-> TyCon -> [Type] -- What we are looking for
-> [FamInstMatch] -- Successful matches
lookup_fam_inst_env match_fun one_sided (pkg_ie, home_ie) fam tys
- | not (isOpenTyCon fam)
+ | not (isFamilyTyCon fam)
= []
| otherwise
= ASSERT( n_tys >= arity ) -- Family type applications must be saturated
| otherwise = rec_nts
go rec_nts (TyConApp tc tys) -- Expand open tycons
- | isOpenTyCon tc
+ | isFamilyTyCon tc
, (ACo co, ty) <- normaliseTcApp env tc tys
= -- The ACo says "something happened"
-- Note that normaliseType fully normalises, but it has do to so
= let -- First normalise the arg types so that they'll match
-- when we lookup in in the instance envt
(cois, ntys) = mapAndUnzip (normaliseType env) tys
- tycon_coi = mkTyConAppCoI tc ntys cois
+ tycon_coi = mkTyConAppCoI tc cois
in -- Now try the top-level redex
case lookupFamInstEnv env tc ntys of
-- A matching family instance exists
normaliseType env (AppTy ty1 ty2)
= let (coi1,nty1) = normaliseType env ty1
(coi2,nty2) = normaliseType env ty2
- in (mkAppTyCoI nty1 coi1 nty2 coi2, AppTy nty1 nty2)
+ in (mkAppTyCoI coi1 coi2, AppTy nty1 nty2)
normaliseType env (FunTy ty1 ty2)
= let (coi1,nty1) = normaliseType env ty1
(coi2,nty2) = normaliseType env ty2
- in (mkFunTyCoI nty1 coi1 nty2 coi2, FunTy nty1 nty2)
+ in (mkFunTyCoI coi1 coi2, FunTy nty1 nty2)
normaliseType env (ForAllTy tyvar ty1)
= let (coi,nty1) = normaliseType env ty1
- in (mkForAllTyCoI tyvar coi,ForAllTy tyvar nty1)
+ in (mkForAllTyCoI tyvar coi, ForAllTy tyvar nty1)
normaliseType _ ty@(TyVarTy _)
- = (IdCo,ty)
+ = (IdCo ty,ty)
normaliseType env (PredTy predty)
= normalisePred env predty
normalisePred :: FamInstEnvs -> PredType -> (CoercionI,Type)
normalisePred env (ClassP cls tys)
= let (cois,tys') = mapAndUnzip (normaliseType env) tys
- in (mkClassPPredCoI cls tys' cois, PredTy $ ClassP cls tys')
+ in (mkClassPPredCoI cls cois, PredTy $ ClassP cls tys')
normalisePred env (IParam ipn ty)
= let (coi,ty') = normaliseType env ty
in (mkIParamPredCoI ipn coi, PredTy $ IParam ipn ty')
normalisePred env (EqPred ty1 ty2)
= let (coi1,ty1') = normaliseType env ty1
(coi2,ty2') = normaliseType env ty2
- in (mkEqPredCoI ty1' coi1 ty2' coi2, PredTy $ EqPred ty1' ty2')
+ in (mkEqPredCoI coi1 coi2, PredTy $ EqPred ty1' ty2')
\end{code}