone -- kind signature, we have the class variables in -- scope, and they are TyVars not TcTyVars | otherwise = Just <$> skolemiseQuantifiedTyVar tkv isQuantifiableTv :: TcLevel -- Level of the context, outside the quantification -> TcTyVar -> Bool isQuantifiableTv outer_tclvl tcv | isTcTyVar tcv -- Might be a CoVar; change this when gather covars separately = tcTyVarLevel tcv > outer_tclvl | otherwise = False zonkAndSkolemise :: TcTyCoVar -> TcM TcTyCoVar -- A tyvar binder is never a unification variable (TauTv), -- rather it is always a skolem. It *might* be a TyVarTv. -- (Because non-CUSK type declarations use TyVarTvs.) -- Regardless, it may have a kind that has not yet been zonked, -- and may include kind unification variables. zonkAndSkolemise tyvar | isTyVarTyVar tyvar -- We want to preserve the binding location of the original TyVarTv. -- This is important for error messages. If we don't do this, then -- we get bad locations in, e.g., typecheck/should_fail/T2688 = do { zonked_tyvar <- zonkTcTyVarToTyVar tyvar ; skolemiseQuantifiedTyVar zonked_tyvar } | otherwise = ASSERT2( isImmutableTyVar tyvar || isCoVar tyvar, pprTyVar tyvar ) zonkTyCoVarKind tyvar skolemiseQuantifiedTyVar :: TcTyVar -> TcM TcTyVar -- The quantified type variables often include meta type variables -- we want to freeze them into ordinary type variables -- The meta tyvar is updated to point to the new skolem TyVar. Now any -- bound occurrences of the original type variable will get zonked to -- the immutable version. -- -- We leave skolem TyVars alone; they are immutable. -- -- This function is called on both kind and type variables, -- but kind variables *only* if PolyKinds is on. skolemiseQuantifiedTyVar tv = case tcTyVarDetails tv of SkolemTv {} -> do { kind <- zonkTcType (tyVarKind tv) ; return (setTyVarKind tv kind) } -- It might be a skolem type variable, -- for example from a user type signature MetaTv {} -> skolemiseUnboundMetaTyVar tv _other -> pprPanic "skolemiseQuantifiedTyVar" (ppr tv) -- RuntimeUnk defaultTyVar :: Bool -- True <=> please default this kind variable to * -> TcTyVar -- If it's a MetaTyVar then it is unbound -> TcM Bool -- True <=> defaulted away altogether defaultTyVar default_kind tv | not (isMetaTyVar tv) = return False | isTyVarTyVar tv -- Do not default TyVarTvs. Doing so would violate the invariants -- on TyVarTvs; see Note [TyVarTv] in GHC.Tc.Utils.TcMType. -- #13343 is an example; #14555 is another -- See Note [Inferring kinds for type declarations] in GHC.Tc.TyCl = return False | isRuntimeRepVar tv -- Do not quantify over a RuntimeRep var -- unless it is a TyVarTv, handled earlier = do { traceTc "Defaulting a RuntimeRep var to LiftedRep" (ppr tv) ; writeMetaTyVar tv liftedRepTy ; return True } | isLevityVar tv = do { traceTc "Defaulting a Levity var to Lifted" (ppr tv) ; writeMetaTyVar tv liftedDataConTy ; return True } | isMultiplicityVar tv = do { traceTc "Defaulting a Multiplicty var to Many" (ppr tv) ; writeMetaTyVar tv manyDataConTy ; return True } | default_kind -- -XNoPolyKinds and this is a kind var = default_kind_var tv -- so default it to * if possible | otherwise = return False where default_kind_var :: TyVar -> TcM Bool -- defaultKindVar is used exclusively with -XNoPolyKinds -- See Note [Defaulting with -XNoPolyKinds] -- It takes an (unconstrained) meta tyvar and defaults it. -- Works only on vars of type *; for other kinds, it issues an error. default_kind_var kv | isLiftedTypeKind (tyVarKind kv) = do { traceTc "Defaulting a kind var to *" (ppr kv) ; writeMetaTyVar kv liftedTypeKind ; return True } | otherwise = do { addErr (vcat [ text "Cannot default kind variable" <+> quotes (ppr kv') , text "of kind:" <+> ppr (tyVarKind kv') , text "Perhaps enable PolyKinds or add a kind signature" ]) -- We failed to default it, so return False to say so. -- Hence, it'll get skolemised. That might seem odd, but we must either -- promote, skolemise, or zap-to-Any, to satisfy GHC.Tc.Gen.HsType -- Note [Recipe for checking a signature] -- Otherwise we get level-number assertion failures. It doesn't matter much -- because we are in an error situation anyway. ; return False } where (_, kv') = tidyOpenTyCoVar emptyTidyEnv kv -- | Default some unconstrained type variables: -- RuntimeRep tyvars default to LiftedRep -- Multiplicity tyvars default to Many -- Type tyvars from dv_kvs default to Type, when -XNoPolyKinds -- (under -XNoPolyKinds, non-defaulting vars in dv_kvs is an error) defaultTyVars :: CandidatesQTvs -- ^ all candidates for quantification -> TcM [TcTyVar] -- ^ those variables not defaulted defaultTyVars dvs = do { poly_kinds <- xoptM LangExt.PolyKinds ; defaulted_kvs <- mapM (defaultTyVar (not poly_kinds)) dep_kvs ; defaulted_tvs <- mapM (defaultTyVar False) nondep_tvs ; let undefaulted_kvs = [ kv | (kv, False) <- dep_kvs `zip` defaulted_kvs ] undefaulted_tvs = [ tv | (tv, False) <- nondep_tvs `zip` defaulted_tvs ] ; return (undefaulted_kvs ++ undefaulted_tvs) } -- NB: kvs before tvs because tvs may depend on kvs where (dep_kvs, nondep_tvs) = candidateVars dvs skolemiseUnboundMetaTyVar :: TcTyVar -> TcM TyVar -- We have a Meta tyvar with a ref-cell inside it -- Skolemise it, so that we are totally out of Meta-tyvar-land -- We create a skolem TcTyVar, not a regular TyVar -- See Note [Zonking to Skolem] skolemiseUnboundMetaTyVar tv = ASSERT2( isMetaTyVar tv, ppr tv ) do { when debugIsOn (check_empty tv) ; here <- getSrcSpanM -- Get the location from "here" -- ie where we are generalising ; kind <- zonkTcType (tyVarKind tv) ; let tv_name = tyVarName tv -- See Note [Skolemising and identity] final_name | isSystemName tv_name = mkInternalName (nameUnique tv_name) (nameOccName tv_name) here | otherwise = tv_name final_tv = mkTcTyVar final_name kind details ; traceTc "Skolemising" (ppr tv <+> text ":=" <+> ppr final_tv) ; writeMetaTyVar tv (mkTyVarTy final_tv) ; return final_tv } where details = SkolemTv (metaTyVarTcLevel tv) False check_empty tv -- [Sept 04] Check for non-empty. = when debugIsOn $ -- See note [Silly Type Synonym] do { cts <- readMetaTyVar tv ; case cts of Flexi -> return () Indirect ty -> WARN( True, ppr tv $$ ppr ty ) return () } {- Note [Error on unconstrained meta-variables] ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~ Consider * type C :: Type -> Type -> Constraint class (forall a. a b ~ a c) => C b c * type T = forall a. Proxy a * data (forall a. a b ~ a c) => T b c * type instance F Int = Proxy Any where Any :: forall k. k In the first three cases we will infer a :: Type -> kappa, but then we get no further information on kappa. In the last, we will get Proxy kappa Any but again will get no further info on kappa. What do do? A. We could choose kappa := Type. But this only works when the kind of kappa is Type (true in this example, but not always). B. We could default to Any. C. We could quantify. D. We could error. We choose (D), as described in #17567, and implement this choice in doNotQuantifyTyVars. Dicsussion of alternativs A-C is below. NB: this is all rather similar to, but sadly not the same as Note [Naughty quantification candidates] (One last example: type instance F Int = Proxy Any, where the unconstrained kind variable is the inferred kind of Any. The four examples here illustrate all cases in which this Note applies.) To do this, we must take an extra step before doing the final zonk to create e.g. a TyCon. (There is no problem in the final term-level zonk. See the section on alternative (B) below.) This extra step is needed only for constructs that do not quantify their free meta-variables, such as a class constraint or right-hand side of a type synonym. Specifically: before the final zonk, every construct must either call quantifyTyVars or doNotQuantifyTyVars. The latter issues an error if it is passed any free variables. (Exception: we still default RuntimeRep and Multiplicity variables.) Because no meta-variables remain after quantifying or erroring, we perform the zonk with NoFlexi, which panics upon seeing a meta-variable. Alternatives A-C, not implemented: A. As stated above, this works only sometimes. We might have a free meta-variable of kind Nat, for example. B. This is what we used to do, but it caused Any to appear in error messages sometimes. See #17567 for several examples. Defaulting to Any during the final, whole-program zonk is OK, though, because we are completely done type-checking at that point. No chance to leak into an error message. C. Examine the class declaration at the top of this Note again. Where should we quantify? We might imagine quantifying and putting the kind variable in the forall of the quantified constraint. But what if there are nested foralls? Which one should get the variable? Other constructs have other problems. (For example, the right-hand side of a type family instance equation may not be a poly-type.) More broadly, the GHC AST defines a set of places where it performs implicit lexical generalization. For example, in a type signature f :: Proxy a -> Bool the otherwise-unbound a is lexically quantified, giving us f :: forall a. Proxy a -> Bool The places that allow lexical quantification are marked in the AST with HsImplicitBndrs. HsImplicitBndrs offers a binding site for otherwise-unbound variables. Later, during type-checking, we discover that a's kind is unconstrained. We thus quantify *again*, to f :: forall {k} (a :: k). Proxy @k a -> Bool It is this second quantification that this Note is really about -- let's call it *inferred quantification*. So there are two sorts of implicit quantification in types: 1. Lexical quantification: signalled by HsImplicitBndrs, occurs over variables mentioned by the user but with no explicit binding site, suppressed by a user-written forall (by the forall-or-nothing rule, in Note [forall-or-nothing rule] in GHC.Hs.Type). 2. Inferred quantification: no signal in HsSyn, occurs over unconstrained variables invented by the type-checker, possible only with -XPolyKinds, unaffected by forall-or-nothing rule These two quantifications are performed in different compiler phases, and are essentially unrelated. However, it is convenient for programmers to remember only one set of implicit quantification sites. So, we choose to use the same places (those with HsImplicitBndrs) for lexical quantification as for inferred quantification of unconstrained meta-variables. Accordingly, there is no quantification in a class constraint, or the other constructs that call doNotQuantifyTyVars. -} doNotQuantifyTyVars :: CandidatesQTvs -> (TidyEnv -> TcM (TidyEnv, SDoc)) -- ^ like "the class context (D a b, E foogle)" -> TcM () doNotQuantifyTyVars dvs where_found | isEmptyCandidates dvs = traceTc "doNotQuantifyTyVars has nothing to error on" empty | otherwise = do { traceTc "doNotQuantifyTyVars" (ppr dvs) ; undefaulted <- defaultTyVars dvs -- could have regular TyVars here, in an associated type RHS, or -- bound by a type declaration head. So filter looking only for -- metavars. e.g. b and c in `class (forall a. a b ~ a c) => C b c` -- are OK ; let leftover_metas = filter isMetaTyVar undefaulted ; unless (null leftover_metas) $ do { let (tidy_env1, tidied_tvs) = tidyOpenTyCoVars emptyTidyEnv leftover_metas ; (tidy_env2, where_doc) <- where_found tidy_env1 ; let doc = vcat [ text "Uninferrable type variable" <> plural tidied_tvs <+> pprWithCommas pprTyVar tidied_tvs <+> text "in" , where_doc ] ; failWithTcM (tidy_env2, pprWithExplicitKindsWhen True doc) } ; traceTc "doNotQuantifyTyVars success" empty } {- Note [Defaulting with -XNoPolyKinds] ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~ Consider data Compose f g a = Mk (f (g a)) We infer Compose :: forall k1 k2. (k2 -> *) -> (k1 -> k2) -> k1 -> * Mk :: forall k1 k2 (f :: k2 -> *) (g :: k1 -> k2) (a :: k1). f (g a) -> Compose k1 k2 f g a Now, in another module, we have -XNoPolyKinds -XDataKinds in effect. What does 'Mk mean? Pre GHC-8.0 with -XNoPolyKinds, we just defaulted all kind variables to *. But that's no good here, because the kind variables in 'Mk aren't of kind *, so defaulting to * is ill-kinded. After some debate on #11334, we decided to issue an error in this case. The code is in defaultKindVar. Note [What is a meta variable?] ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~ A "meta type-variable", also know as a "unification variable" is a placeholder introduced by the typechecker for an as-yet-unknown monotype. For example, when we see a call `reverse (f xs)`, we know that we calling reverse :: forall a. [a] -> [a] So we know that the argument `f xs` must be a "list of something". But what is the "something"? We don't know until we explore the `f xs` a bit more. So we set out what we do know at the call of `reverse` by instantiating its type with a fresh meta tyvar, `alpha` say. So now the type of the argument `f xs`, and of the result, is `[alpha]`. The unification variable `alpha` stands for the as-yet-unknown type of the elements of the list. As type inference progresses we may learn more about `alpha`. For example, suppose `f` has the type f :: forall b. b -> [Maybe b] Then we instantiate `f`'s type with another fresh unification variable, say `beta`; and equate `f`'s result type with reverse's argument type, thus `[alpha] ~ [Maybe beta]`. Now we can solve this equality to learn that `alpha ~ Maybe beta`, so we've refined our knowledge about `alpha`. And so on. If you found this Note useful, you may also want to have a look at Section 5 of "Practical type inference for higher rank types" (Peyton Jones, Vytiniotis, Weirich and Shields. J. Functional Programming. 2011). Note [What is zonking?] ~~~~~~~~~~~~~~~~~~~~~~~ GHC relies heavily on mutability in the typechecker for efficient operation. For this reason, throughout much of the type checking process meta type variables (the MetaTv constructor of TcTyVarDetails) are represented by mutable variables (known as TcRefs). Zonking is the process of ripping out these mutable variables and replacing them with a real Type. This involves traversing the entire type expression, but the interesting part of replacing the mutable variables occurs in zonkTyVarOcc. There are two ways to zonk a Type: * zonkTcTypeToType, which is intended to be used at the end of type-checking for the final zonk. It has to deal with unfilled metavars, either by filling it with a value like Any or failing (determined by the UnboundTyVarZonker used). * zonkTcType, which will happily ignore unfilled metavars. This is the appropriate function to use while in the middle of type-checking. Note [Zonking to Skolem] ~~~~~~~~~~~~~~~~~~~~~~~~ We used to zonk quantified type variables to regular TyVars. However, this leads to problems. Consider this program from the regression test suite: eval :: Int -> String -> String -> String eval 0 root actual = evalRHS 0 root actual evalRHS :: Int -> a evalRHS 0 root actual = eval 0 root actual It leads to the deferral of an equality (wrapped in an implication constraint) forall a. () => ((String -> String -> String) ~ a) which is propagated up to the toplevel (see GHC.Tc.Solver.tcSimplifyInferCheck). In the meantime `a' is zonked and quantified to form `evalRHS's signature. This has the *side effect* of also zonking the `a' in the deferred equality (which at this point is being handed around wrapped in an implication constraint). Finally, the equality (with the zonked `a') will be handed back to the simplifier by GHC.Tc.Module.tcRnSrcDecls calling GHC.Tc.Solver.tcSimplifyTop. If we zonk `a' with a regular type variable, we will have this regular type variable now floating around in the simplifier, which in many places assumes to only see proper TcTyVars. We can avoid this problem by zonking with a skolem TcTyVar. The skolem is rigid (which we require for a quantified variable), but is still a TcTyVar that the simplifier knows how to deal with. Note [Skolemising and identity] ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~ In some places, we make a TyVarTv for a binder. E.g. class C a where ... As Note [Inferring kinds for type declarations] discusses, we make a TyVarTv for 'a'. Later we skolemise it, and we'd like to retain its identity, location info etc. (If we don't retain its identity we'll have to do some pointless swizzling; see GHC.Tc.TyCl.swizzleTcTyConBndrs. If we retain its identity but not its location we'll lose the detailed binding site info. Conclusion: use the Name of the TyVarTv. But we don't want to do that when skolemising random unification variables; there the location we want is the skolemisation site. Fortunately we can tell the difference: random unification variables have System Names. That's why final_name is set based on the isSystemName test. Note [Silly Type Synonyms] ~~~~~~~~~~~~~~~~~~~~~~~~~~ Consider this: type C u a = u -- Note 'a' unused foo :: (forall a. C u a -> C u a) -> u foo x = ... bar :: Num u => u bar = foo (\t -> t + t) * From the (\t -> t+t) we get type {Num d} => d -> d where d is fresh. * Now unify with type of foo's arg, and we get: {Num (C d a)} => C d a -> C d a where a is fresh. * Now abstract over the 'a', but float out the Num (C d a) constraint because it does not 'really' mention a. (see exactTyVarsOfType) The arg to foo becomes \/\a -> \t -> t+t * So we get a dict binding for Num (C d a), which is zonked to give a = () [Note Sept 04: now that we are zonking quantified type variables on construction, the 'a' will be frozen as a regular tyvar on quantification, so the floated dict will still have type (C d a). Which renders this whole note moot; happily!] * Then the \/\a abstraction has a zonked 'a' in it. All very silly. I think its harmless to ignore the problem. We'll end up with a \/\a in the final result but all the occurrences of a will be zonked to () -} {- ********************************************************************* * * Promotion * * ********************************************************************* -} promoteMetaTyVarTo :: TcLevel -> TcTyVar -> TcM Bool -- When we float a constraint out of an implication we must restore -- invariant (WantedInv) in Note [TcLevel invariants] in GHC.Tc.Utils.TcType -- Return True <=> we did some promotion -- Also returns either the original tyvar (no promotion) or the new one -- See Note [Promoting unification variables] promoteMetaTyVarTo tclvl tv | ASSERT2( isMetaTyVar tv, ppr tv ) tcTyVarLevel tv `strictlyDeeperThan` tclvl = do { cloned_tv <- cloneMetaTyVar tv ; let rhs_tv = setMetaTyVarTcLevel cloned_tv tclvl ; writeMetaTyVar tv (mkTyVarTy rhs_tv) ; traceTc "promoteTyVar" (ppr tv <+> text "-->" <+> ppr rhs_tv) ; return True } | otherwise = return False -- Returns whether or not *any* tyvar is defaulted promoteTyVarSet :: TcTyVarSet -> TcM Bool promoteTyVarSet tvs = do { tclvl <- getTcLevel ; bools <- mapM (promoteMetaTyVarTo tclvl) $ filter isPromotableMetaTyVar $ nonDetEltsUniqSet tvs -- Non-determinism is OK because order of promotion doesn't matter ; return (or bools) } {- ********************************************************************* * * Zonking types * * ********************************************************************* -} zonkTcTypeAndFV :: TcType -> TcM DTyCoVarSet -- Zonk a type and take its free variables -- With kind polymorphism it can be essential to zonk *first* -- so that we find the right set of free variables. Eg -- forall k1. forall (a:k2). a -- where k2:=k1 is in the substitution. We don't want -- k2 to look free in this type! zonkTcTypeAndFV ty = tyCoVarsOfTypeDSet <$> zonkTcType ty zonkTyCoVar :: TyCoVar -> TcM TcType -- Works on TyVars and TcTyVars zonkTyCoVar tv | isTcTyVar tv = zonkTcTyVar tv | isTyVar tv = mkTyVarTy <$> zonkTyCoVarKind tv | otherwise = ASSERT2( isCoVar tv, ppr tv ) mkCoercionTy . mkCoVarCo <$> zonkTyCoVarKind tv -- Hackily, when typechecking type and class decls -- we have TyVars in scope added (only) in -- GHC.Tc.Gen.HsType.bindTyClTyVars, but it seems -- painful to make them into TcTyVars there zonkTyCoVarsAndFV :: TyCoVarSet -> TcM TyCoVarSet zonkTyCoVarsAndFV tycovars = tyCoVarsOfTypes <$> mapM zonkTyCoVar (nonDetEltsUniqSet tycovars) -- It's OK to use nonDetEltsUniqSet here because we immediately forget about -- the ordering by turning it into a nondeterministic set and the order -- of zonking doesn't matter for determinism. zonkDTyCoVarSetAndFV :: DTyCoVarSet -> TcM DTyCoVarSet zonkDTyCoVarSetAndFV tycovars = mkDVarSet <$> (zonkTyCoVarsAndFVList $ dVarSetElems tycovars) -- Takes a list of TyCoVars, zonks them and returns a -- deterministically ordered list of their free variables. zonkTyCoVarsAndFVList :: [TyCoVar] -> TcM [TyCoVar] zonkTyCoVarsAndFVList tycovars = tyCoVarsOfTypesList <$> mapM zonkTyCoVar tycovars zonkTcTyVars :: [TcTyVar] -> TcM [TcType] zonkTcTyVars tyvars = mapM zonkTcTyVar tyvars ----------------- Types zonkTyCoVarKind :: TyCoVar -> TcM TyCoVar zonkTyCoVarKind tv = do { kind' <- zonkTcType (tyVarKind tv) ; return (setTyVarKind tv kind') } zonkTyCoVarKindBinder :: (VarBndr TyCoVar fl) -> TcM (VarBndr TyCoVar fl) zonkTyCoVarKindBinder (Bndr tv fl) = do { kind' <- zonkTcType (tyVarKind tv) ; return $ Bndr (setTyVarKind tv kind') fl } {- ************************************************************************ * * Zonking constraints * * ************************************************************************ -} zonkImplication :: Implication -> TcM Implication zonkImplication implic@(Implic { ic_skols = skols , ic_given = given , ic_wanted = wanted , ic_info = info }) = do { skols' <- mapM zonkTyCoVarKind skols -- Need to zonk their kinds! -- as #7230 showed ; given' <- mapM zonkEvVar given ; info' <- zonkSkolemInfo info ; wanted' <- zonkWCRec wanted ; return (implic { ic_skols = skols' , ic_given = given' , ic_wanted = wanted' , ic_info = info' }) } zonkEvVar :: EvVar -> TcM EvVar zonkEvVar var = updateIdTypeAndMultM zonkTcType var zonkWC :: WantedConstraints -> TcM WantedConstraints zonkWC wc = zonkWCRec wc zonkWCRec :: WantedConstraints -> TcM WantedConstraints zonkWCRec (WC { wc_simple = simple, wc_impl = implic, wc_holes = holes }) = do { simple' <- zonkSimples simple ; implic' <- mapBagM zonkImplication implic ; holes' <- mapBagM zonkHole holes ; return (WC { wc_simple = simple', wc_impl = implic', wc_holes = holes' }) } zonkSimples :: Cts -> TcM Cts zonkSimples cts = do { cts' <- mapBagM zonkCt cts ; traceTc "zonkSimples done:" (ppr cts') ; return cts' } zonkHole :: Hole -> TcM Hole zonkHole hole@(Hole { hole_ty = ty }) = do { ty' <- zonkTcType ty ; return (hole { hole_ty = ty' }) } {- Note [zonkCt behaviour] ~~~~~~~~~~~~~~~~~~~~~~~~~~ zonkCt tries to maintain the canonical form of a Ct. For example, - a CDictCan should stay a CDictCan; - a CIrredCan should stay a CIrredCan with its cc_reason flag intact Why?, for example: - For CDictCan, the @GHC.Tc.Solver.expandSuperClasses@ step, which runs after the simple wanted and plugin loop, looks for @CDictCan@s. If a plugin is in use, constraints are zonked before being passed to the plugin. This means if we don't preserve a canonical form, @expandSuperClasses@ fails to expand superclasses. This is what happened in #11525. - For CIrredCan we want to see if a constraint is insoluble with insolubleWC On the other hand, we change CEqCan to CNonCanonical, because of all of CEqCan's invariants, which can break during zonking. (Example: a ~R alpha, where we have alpha := N Int, where N is a newtype.) Besides, the constraint will be canonicalised again, so there is little benefit in keeping the CEqCan structure. NB: Constraints are always rewritten etc by the canonicaliser in @GHC.Tc.Solver.Canonical@ even if they come in as CDictCan. Only canonical constraints that are actually in the inert set carry all the guarantees. So it is okay if zonkCt creates e.g. a CDictCan where the cc_tyars are /not/ fully reduced. -} zonkCt :: Ct -> TcM Ct -- See Note [zonkCt behaviour] zonkCt ct@(CDictCan { cc_ev = ev, cc_tyargs = args }) = do { ev' <- zonkCtEvidence ev ; args' <- mapM zonkTcType args ; return $ ct { cc_ev = ev', cc_tyargs = args' } } zonkCt (CEqCan { cc_ev = ev }) = mkNonCanonical <$> zonkCtEvidence ev zonkCt ct@(CIrredCan { cc_ev = ev }) -- Preserve the cc_reason flag = do { ev' <- zonkCtEvidence ev ; return (ct { cc_ev = ev' }) } zonkCt ct = do { fl' <- zonkCtEvidence (ctEvidence ct) ; return (mkNonCanonical fl') } zonkCtEvidence :: CtEvidence -> TcM CtEvidence zonkCtEvidence ctev@(CtGiven { ctev_pred = pred }) = do { pred' <- zonkTcType pred ; return (ctev { ctev_pred = pred'}) } zonkCtEvidence ctev@(CtWanted { ctev_pred = pred, ctev_dest = dest }) = do { pred' <- zonkTcType pred ; let dest' = case dest of EvVarDest ev -> EvVarDest $ setVarType ev pred' -- necessary in simplifyInfer HoleDest h -> HoleDest h ; return (ctev { ctev_pred = pred', ctev_dest = dest' }) } zonkCtEvidence ctev@(CtDerived { ctev_pred = pred }) = do { pred' <- zonkTcType pred ; return (ctev { ctev_pred = pred' }) } zonkSkolemInfo :: SkolemInfo -> TcM SkolemInfo zonkSkolemInfo (SigSkol cx ty tv_prs) = do { ty' <- zonkTcType ty ; return (SigSkol cx ty' tv_prs) } zonkSkolemInfo (InferSkol ntys) = do { ntys' <- mapM do_one ntys ; return (InferSkol ntys') } where do_one (n, ty) = do { ty' <- zonkTcType ty; return (n, ty') } zonkSkolemInfo skol_info = return skol_info {- %************************************************************************ %* * \subsection{Zonking -- the main work-horses: zonkTcType, zonkTcTyVar} * * * For internal use only! * * * ************************************************************************ -} -- For unbound, mutable tyvars, zonkType uses the function given to it -- For tyvars bound at a for-all, zonkType zonks them to an immutable -- type variable and zonks the kind too zonkTcType :: TcType -> TcM TcType zonkTcTypes :: [TcType] -> TcM [TcType] zonkCo :: Coercion -> TcM Coercion (zonkTcType, zonkTcTypes, zonkCo, _) = mapTyCo zonkTcTypeMapper -- | A suitable TyCoMapper for zonking a type during type-checking, -- before all metavars are filled in. zonkTcTypeMapper :: TyCoMapper () TcM zonkTcTypeMapper = TyCoMapper { tcm_tyvar = const zonkTcTyVar , tcm_covar = const (\cv -> mkCoVarCo <$> zonkTyCoVarKind cv) , tcm_hole = hole , tcm_tycobinder = \_env tv _vis -> ((), ) <$> zonkTyCoVarKind tv , tcm_tycon = zonkTcTyCon } where hole :: () -> CoercionHole -> TcM Coercion hole _ hole@(CoercionHole { ch_ref = ref, ch_co_var = cv }) = do { contents <- readTcRef ref ; case contents of Just co -> do { co' <- zonkCo co ; checkCoercionHole cv co' } Nothing -> do { cv' <- zonkCoVar cv ; return $ HoleCo (hole { ch_co_var = cv' }) } } zonkTcTyCon :: TcTyCon -> TcM TcTyCon -- Only called on TcTyCons -- A non-poly TcTyCon may have unification -- variables that need zonking, but poly ones cannot zonkTcTyCon tc | tcTyConIsPoly tc = return tc | otherwise = do { tck' <- zonkTcType (tyConKind tc) ; return (setTcTyConKind tc tck') } zonkTcTyVar :: TcTyVar -> TcM TcType -- Simply look through all Flexis zonkTcTyVar tv | isTcTyVar tv = case tcTyVarDetails tv of SkolemTv {} -> zonk_kind_and_return RuntimeUnk {} -> zonk_kind_and_return MetaTv { mtv_ref = ref } -> do { cts <- readMutVar ref ; case cts of Flexi -> zonk_kind_and_return Indirect ty -> do { zty <- zonkTcType ty ; writeTcRef ref (Indirect zty) -- See Note [Sharing in zonking] ; return zty } } | otherwise -- coercion variable = zonk_kind_and_return where zonk_kind_and_return = do { z_tv <- zonkTyCoVarKind tv ; return (mkTyVarTy z_tv) } -- Variant that assumes that any result of zonking is still a TyVar. -- Should be used only on skolems and TyVarTvs zonkTcTyVarToTyVar :: HasDebugCallStack => TcTyVar -> TcM TcTyVar zonkTcTyVarToTyVar tv = do { ty <- zonkTcTyVar tv ; let tv' = case tcGetTyVar_maybe ty of Just tv' -> tv' Nothing -> pprPanic "zonkTcTyVarToTyVar" (ppr tv $$ ppr ty) ; return tv' } zonkInvisTVBinder :: VarBndr TcTyVar spec -> TcM (VarBndr TyVar spec) zonkInvisTVBinder (Bndr tv spec) = do { tv' <- zonkTcTyVarToTyVar tv ; return (Bndr tv' spec) } -- zonkId is used *during* typechecking just to zonk the Id's type zonkId :: TcId -> TcM TcId zonkId id = Id.updateIdTypeAndMultM zonkTcType id zonkCoVar :: CoVar -> TcM CoVar zonkCoVar = zonkId {- Note [Sharing in zonking] ~~~~~~~~~~~~~~~~~~~~~~~~~~~~ Suppose we have alpha :-> beta :-> gamma :-> ty where the ":->" means that the unification variable has been filled in with Indirect. Then when zonking alpha, it'd be nice to short-circuit beta too, so we end up with alpha :-> zty beta :-> zty gamma :-> zty where zty is the zonked version of ty. That way, if we come across beta later, we'll have less work to do. (And indeed the same for alpha.) This is easily achieved: just overwrite (Indirect ty) with (Indirect zty). Non-systematic perf comparisons suggest that this is a modest win. But c.f Note [Sharing when zonking to Type] in GHC.Tc.Utils.Zonk. %************************************************************************ %* * Tidying * * ************************************************************************ -} zonkTidyTcType :: TidyEnv -> TcType -> TcM (TidyEnv, TcType) zonkTidyTcType env ty = do { ty' <- zonkTcType ty ; return (tidyOpenType env ty') } zonkTidyTcTypes :: TidyEnv -> [TcType] -> TcM (TidyEnv, [TcType]) zonkTidyTcTypes = zonkTidyTcTypes' [] where zonkTidyTcTypes' zs env [] = return (env, reverse zs) zonkTidyTcTypes' zs env (ty:tys) = do { (env', ty') <- zonkTidyTcType env ty ; zonkTidyTcTypes' (ty':zs) env' tys } zonkTidyOrigin :: TidyEnv -> CtOrigin -> TcM (TidyEnv, CtOrigin) zonkTidyOrigin env (GivenOrigin skol_info) = do { skol_info1 <- zonkSkolemInfo skol_info ; let skol_info2 = tidySkolemInfo env skol_info1 ; return (env, GivenOrigin skol_info2) } zonkTidyOrigin env (OtherSCOrigin sc_depth skol_info) = do { skol_info1 <- zonkSkolemInfo skol_info ; let skol_info2 = tidySkolemInfo env skol_info1 ; return (env, OtherSCOrigin sc_depth skol_info2) } zonkTidyOrigin env orig@(TypeEqOrigin { uo_actual = act , uo_expected = exp }) = do { (env1, act') <- zonkTidyTcType env act ; (env2, exp') <- zonkTidyTcType env1 exp ; return ( env2, orig { uo_actual = act' , uo_expected = exp' }) } zonkTidyOrigin env (KindEqOrigin ty1 ty2 orig t_or_k) = do { (env1, ty1') <- zonkTidyTcType env ty1 ; (env2, ty2') <- zonkTidyTcType env1 ty2 ; (env3, orig') <- zonkTidyOrigin env2 orig ; return (env3, KindEqOrigin ty1' ty2' orig' t_or_k) } zonkTidyOrigin env (FunDepOrigin1 p1 o1 l1 p2 o2 l2) = do { (env1, p1') <- zonkTidyTcType env p1 ; (env2, p2') <- zonkTidyTcType env1 p2 ; return (env2, FunDepOrigin1 p1' o1 l1 p2' o2 l2) } zonkTidyOrigin env (FunDepOrigin2 p1 o1 p2 l2) = do { (env1, p1') <- zonkTidyTcType env p1 ; (env2, p2') <- zonkTidyTcType env1 p2 ; (env3, o1') <- zonkTidyOrigin env2 o1 ; return (env3, FunDepOrigin2 p1' o1' p2' l2) } zonkTidyOrigin env orig = return (env, orig) ---------------- tidyCt :: TidyEnv -> Ct -> Ct -- Used only in error reporting tidyCt env ct = ct { cc_ev = tidy_ev (ctEvidence ct) } where tidy_ev :: CtEvidence -> CtEvidence -- NB: we do not tidy the ctev_evar field because we don't -- show it in error messages tidy_ev ctev = ctev { ctev_pred = tidyType env (ctev_pred ctev) } tidyHole :: TidyEnv -> Hole -> Hole tidyHole env h@(Hole { hole_ty = ty }) = h { hole_ty = tidyType env ty } ---------------- tidyEvVar :: TidyEnv -> EvVar -> EvVar tidyEvVar env var = updateIdTypeAndMult (tidyType env) var ---------------- tidySkolemInfo :: TidyEnv -> SkolemInfo -> SkolemInfo tidySkolemInfo env (DerivSkol ty) = DerivSkol (tidyType env ty) tidySkolemInfo env (SigSkol cx ty tv_prs) = tidySigSkol env cx ty tv_prs tidySkolemInfo env (InferSkol ids) = InferSkol (mapSnd (tidyType env) ids) tidySkolemInfo env (UnifyForAllSkol ty) = UnifyForAllSkol (tidyType env ty) tidySkolemInfo _ info = info tidySigSkol :: TidyEnv -> UserTypeCtxt -> TcType -> [(Name,TcTyVar)] -> SkolemInfo -- We need to take special care when tidying SigSkol -- See Note [SigSkol SkolemInfo] in "GHC.Tc.Types.Origin" tidySigSkol env cx ty tv_prs = SigSkol cx (tidy_ty env ty) tv_prs' where tv_prs' = mapSnd (tidyTyCoVarOcc env) tv_prs inst_env = mkNameEnv tv_prs' tidy_ty env (ForAllTy (Bndr tv vis) ty) = ForAllTy (Bndr tv' vis) (tidy_ty env' ty) where (env', tv') = tidy_tv_bndr env tv tidy_ty env ty@(FunTy InvisArg w arg res) -- Look under c => t = ty { ft_mult = tidy_ty env w, ft_arg = tidyType env arg, ft_res = tidy_ty env res } tidy_ty env ty = tidyType env ty tidy_tv_bndr :: TidyEnv -> TyCoVar -> (TidyEnv, TyCoVar) tidy_tv_bndr env@(occ_env, subst) tv | Just tv' <- lookupNameEnv inst_env (tyVarName tv) = ((occ_env, extendVarEnv subst tv tv'), tv') | otherwise = tidyVarBndr env tv ------------------------------------------------------------------------- {- %************************************************************************ %* * Levity polymorphism checks * * ************************************************************************* See Note [Levity polymorphism checking] in GHC.HsToCore.Monad -} -- | According to the rules around representation polymorphism -- (see https://gitlab.haskell.org/ghc/ghc/wikis/no-sub-kinds), no binder -- can have a representation-polymorphic type. This check ensures -- that we respect this rule. It is a bit regrettable that this error -- occurs in zonking, after which we should have reported all errors. -- But it's hard to see where else to do it, because this can be discovered -- only after all solving is done. And, perhaps most importantly, this -- isn't really a compositional property of a type system, so it's -- not a terrible surprise that the check has to go in an awkward spot. ensureNotLevPoly :: Type -- its zonked type -> SDoc -- where this happened -> TcM () ensureNotLevPoly ty doc = whenNoErrs $ -- sometimes we end up zonking bogus definitions of type -- forall a. a. See, for example, test ghci/scripts/T9140 checkForLevPoly doc ty -- See Note [Levity polymorphism checking] in GHC.HsToCore.Monad checkForLevPoly :: SDoc -> Type -> TcM () checkForLevPoly = checkForLevPolyX addErr checkForLevPolyX :: Monad m => (SDoc -> m ()) -- how to report an error -> SDoc -> Type -> m () checkForLevPolyX add_err extra ty | isTypeLevPoly ty = add_err (formatLevPolyErr ty $$ extra) | otherwise = return () formatLevPolyErr :: Type -- levity-polymorphic type -> SDoc formatLevPolyErr ty = hang (text "A levity-polymorphic type is not allowed here:") 2 (vcat [ text "Type:" <+> pprWithTYPE tidy_ty , text "Kind:" <+> pprWithTYPE tidy_ki ]) where (tidy_env, tidy_ty) = tidyOpenType emptyTidyEnv ty tidy_ki = tidyType tidy_env (tcTypeKind ty) {- %************************************************************************ %* * Error messages * * ************************************************************************* -} -- See Note [Naughty quantification candidates] naughtyQuantification :: TcType -- original type user wanted to quantify -> TcTyVar -- naughty var -> TyVarSet -- skolems that would escape -> TcM a naughtyQuantification orig_ty tv escapees = do { orig_ty1 <- zonkTcType orig_ty -- in case it's not zonked ; escapees' <- mapM zonkTcTyVarToTyVar $ nonDetEltsUniqSet escapees -- we'll just be printing, so no harmful non-determinism ; let fvs = tyCoVarsOfTypeWellScoped orig_ty1 env0 = tidyFreeTyCoVars emptyTidyEnv fvs env = env0 `delTidyEnvList` escapees' -- this avoids gratuitous renaming of the escaped -- variables; very confusing to users! orig_ty' = tidyType env orig_ty1 ppr_tidied = pprTyVars . map (tidyTyCoVarOcc env) doc = pprWithExplicitKindsWhen True $ vcat [ sep [ text "Cannot generalise type; skolem" <> plural escapees' , quotes $ ppr_tidied escapees' , text "would escape" <+> itsOrTheir escapees' <+> text "scope" ] , sep [ text "if I tried to quantify" , ppr_tidied [tv] , text "in this type:" ] , nest 2 (pprTidiedType orig_ty') , text "(Indeed, I sometimes struggle even printing this correctly," , text " due to its ill-scoped nature.)" ] ; failWithTcM (env, doc) }