% % (c) The University of Glasgow 2006 % (c) The GRASP/AQUA Project, Glasgow University, 1992-1998 % The @TyCon@ datatype \begin{code}
module TyCon(
        -- * Main TyCon data types
        TyCon, FieldLabel,

        AlgTyConRhs(..), visibleDataCons,
        TyConParent(..), isNoParent,
        SynTyConRhs(..),

        -- ** Coercion axiom constructors
        CoAxiom(..),
        coAxiomName, coAxiomArity, coAxiomTyVars,
        coAxiomLHS, coAxiomRHS, isImplicitCoAxiom,

        -- ** Constructing TyCons
        mkAlgTyCon,
        mkClassTyCon,
        mkFunTyCon,
        mkPrimTyCon,
        mkKindTyCon,
        mkLiftedPrimTyCon,
        mkTupleTyCon,
        mkSynTyCon,
        mkForeignTyCon,
        mkPromotedDataCon,
        mkPromotedTyCon,

        -- ** Predicates on TyCons
        isAlgTyCon,
        isClassTyCon, isFamInstTyCon,
        isFunTyCon,
        isPrimTyCon,
        isTupleTyCon, isUnboxedTupleTyCon, isBoxedTupleTyCon,
        isSynTyCon, isClosedSynTyCon,
        isDecomposableTyCon,
        isForeignTyCon, 
        isPromotedDataCon, isPromotedTyCon,

        isInjectiveTyCon,
        isDataTyCon, isProductTyCon, isEnumerationTyCon,
        isNewTyCon, isAbstractTyCon,
        isFamilyTyCon, isSynFamilyTyCon, isDataFamilyTyCon,
        isUnLiftedTyCon,
        isGadtSyntaxTyCon, isDistinctTyCon, isDistinctAlgRhs,
        isTyConAssoc, tyConAssoc_maybe,
        isRecursiveTyCon,
        isImplicitTyCon,

        -- ** Extracting information out of TyCons
        tyConName,
        tyConKind,
        tyConUnique,
        tyConTyVars,
        tyConCType, tyConCType_maybe,
        tyConDataCons, tyConDataCons_maybe, tyConSingleDataCon_maybe,
        tyConFamilySize,
        tyConStupidTheta,
        tyConArity,
        tyConParent,
        tyConTuple_maybe, tyConClass_maybe,
        tyConFamInst_maybe, tyConFamInstSig_maybe, tyConFamilyCoercion_maybe,
        synTyConDefn, synTyConRhs, synTyConType,
        tyConExtName,           -- External name for foreign types
        algTyConRhs,
        newTyConRhs, newTyConEtadRhs, unwrapNewTyCon_maybe,
        tupleTyConBoxity, tupleTyConSort, tupleTyConArity,
        promotedDataCon, promotedTyCon,

        -- ** Manipulating TyCons
        tcExpandTyCon_maybe, coreExpandTyCon_maybe,
        makeTyConAbstract,
        newTyConCo, newTyConCo_maybe,
        pprPromotionQuote,

        -- * Primitive representations of Types
        PrimRep(..),
        tyConPrimRep,
        primRepSizeW
) where

#include "HsVersions.h"

import {-# SOURCE #-} TypeRep ( Kind, Type, PredType )
import {-# SOURCE #-} DataCon ( DataCon, isVanillaDataCon )

import Var
import Class
import BasicTypes
import ForeignCall
import Name
import PrelNames
import Maybes
import Outputable
import FastString
import Constants
import Util
import qualified Data.Data as Data
import Data.Typeable (Typeable)
\end{code} ----------------------------------------------- Notes about type families ----------------------------------------------- Note [Type synonym families] ~~~~~~~~~~~~~~~~~~~~~~~~~~~~ * Type synonym families, also known as "type functions", map directly onto the type functions in FC: type family F a :: * type instance F Int = Bool ..etc... * Reply "yes" to isSynFamilyTyCon, and isFamilyTyCon * From the user's point of view (F Int) and Bool are simply equivalent types. * A Haskell 98 type synonym is a degenerate form of a type synonym family. * Type functions can't appear in the LHS of a type function: type instance F (F Int) = ... -- BAD! * Translation of type family decl: type family F a :: * translates to a SynTyCon 'F', whose SynTyConRhs is SynFamilyTyCon * Translation of type family decl: type family F a :: * translates to a SynTyCon 'F', whose SynTyConRhs is SynFamilyTyCon * In the future we might want to support * closed type families (esp when we have proper kinds) * injective type families (allow decomposition) but we don't at the moment [2010] Note [Data type families] ~~~~~~~~~~~~~~~~~~~~~~~~~ See also Note [Wrappers for data instance tycons] in MkId.lhs * Data type families are declared thus data family T a :: * data instance T Int = T1 | T2 Bool Here T is the "family TyCon". * Reply "yes" to isDataFamilyTyCon, and isFamilyTyCon * The user does not see any "equivalent types" as he did with type synonym families. He just sees constructors with types T1 :: T Int T2 :: Bool -> T Int * Here's the FC version of the above declarations: data T a data R:TInt = T1 | T2 Bool axiom ax_ti : T Int ~ R:TInt The R:TInt is the "representation TyCons". It has an AlgTyConParent of FamInstTyCon T [Int] ax_ti * The data contructor T2 has a wrapper (which is what the source-level "T2" invokes): $WT2 :: Bool -> T Int $WT2 b = T2 b `cast` sym ax_ti * A data instance can declare a fully-fledged GADT: data instance T (a,b) where X1 :: T (Int,Bool) X2 :: a -> b -> T (a,b) Here's the FC version of the above declaration: data R:TPair a where X1 :: R:TPair Int Bool X2 :: a -> b -> R:TPair a b axiom ax_pr :: T (a,b) ~ R:TPair a b $WX1 :: forall a b. a -> b -> T (a,b) $WX1 a b (x::a) (y::b) = X2 a b x y `cast` sym (ax_pr a b) The R:TPair are the "representation TyCons". We have a bit of work to do, to unpick the result types of the data instance declaration for T (a,b), to get the result type in the representation; e.g. T (a,b) --> R:TPair a b The representation TyCon R:TList, has an AlgTyConParent of FamInstTyCon T [(a,b)] ax_pr * Notice that T is NOT translated to a FC type function; it just becomes a "data type" with no constructors, which can be coerced inot into R:TInt, R:TPair by the axioms. These axioms axioms come into play when (and *only* when) you - use a data constructor - do pattern matching Rather like newtype, in fact As a result - T behaves just like a data type so far as decomposition is concerned - (T Int) is not implicitly converted to R:TInt during type inference. Indeed the latter type is unknown to the programmer. - There *is* an instance for (T Int) in the type-family instance environment, but it is only used for overlap checking - It's fine to have T in the LHS of a type function: type instance F (T a) = [a] It was this last point that confused me! The big thing is that you should not think of a data family T as a *type function* at all, not even an injective one! We can't allow even injective type functions on the LHS of a type function: type family injective G a :: * type instance F (G Int) = Bool is no good, even if G is injective, because consider type instance G Int = Bool type instance F Bool = Char So a data type family is not an injective type function. It's just a data type with some axioms that connect it to other data types. Note [Associated families and their parent class] ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~ *Associated* families are just like *non-associated* families, except that they have a TyConParent of AssocFamilyTyCon, which identifies the parent class. However there is an important sharing relationship between * the tyConTyVars of the parent Class * the tyConTyvars of the associated TyCon class C a b where data T p a type F a q b Here the 'a' and 'b' are shared with the 'Class'; that is, they have the same Unique. This is important. In an instance declaration we expect * all the shared variables to be instantiated the same way * the non-shared variables of the associated type should not be instantiated at all instance C [x] (Tree y) where data T p [x] = T1 x | T2 p type F [x] q (Tree y) = (x,y,q) %************************************************************************ %* * \subsection{The data type} %* * %************************************************************************ \begin{code}
-- | TyCons represent type constructors. Type constructors are introduced by things such as:
--
-- 1) Data declarations: @data Foo = ...@ creates the @Foo@ type constructor of kind @*@
--
-- 2) Type synonyms: @type Foo = ...@ creates the @Foo@ type constructor
--
-- 3) Newtypes: @newtype Foo a = MkFoo ...@ creates the @Foo@ type constructor of kind @* -> *@
--
-- 4) Class declarations: @class Foo where@ creates the @Foo@ type constructor of kind @*@
--
-- This data type also encodes a number of primitive, built in type constructors such as those
-- for function and tuple types.
data TyCon
  = -- | The function type constructor, @(->)@
    FunTyCon {
        tyConUnique :: Unique,
        tyConName   :: Name,
        tc_kind   :: Kind,
        tyConArity  :: Arity
    }

  -- | Algebraic type constructors, which are defined to be those
  -- arising @data@ type and @newtype@ declarations.  All these
  -- constructors are lifted and boxed. See 'AlgTyConRhs' for more
  -- information.
  | AlgTyCon {
        tyConUnique :: Unique,
        tyConName   :: Name,
        tc_kind     :: Kind,
        tyConArity  :: Arity,

        tyConTyVars :: [TyVar],   -- ^ The kind and type variables used in the type constructor.
                                  -- Invariant: length tyvars = arity
                                  -- Precisely, this list scopes over:
                                  --
                                  -- 1. The 'algTcStupidTheta'
                                  -- 2. The cached types in 'algTyConRhs.NewTyCon'
                                  -- 3. The family instance types if present
                                  --
                                  -- Note that it does /not/ scope over the data constructors.
        tyConCType   :: Maybe CType, -- The C type that should be used
                                     -- for this type when using the FFI
                                     -- and CAPI

        algTcGadtSyntax  :: Bool,       -- ^ Was the data type declared with GADT syntax?
                                        -- If so, that doesn't mean it's a true GADT;
                                        -- only that the "where" form was used.
                                        -- This field is used only to guide pretty-printing

        algTcStupidTheta :: [PredType], -- ^ The \"stupid theta\" for the data type
                                        -- (always empty for GADTs).
                                        -- A \"stupid theta\" is the context to the left
                                        -- of an algebraic type declaration,
                                        -- e.g. @Eq a@ in the declaration
                                        --    @data Eq a => T a ...@.

        algTcRhs :: AlgTyConRhs,  -- ^ Contains information about the
                                  -- data constructors of the algebraic type

        algTcRec :: RecFlag,      -- ^ Tells us whether the data type is part
                                  -- of a mutually-recursive group or not

        algTcParent :: TyConParent      -- ^ Gives the class or family declaration 'TyCon'
                                        -- for derived 'TyCon's representing class
                                        -- or family instances, respectively.
                                        -- See also 'synTcParent'
    }

  -- | Represents the infinite family of tuple type constructors,
  --   @()@, @(a,b)@, @(# a, b #)@ etc.
  | TupleTyCon {
        tyConUnique    :: Unique,
        tyConName      :: Name,
        tc_kind        :: Kind,
        tyConArity     :: Arity,
        tyConTupleSort :: TupleSort,
        tyConTyVars    :: [TyVar],
        dataCon        :: DataCon -- ^ Corresponding tuple data constructor
    }

  -- | Represents type synonyms
  | SynTyCon {
        tyConUnique  :: Unique,
        tyConName    :: Name,
        tc_kind    :: Kind,
        tyConArity   :: Arity,

        tyConTyVars  :: [TyVar],        -- Bound tyvars

        synTcRhs     :: SynTyConRhs,    -- ^ Contains information about the
                                        -- expansion of the synonym

        synTcParent  :: TyConParent     -- ^ Gives the family declaration 'TyCon'
                                        -- of 'TyCon's representing family instances

    }

  -- | Primitive types; cannot be defined in Haskell. This includes
  -- the usual suspects (such as @Int#@) as well as foreign-imported
  -- types and kinds
  | PrimTyCon {
        tyConUnique   :: Unique,
        tyConName     :: Name,
        tc_kind       :: Kind,
        tyConArity    :: Arity,         -- SLPJ Oct06: I'm not sure what the significance
                                        --             of the arity of a primtycon is!

        primTyConRep  :: PrimRep,       -- ^ Many primitive tycons are unboxed, but some are
                                        --   boxed (represented by pointers). This 'PrimRep'
                                        --   holds that information.
                                        -- Only relevant if tc_kind = *

        isUnLifted   :: Bool,           -- ^ Most primitive tycons are unlifted
                                        --   (may not contain bottom)
                                        --   but foreign-imported ones may be lifted

        tyConExtName :: Maybe FastString   -- ^ @Just e@ for foreign-imported types,
                                           --   holds the name of the imported thing
    }

  -- | Represents promoted data constructor.
  | PromotedDataCon {         -- See Note [Promoted data constructors]
        tyConUnique :: Unique, -- ^ Same Unique as the data constructor
        tyConName   :: Name,   -- ^ Same Name as the data constructor
        tyConArity  :: Arity,
        tc_kind     :: Kind,   -- ^ Translated type of the data constructor
        dataCon     :: DataCon -- ^ Corresponding data constructor
    }

  -- | Represents promoted type constructor.
  | PromotedTyCon {
        tyConUnique :: Unique, -- ^ Same Unique as the type constructor
        tyConName   :: Name,   -- ^ Same Name as the type constructor
        tyConArity  :: Arity,  -- ^ n if ty_con :: * -> ... -> *  n times
        tc_kind     :: Kind,   -- ^ Always TysPrim.superKind
        ty_con      :: TyCon   -- ^ Corresponding type constructor
    }

  deriving Typeable

-- | Names of the fields in an algebraic record type
type FieldLabel = Name

-- | Represents right-hand-sides of 'TyCon's for algebraic types
data AlgTyConRhs

    -- | Says that we know nothing about this data type, except that
    -- it's represented by a pointer.  Used when we export a data type
    -- abstractly into an .hi file.
  = AbstractTyCon
      Bool      -- True  <=> It's definitely a distinct data type,
                --           equal only to itself; ie not a newtype
                -- False <=> Not sure
                -- See Note [AbstractTyCon and type equality]

    -- | Represents an open type family without a fixed right hand
    -- side.  Additional instances can appear at any time.
    --
    -- These are introduced by either a top level declaration:
    --
    -- > data T a :: *
    --
    -- Or an associated data type declaration, within a class declaration:
    --
    -- > class C a b where
    -- >   data T b :: *
  | DataFamilyTyCon

    -- | Information about those 'TyCon's derived from a @data@
    -- declaration. This includes data types with no constructors at
    -- all.
  | DataTyCon {
        data_cons :: [DataCon],
                          -- ^ The data type constructors; can be empty if the user
                          --   declares the type to have no constructors
                          --
                          -- INVARIANT: Kept in order of increasing 'DataCon' tag
                          --      (see the tag assignment in DataCon.mkDataCon)

        is_enum :: Bool   -- ^ Cached value: is this an enumeration type?
                          --   See Note [Enumeration types]
    }

  -- | Information about those 'TyCon's derived from a @newtype@ declaration
  | NewTyCon {
        data_con :: DataCon,    -- ^ The unique constructor for the @newtype@.
                                --   It has no existentials

        nt_rhs :: Type,         -- ^ Cached value: the argument type of the constructor,
                                -- which is just the representation type of the 'TyCon'
                                -- (remember that @newtype@s do not exist at runtime
                                -- so need a different representation type).
                                --
                                -- The free 'TyVar's of this type are the 'tyConTyVars'
                                -- from the corresponding 'TyCon'

        nt_etad_rhs :: ([TyVar], Type),
                        -- ^ Same as the 'nt_rhs', but this time eta-reduced.
                        -- Hence the list of 'TyVar's in this field may be
                        -- shorter than the declared arity of the 'TyCon'.

                        -- See Note [Newtype eta]
        nt_co :: CoAxiom     -- The axiom coercion that creates the @newtype@ from
                             -- the representation 'Type'.

                             -- See Note [Newtype coercions]
                             -- Invariant: arity = #tvs in nt_etad_rhs;
                             -- See Note [Newtype eta]
                             -- Watch out!  If any newtypes become transparent
                             -- again check Trac #1072.
    }
\end{code} Note [AbstractTyCon and type equality] ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~ TODO \begin{code}

-- | Extract those 'DataCon's that we are able to learn about.  Note
-- that visibility in this sense does not correspond to visibility in
-- the context of any particular user program!
visibleDataCons :: AlgTyConRhs -> [DataCon]
visibleDataCons (AbstractTyCon {})            = []
visibleDataCons DataFamilyTyCon {}            = []
visibleDataCons (DataTyCon{ data_cons = cs }) = cs
visibleDataCons (NewTyCon{ data_con = c })    = [c]

-- ^ Both type classes as well as family instances imply implicit
-- type constructors.  These implicit type constructors refer to their parent
-- structure (ie, the class or family from which they derive) using a type of
-- the following form.  We use 'TyConParent' for both algebraic and synonym
-- types, but the variant 'ClassTyCon' will only be used by algebraic 'TyCon's.
data TyConParent
  = -- | An ordinary type constructor has no parent.
    NoParentTyCon

  -- | Type constructors representing a class dictionary.
  -- See Note [ATyCon for classes] in TypeRep
  | ClassTyCon
        Class           -- INVARIANT: the classTyCon of this Class is the current tycon

  -- | An *associated* type of a class.
  | AssocFamilyTyCon
        Class           -- The class in whose declaration the family is declared
                        -- See Note [Associated families and their parent class]

  -- | Type constructors representing an instance of a *data* family. Parameters:
  --
  --  1) The type family in question
  --
  --  2) Instance types; free variables are the 'tyConTyVars'
  --  of the current 'TyCon' (not the family one). INVARIANT:
  --  the number of types matches the arity of the family 'TyCon'
  --
  --  3) A 'CoTyCon' identifying the representation
  --  type with the type instance family
  | FamInstTyCon          -- See Note [Data type families]
        CoAxiom   -- The coercion constructor,
                  -- always of kind   T ty1 ty2 ~ R:T a b c
                  -- where T is the family TyCon,
                  -- and R:T is the representation TyCon (ie this one)
                  -- and a,b,c are the tyConTyVars of this TyCon

          -- Cached fields of the CoAxiom, but adjusted to
          -- use the tyConTyVars of this TyCon
        TyCon   -- The family TyCon
        [Type]  -- Argument types (mentions the tyConTyVars of this TyCon)
                -- Match in length the tyConTyVars of the family TyCon

        -- E.g.  data intance T [a] = ...
        -- gives a representation tycon:
        --      data R:TList a = ...
        --      axiom co a :: T [a] ~ R:TList a
        -- with R:TList's algTcParent = FamInstTyCon T [a] co

instance Outputable TyConParent where
    ppr NoParentTyCon           = text "No parent"
    ppr (ClassTyCon cls)        = text "Class parent" <+> ppr cls
    ppr (AssocFamilyTyCon cls)  = text "Class parent (assoc. family)" <+> ppr cls
    ppr (FamInstTyCon _ tc tys) = text "Family parent (family instance)" <+> ppr tc <+> sep (map ppr tys)

-- | Checks the invariants of a 'TyConParent' given the appropriate type class name, if any
okParent :: Name -> TyConParent -> Bool
okParent _       NoParentTyCon               = True
okParent tc_name (AssocFamilyTyCon cls)      = tc_name `elem` map tyConName (classATs cls)
okParent tc_name (ClassTyCon cls)            = tc_name == tyConName (classTyCon cls)
okParent _       (FamInstTyCon _ fam_tc tys) = tyConArity fam_tc == length tys

isNoParent :: TyConParent -> Bool
isNoParent NoParentTyCon = True
isNoParent _             = False

--------------------

-- | Information pertaining to the expansion of a type synonym (@type@)
data SynTyConRhs
  = -- | An ordinary type synonyn.
    SynonymTyCon
       Type           -- This 'Type' is the rhs, and may mention from 'tyConTyVars'.
                      -- It acts as a template for the expansion when the 'TyCon'
                      -- is applied to some types.

   -- | A type synonym family  e.g. @type family F x y :: * -> *@
   | SynFamilyTyCon
\end{code} Note [Promoted data constructors] ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~ A data constructor can be promoted to become a type constructor, via the PromotedTyCon alternative in TyCon. * Only "vanilla" data constructors are promoted; ones with no GADT stuff, no existentials, etc. We might generalise this later. * The TyCon promoted from a DataCon has the *same* Name and Unique as the DataCon. Eg. If the data constructor Data.Maybe.Just(unique 78, say) is promoted to a TyCon whose name is Data.Maybe.Just(unique 78) * The *kind* of a promoted DataCon may be polymorphic. Example: type of DataCon Just :: forall (a:*). a -> Maybe a kind of (promoted) tycon Just :: forall (a:box). a -> Maybe a The kind is not identical to the type, because of the */box kind signature on the forall'd variable; so the tc_kind field of PromotedTyCon is not identical to the dataConUserType of the DataCon. But it's the same modulo changing the variable kinds, done by Kind.promoteType. * Small note: We promote the *user* type of the DataCon. Eg data T = MkT {-# UNPACK #-} !(Bool, Bool) The promoted kind is MkT :: (Bool,Bool) -> T *not* MkT :: Bool -> Bool -> T Note [Enumeration types] ~~~~~~~~~~~~~~~~~~~~~~~~ We define datatypes with no constructors to *not* be enumerations; this fixes trac #2578, Otherwise we end up generating an empty table for __closure_tbl which is used by tagToEnum# to map Int# to constructors in an enumeration. The empty table apparently upset the linker. Moreover, all the data constructor must be enumerations, meaning they have type (forall abc. T a b c). GADTs are not enumerations. For example consider data T a where T1 :: T Int T2 :: T Bool T3 :: T a What would [T1 ..] be? [T1,T3] :: T Int? Easiest thing is to exclude them. See Trac #4528. Note [Newtype coercions] ~~~~~~~~~~~~~~~~~~~~~~~~ The NewTyCon field nt_co is a CoAxiom which is used for coercing from the representation type of the newtype, to the newtype itself. For example, newtype T a = MkT (a -> a) the NewTyCon for T will contain nt_co = CoT where CoT t : T t ~ t -> t. In the case that the right hand side is a type application ending with the same type variables as the left hand side, we "eta-contract" the coercion. So if we had newtype S a = MkT [a] then we would generate the arity 0 axiom CoS : S ~ []. The primary reason we do this is to make newtype deriving cleaner. In the paper we'd write axiom CoT : (forall t. T t) ~ (forall t. [t]) and then when we used CoT at a particular type, s, we'd say CoT @ s which encodes as (TyConApp instCoercionTyCon [TyConApp CoT [], s]) Note [Newtype eta] ~~~~~~~~~~~~~~~~~~ Consider newtype Parser m a = MkParser (Foogle m a) Are these two types equal (to Core)? Monad (Parser m) Monad (Foogle m) Well, yes. But to see that easily we eta-reduce the RHS type of Parser, in this case to ([], Froogle), so that even unsaturated applications of Parser will work right. This eta reduction is done when the type constructor is built, and cached in NewTyCon. The cached field is only used in coreExpandTyCon_maybe. Here's an example that I think showed up in practice Source code: newtype T a = MkT [a] newtype Foo m = MkFoo (forall a. m a -> Int) w1 :: Foo [] w1 = ... w2 :: Foo T w2 = MkFoo (\(MkT x) -> case w1 of MkFoo f -> f x) After desugaring, and discarding the data constructors for the newtypes, we get: w2 :: Foo T w2 = w1 And now Lint complains unless Foo T == Foo [], and that requires T==[] This point carries over to the newtype coercion, because we need to say w2 = w1 `cast` Foo CoT so the coercion tycon CoT must have kind: T ~ [] and arity: 0 %************************************************************************ %* * Coercion axioms %* * %************************************************************************ \begin{code}
-- | A 'CoAxiom' is a \"coercion constructor\", i.e. a named equality axiom.
data CoAxiom
  = CoAxiom                   -- Type equality axiom.
    { co_ax_unique   :: Unique      -- unique identifier
    , co_ax_name     :: Name        -- name for pretty-printing
    , co_ax_tvs      :: [TyVar]     -- bound type variables
    , co_ax_lhs      :: Type        -- left-hand side of the equality
    , co_ax_rhs      :: Type        -- right-hand side of the equality
    , co_ax_implicit :: Bool        -- True <=> the axiom is "implicit"
                                    -- See Note [Implicit axioms]
    }
  deriving Typeable

coAxiomArity :: CoAxiom -> Arity
coAxiomArity ax = length (co_ax_tvs ax)

coAxiomName :: CoAxiom -> Name
coAxiomName = co_ax_name

coAxiomTyVars :: CoAxiom -> [TyVar]
coAxiomTyVars = co_ax_tvs

coAxiomLHS, coAxiomRHS :: CoAxiom -> Type
coAxiomLHS = co_ax_lhs
coAxiomRHS = co_ax_rhs

isImplicitCoAxiom :: CoAxiom -> Bool
isImplicitCoAxiom = co_ax_implicit
\end{code} Note [Implicit axioms] ~~~~~~~~~~~~~~~~~~~~~~ See also Note [Implicit TyThings] in HscTypes * A CoAxiom arising from data/type family instances is not "implicit". That is, it has its own IfaceAxiom declaration in an interface file * The CoAxiom arising from a newtype declaration *is* "implicit". That is, it does not have its own IfaceAxiom declaration in an interface file; instead the CoAxiom is generated by type-checking the newtype declaration %************************************************************************ %* * \subsection{PrimRep} %* * %************************************************************************ A PrimRep is somewhat similar to a CgRep (see codeGen/SMRep) and a MachRep (see cmm/CmmExpr), although each of these types has a distinct and clearly defined purpose: - A PrimRep is a CgRep + information about signedness + information about primitive pointers (AddrRep). Signedness and primitive pointers are required when passing a primitive type to a foreign function, but aren't needed for call/return conventions of Haskell functions. - A MachRep is a basic machine type (non-void, doesn't contain information on pointerhood or signedness, but contains some reps that don't have corresponding Haskell types). \begin{code}
-- | A 'PrimRep' is an abstraction of a type.  It contains information that
-- the code generator needs in order to pass arguments, return results,
-- and store values of this type.
data PrimRep
  = VoidRep
  | PtrRep
  | IntRep              -- ^ Signed, word-sized value
  | WordRep             -- ^ Unsigned, word-sized value
  | Int64Rep            -- ^ Signed, 64 bit value (with 32-bit words only)
  | Word64Rep           -- ^ Unsigned, 64 bit value (with 32-bit words only)
  | AddrRep             -- ^ A pointer, but /not/ to a Haskell value (use 'PtrRep')
  | FloatRep
  | DoubleRep
  deriving( Eq, Show )

instance Outputable PrimRep where
  ppr r = text (show r)

-- | Find the size of a 'PrimRep', in words
primRepSizeW :: PrimRep -> Int
primRepSizeW IntRep   = 1
primRepSizeW WordRep  = 1
primRepSizeW Int64Rep = wORD64_SIZE `quot` wORD_SIZE
primRepSizeW Word64Rep= wORD64_SIZE `quot` wORD_SIZE
primRepSizeW FloatRep = 1    -- NB. might not take a full word
primRepSizeW DoubleRep= dOUBLE_SIZE `quot` wORD_SIZE
primRepSizeW AddrRep  = 1
primRepSizeW PtrRep   = 1
primRepSizeW VoidRep  = 0
\end{code} %************************************************************************ %* * \subsection{TyCon Construction} %* * %************************************************************************ Note: the TyCon constructors all take a Kind as one argument, even though they could, in principle, work out their Kind from their other arguments. But to do so they need functions from Types, and that makes a nasty module mutual-recursion. And they aren't called from many places. So we compromise, and move their Kind calculation to the call site. \begin{code}
-- | Given the name of the function type constructor and it's kind, create the
-- corresponding 'TyCon'. It is reccomended to use 'TypeRep.funTyCon' if you want
-- this functionality
mkFunTyCon :: Name -> Kind -> TyCon
mkFunTyCon name kind
  = FunTyCon {
        tyConUnique = nameUnique name,
        tyConName   = name,
        tc_kind   = kind,
        tyConArity  = 2
    }

-- | This is the making of an algebraic 'TyCon'. Notably, you have to
-- pass in the generic (in the -XGenerics sense) information about the
-- type constructor - you can get hold of it easily (see Generics
-- module)
mkAlgTyCon :: Name
           -> Kind              -- ^ Kind of the resulting 'TyCon'
           -> [TyVar]           -- ^ 'TyVar's scoped over: see 'tyConTyVars'.
                                --   Arity is inferred from the length of this list
           -> Maybe CType       -- ^ The C type this type corresponds to
                                --   when using the CAPI FFI
           -> [PredType]        -- ^ Stupid theta: see 'algTcStupidTheta'
           -> AlgTyConRhs       -- ^ Information about dat aconstructors
           -> TyConParent
           -> RecFlag           -- ^ Is the 'TyCon' recursive?
           -> Bool              -- ^ Was the 'TyCon' declared with GADT syntax?
           -> TyCon
mkAlgTyCon name kind tyvars cType stupid rhs parent is_rec gadt_syn
  = AlgTyCon {
        tyConName        = name,
        tyConUnique      = nameUnique name,
        tc_kind          = kind,
        tyConArity       = length tyvars,
        tyConTyVars      = tyvars,
        tyConCType       = cType,
        algTcStupidTheta = stupid,
        algTcRhs         = rhs,
        algTcParent      = ASSERT2( okParent name parent, ppr name $$ ppr parent ) parent,
        algTcRec         = is_rec,
        algTcGadtSyntax  = gadt_syn
    }

-- | Simpler specialization of 'mkAlgTyCon' for classes
mkClassTyCon :: Name -> Kind -> [TyVar] -> AlgTyConRhs -> Class -> RecFlag -> TyCon
mkClassTyCon name kind tyvars rhs clas is_rec =
  mkAlgTyCon name kind tyvars Nothing [] rhs (ClassTyCon clas) is_rec False

mkTupleTyCon :: Name
             -> Kind    -- ^ Kind of the resulting 'TyCon'
             -> Arity   -- ^ Arity of the tuple
             -> [TyVar] -- ^ 'TyVar's scoped over: see 'tyConTyVars'
             -> DataCon
             -> TupleSort  -- ^ Whether the tuple is boxed or unboxed
             -> TyCon
mkTupleTyCon name kind arity tyvars con sort
  = TupleTyCon {
        tyConUnique = nameUnique name,
        tyConName = name,
        tc_kind = kind,
        tyConArity = arity,
        tyConTupleSort = sort,
        tyConTyVars = tyvars,
        dataCon = con
    }

-- ^ Foreign-imported (.NET) type constructors are represented
-- as primitive, but /lifted/, 'TyCons' for now. They are lifted
-- because the Haskell type @T@ representing the (foreign) .NET
-- type @T@ is actually implemented (in ILX) as a @thunk<T>@
mkForeignTyCon :: Name
               -> Maybe FastString -- ^ Name of the foreign imported thing, maybe
               -> Kind
               -> Arity
               -> TyCon
mkForeignTyCon name ext_name kind arity
  = PrimTyCon {
        tyConName    = name,
        tyConUnique  = nameUnique name,
        tc_kind    = kind,
        tyConArity   = arity,
        primTyConRep = PtrRep, -- they all do
        isUnLifted   = False,
        tyConExtName = ext_name
    }


-- | Create an unlifted primitive 'TyCon', such as @Int#@
mkPrimTyCon :: Name  -> Kind -> Arity -> PrimRep -> TyCon
mkPrimTyCon name kind arity rep
  = mkPrimTyCon' name kind arity rep True

-- | Kind constructors
mkKindTyCon :: Name -> Kind -> TyCon
mkKindTyCon name kind
  = mkPrimTyCon' name kind 0 VoidRep True

-- | Create a lifted primitive 'TyCon' such as @RealWorld@
mkLiftedPrimTyCon :: Name  -> Kind -> Arity -> PrimRep -> TyCon
mkLiftedPrimTyCon name kind arity rep
  = mkPrimTyCon' name kind arity rep False

mkPrimTyCon' :: Name  -> Kind -> Arity -> PrimRep -> Bool -> TyCon
mkPrimTyCon' name kind arity rep is_unlifted
  = PrimTyCon {
        tyConName    = name,
        tyConUnique  = nameUnique name,
        tc_kind    = kind,
        tyConArity   = arity,
        primTyConRep = rep,
        isUnLifted   = is_unlifted,
        tyConExtName = Nothing
    }

-- | Create a type synonym 'TyCon'
mkSynTyCon :: Name -> Kind -> [TyVar] -> SynTyConRhs -> TyConParent -> TyCon
mkSynTyCon name kind tyvars rhs parent
  = SynTyCon {
        tyConName = name,
        tyConUnique = nameUnique name,
        tc_kind = kind,
        tyConArity = length tyvars,
        tyConTyVars = tyvars,
        synTcRhs = rhs,
        synTcParent = parent
    }

-- | Create a promoted data constructor 'TyCon'
-- Somewhat dodgily, we give it the same Name
-- as the data constructor itself; when we pretty-print
-- the TyCon we add a quote; see the Outputable TyCon instance
mkPromotedDataCon :: DataCon -> Name -> Unique -> Kind -> Arity -> TyCon
mkPromotedDataCon con name unique kind arity
  = PromotedDataCon {
        tyConName   = name,
        tyConUnique = unique,
        tyConArity  = arity,
        tc_kind     = kind,
        dataCon     = con
  }

-- | Create a promoted type constructor 'TyCon'
-- Somewhat dodgily, we give it the same Name
-- as the type constructor itself
mkPromotedTyCon :: TyCon -> Kind -> TyCon
mkPromotedTyCon tc kind
  = PromotedTyCon {
        tyConName   = getName tc,
        tyConUnique = getUnique tc,
        tyConArity  = tyConArity tc,
        tc_kind     = kind,
        ty_con      = tc
  }
\end{code} \begin{code}
isFunTyCon :: TyCon -> Bool
isFunTyCon (FunTyCon {}) = True
isFunTyCon _             = False

-- | Test if the 'TyCon' is algebraic but abstract (invisible data constructors)
isAbstractTyCon :: TyCon -> Bool
isAbstractTyCon (AlgTyCon { algTcRhs = AbstractTyCon {} }) = True
isAbstractTyCon _ = False

-- | Make an algebraic 'TyCon' abstract. Panics if the supplied 'TyCon' is not algebraic
makeTyConAbstract :: TyCon -> TyCon
makeTyConAbstract tc@(AlgTyCon { algTcRhs = rhs })
  = tc { algTcRhs = AbstractTyCon (isDistinctAlgRhs rhs) }
makeTyConAbstract tc = pprPanic "makeTyConAbstract" (ppr tc)

-- | Does this 'TyCon' represent something that cannot be defined in Haskell?
isPrimTyCon :: TyCon -> Bool
isPrimTyCon (PrimTyCon {}) = True
isPrimTyCon _              = False

-- | Is this 'TyCon' unlifted (i.e. cannot contain bottom)? Note that this can only
-- be true for primitive and unboxed-tuple 'TyCon's
isUnLiftedTyCon :: TyCon -> Bool
isUnLiftedTyCon (PrimTyCon  {isUnLifted = is_unlifted}) = is_unlifted
isUnLiftedTyCon (TupleTyCon {tyConTupleSort = sort})    = not (isBoxed (tupleSortBoxity sort))
isUnLiftedTyCon _                                       = False

-- | Returns @True@ if the supplied 'TyCon' resulted from either a
-- @data@ or @newtype@ declaration
isAlgTyCon :: TyCon -> Bool
isAlgTyCon (AlgTyCon {})   = True
isAlgTyCon (TupleTyCon {}) = True
isAlgTyCon _               = False

isDataTyCon :: TyCon -> Bool
-- ^ Returns @True@ for data types that are /definitely/ represented by
-- heap-allocated constructors.  These are scrutinised by Core-level
-- @case@ expressions, and they get info tables allocated for them.
--
-- Generally, the function will be true for all @data@ types and false
-- for @newtype@s, unboxed tuples and type family 'TyCon's. But it is
-- not guaranteed to return @True@ in all cases that it could.
--
-- NB: for a data type family, only the /instance/ 'TyCon's
--     get an info table.  The family declaration 'TyCon' does not
isDataTyCon (AlgTyCon {algTcRhs = rhs})
  = case rhs of
        DataTyCon {}       -> True
        NewTyCon {}        -> False
        DataFamilyTyCon {} -> False
        AbstractTyCon {}   -> False      -- We don't know, so return False
isDataTyCon (TupleTyCon {tyConTupleSort = sort}) = isBoxed (tupleSortBoxity sort)
isDataTyCon _ = False

-- | 'isDistinctTyCon' is true of 'TyCon's that are equal only to
-- themselves, even via coercions (except for unsafeCoerce).
-- This excludes newtypes, type functions, type synonyms.
-- It relates directly to the FC consistency story:
--     If the axioms are consistent,
--     and  co : S tys ~ T tys, and S,T are "distinct" TyCons,
--     then S=T.
-- Cf Note [Pruning dead case alternatives] in Unify
isDistinctTyCon :: TyCon -> Bool
isDistinctTyCon (AlgTyCon {algTcRhs = rhs}) = isDistinctAlgRhs rhs
isDistinctTyCon (FunTyCon {})               = True
isDistinctTyCon (TupleTyCon {})             = True
isDistinctTyCon (PrimTyCon {})              = True
isDistinctTyCon (PromotedDataCon {})        = True
isDistinctTyCon _                           = False

isDistinctAlgRhs :: AlgTyConRhs -> Bool
isDistinctAlgRhs (DataTyCon {})           = True
isDistinctAlgRhs (DataFamilyTyCon {})     = True
isDistinctAlgRhs (AbstractTyCon distinct) = distinct
isDistinctAlgRhs (NewTyCon {})            = False

-- | Is this 'TyCon' that for a @newtype@
isNewTyCon :: TyCon -> Bool
isNewTyCon (AlgTyCon {algTcRhs = NewTyCon {}}) = True
isNewTyCon _                                   = False

-- | Take a 'TyCon' apart into the 'TyVar's it scopes over, the 'Type' it expands
-- into, and (possibly) a coercion from the representation type to the @newtype@.
-- Returns @Nothing@ if this is not possible.
unwrapNewTyCon_maybe :: TyCon -> Maybe ([TyVar], Type, CoAxiom)
unwrapNewTyCon_maybe (AlgTyCon { tyConTyVars = tvs,
                                 algTcRhs = NewTyCon { nt_co = co,
                                                       nt_rhs = rhs }})
                           = Just (tvs, rhs, co)
unwrapNewTyCon_maybe _     = Nothing

isProductTyCon :: TyCon -> Bool
-- | A /product/ 'TyCon' must both:
--
-- 1. Have /one/ constructor
--
-- 2. /Not/ be existential
--
-- However other than this there are few restrictions: they may be @data@ or @newtype@
-- 'TyCon's of any boxity and may even be recursive.
isProductTyCon tc@(AlgTyCon {}) = case algTcRhs tc of
                                    DataTyCon{ data_cons = [data_con] }
                                                -> isVanillaDataCon data_con
                                    NewTyCon {} -> True
                                    _           -> False
isProductTyCon (TupleTyCon {})  = True
isProductTyCon _                = False

-- | Is this a 'TyCon' representing a type synonym (@type@)?
isSynTyCon :: TyCon -> Bool
isSynTyCon (SynTyCon {}) = True
isSynTyCon _             = False

-- As for newtypes, it is in some contexts important to distinguish between
-- closed synonyms and synonym families, as synonym families have no unique
-- right hand side to which a synonym family application can expand.
--

isDecomposableTyCon :: TyCon -> Bool
-- True iff we can decompose (T a b c) into ((T a b) c)
-- Specifically NOT true of synonyms (open and otherwise)
isDecomposableTyCon (SynTyCon {}) = False
isDecomposableTyCon _other        = True

-- | Is this an algebraic 'TyCon' declared with the GADT syntax?
isGadtSyntaxTyCon :: TyCon -> Bool
isGadtSyntaxTyCon (AlgTyCon { algTcGadtSyntax = res }) = res
isGadtSyntaxTyCon _                                    = False

-- | Is this an algebraic 'TyCon' which is just an enumeration of values?
isEnumerationTyCon :: TyCon -> Bool
-- See Note [Enumeration types] in TyCon
isEnumerationTyCon (AlgTyCon {algTcRhs = DataTyCon { is_enum = res }}) = res
isEnumerationTyCon (TupleTyCon {tyConArity = arity}) = arity == 0
isEnumerationTyCon _                                                   = False

-- | Is this a 'TyCon', synonym or otherwise, that may have further instances appear?
isFamilyTyCon :: TyCon -> Bool
isFamilyTyCon (SynTyCon {synTcRhs = SynFamilyTyCon {}})  = True
isFamilyTyCon (AlgTyCon {algTcRhs = DataFamilyTyCon {}}) = True
isFamilyTyCon _ = False

-- | Is this a synonym 'TyCon' that can have may have further instances appear?
isSynFamilyTyCon :: TyCon -> Bool
isSynFamilyTyCon (SynTyCon {synTcRhs = SynFamilyTyCon {}}) = True
isSynFamilyTyCon _ = False

-- | Is this a synonym 'TyCon' that can have may have further instances appear?
isDataFamilyTyCon :: TyCon -> Bool
isDataFamilyTyCon (AlgTyCon {algTcRhs = DataFamilyTyCon {}}) = True
isDataFamilyTyCon _ = False

-- | Is this a synonym 'TyCon' that can have no further instances appear?
isClosedSynTyCon :: TyCon -> Bool
isClosedSynTyCon tycon = isSynTyCon tycon && not (isFamilyTyCon tycon)

-- | Injective 'TyCon's can be decomposed, so that
--     T ty1 ~ T ty2  =>  ty1 ~ ty2
isInjectiveTyCon :: TyCon -> Bool
isInjectiveTyCon tc = not (isSynTyCon tc)
        -- Ultimately we may have injective associated types
        -- in which case this test will become more interesting
        --
        -- It'd be unusual to call isInjectiveTyCon on a regular H98
        -- type synonym, because you should probably have expanded it first
        -- But regardless, it's not injective!

-- | Are we able to extract informationa 'TyVar' to class argument list
-- mappping from a given 'TyCon'?
isTyConAssoc :: TyCon -> Bool
isTyConAssoc tc = isJust (tyConAssoc_maybe tc)

tyConAssoc_maybe :: TyCon -> Maybe Class
tyConAssoc_maybe tc = case tyConParent tc of
                        AssocFamilyTyCon cls -> Just cls
                        _                    -> Nothing

-- The unit tycon didn't used to be classed as a tuple tycon
-- but I thought that was silly so I've undone it
-- If it can't be for some reason, it should be a AlgTyCon
isTupleTyCon :: TyCon -> Bool
-- ^ Does this 'TyCon' represent a tuple?
--
-- NB: when compiling @Data.Tuple@, the tycons won't reply @True@ to
-- 'isTupleTyCon', becuase they are built as 'AlgTyCons'.  However they
-- get spat into the interface file as tuple tycons, so I don't think
-- it matters.
isTupleTyCon (TupleTyCon {}) = True
isTupleTyCon _               = False

-- | Is this the 'TyCon' for an unboxed tuple?
isUnboxedTupleTyCon :: TyCon -> Bool
isUnboxedTupleTyCon (TupleTyCon {tyConTupleSort = sort}) = not (isBoxed (tupleSortBoxity sort))
isUnboxedTupleTyCon _                                    = False

-- | Is this the 'TyCon' for a boxed tuple?
isBoxedTupleTyCon :: TyCon -> Bool
isBoxedTupleTyCon (TupleTyCon {tyConTupleSort = sort}) = isBoxed (tupleSortBoxity sort)
isBoxedTupleTyCon _                                    = False

-- | Extract the boxity of the given 'TyCon', if it is a 'TupleTyCon'.
-- Panics otherwise
tupleTyConBoxity :: TyCon -> Boxity
tupleTyConBoxity tc = tupleSortBoxity (tyConTupleSort tc)

-- | Extract the 'TupleSort' of the given 'TyCon', if it is a 'TupleTyCon'.
-- Panics otherwise
tupleTyConSort :: TyCon -> TupleSort
tupleTyConSort tc = tyConTupleSort tc

-- | Extract the arity of the given 'TyCon', if it is a 'TupleTyCon'.
-- Panics otherwise
tupleTyConArity :: TyCon -> Arity
tupleTyConArity tc = tyConArity tc

-- | Is this a recursive 'TyCon'?
isRecursiveTyCon :: TyCon -> Bool
isRecursiveTyCon (AlgTyCon {algTcRec = Recursive}) = True
isRecursiveTyCon _                                 = False

-- | Is this the 'TyCon' of a foreign-imported type constructor?
isForeignTyCon :: TyCon -> Bool
isForeignTyCon (PrimTyCon {tyConExtName = Just _}) = True
isForeignTyCon _                                   = False

-- | Is this a PromotedDataCon?
isPromotedDataCon :: TyCon -> Bool
isPromotedDataCon (PromotedDataCon {}) = True
isPromotedDataCon _                    = False

-- | Is this a PromotedTyCon?
isPromotedTyCon :: TyCon -> Bool
isPromotedTyCon (PromotedTyCon {}) = True
isPromotedTyCon _                  = False

-- | Retrieves the promoted DataCon if this is a PromotedDataTyCon;
-- Panics otherwise
promotedDataCon :: TyCon -> DataCon
promotedDataCon = dataCon

-- | Retrieves the promoted TypeCon if this is a PromotedTypeTyCon;
-- Panics otherwise
promotedTyCon :: TyCon -> TyCon
promotedTyCon = ty_con

-- | Identifies implicit tycons that, in particular, do not go into interface
-- files (because they are implicitly reconstructed when the interface is
-- read).
--
-- Note that:
--
-- * Associated families are implicit, as they are re-constructed from
--   the class declaration in which they reside, and
--
-- * Family instances are /not/ implicit as they represent the instance body
--   (similar to a @dfun@ does that for a class instance).
isImplicitTyCon :: TyCon -> Bool
isImplicitTyCon tycon
  | isTyConAssoc tycon = True
  | isSynTyCon tycon   = False
  | isAlgTyCon tycon   = isTupleTyCon tycon
  | otherwise          = True
        -- 'otherwise' catches: FunTyCon, PrimTyCon,
        -- PromotedDataCon, PomotedTypeTyCon

tyConCType_maybe :: TyCon -> Maybe CType
tyConCType_maybe tc@(AlgTyCon {}) = tyConCType tc
tyConCType_maybe _ = Nothing
\end{code} ----------------------------------------------- -- Expand type-constructor applications ----------------------------------------------- \begin{code}
tcExpandTyCon_maybe, coreExpandTyCon_maybe
        :: TyCon
        -> [tyco]                 -- ^ Arguments to 'TyCon'
        -> Maybe ([(TyVar,tyco)],
                  Type,
                  [tyco])         -- ^ Returns a 'TyVar' substitution, the body type
                                  -- of the synonym (not yet substituted) and any arguments
                                  -- remaining from the application

-- ^ Used to create the view the /typechecker/ has on 'TyCon's.
-- We expand (closed) synonyms only, cf. 'coreExpandTyCon_maybe'
tcExpandTyCon_maybe (SynTyCon {tyConTyVars = tvs,
                               synTcRhs = SynonymTyCon rhs }) tys
   = expand tvs rhs tys
tcExpandTyCon_maybe _ _ = Nothing

---------------

-- ^ Used to create the view /Core/ has on 'TyCon's. We expand
-- not only closed synonyms like 'tcExpandTyCon_maybe',
-- but also non-recursive @newtype@s
coreExpandTyCon_maybe tycon tys = tcExpandTyCon_maybe tycon tys


----------------
expand  :: [TyVar] -> Type                 -- Template
        -> [a]                             -- Args
        -> Maybe ([(TyVar,a)], Type, [a])  -- Expansion
expand tvs rhs tys
  = case n_tvs `compare` length tys of
        LT -> Just (tvs `zip` tys, rhs, drop n_tvs tys)
        EQ -> Just (tvs `zip` tys, rhs, [])
        GT -> Nothing
   where
     n_tvs = length tvs
\end{code} \begin{code}
tyConKind :: TyCon -> Kind
tyConKind = tc_kind

-- | As 'tyConDataCons_maybe', but returns the empty list of constructors if no constructors
-- could be found
tyConDataCons :: TyCon -> [DataCon]
-- It's convenient for tyConDataCons to return the
-- empty list for type synonyms etc
tyConDataCons tycon = tyConDataCons_maybe tycon `orElse` []

-- | Determine the 'DataCon's originating from the given 'TyCon', if the 'TyCon' is the
-- sort that can have any constructors (note: this does not include abstract algebraic types)
tyConDataCons_maybe :: TyCon -> Maybe [DataCon]
tyConDataCons_maybe (AlgTyCon {algTcRhs = DataTyCon { data_cons = cons }}) = Just cons
tyConDataCons_maybe (AlgTyCon {algTcRhs = NewTyCon { data_con = con }})    = Just [con]
tyConDataCons_maybe (TupleTyCon {dataCon = con})                           = Just [con]
tyConDataCons_maybe _                                                      = Nothing

-- | Determine the number of value constructors a 'TyCon' has. Panics if the 'TyCon'
-- is not algebraic or a tuple
tyConFamilySize  :: TyCon -> Int
tyConFamilySize (AlgTyCon   {algTcRhs = DataTyCon {data_cons = cons}}) =
  length cons
tyConFamilySize (AlgTyCon   {algTcRhs = NewTyCon {}})        = 1
tyConFamilySize (AlgTyCon   {algTcRhs = DataFamilyTyCon {}}) = 0
tyConFamilySize (TupleTyCon {})                              = 1
tyConFamilySize other = pprPanic "tyConFamilySize:" (ppr other)

-- | Extract an 'AlgTyConRhs' with information about data constructors from an algebraic or tuple
-- 'TyCon'. Panics for any other sort of 'TyCon'
algTyConRhs :: TyCon -> AlgTyConRhs
algTyConRhs (AlgTyCon {algTcRhs = rhs}) = rhs
algTyConRhs (TupleTyCon {dataCon = con, tyConArity = arity})
    = DataTyCon { data_cons = [con], is_enum = arity == 0 }
algTyConRhs other = pprPanic "algTyConRhs" (ppr other)
\end{code} \begin{code}
-- | Extract the bound type variables and type expansion of a type synonym 'TyCon'. Panics if the
-- 'TyCon' is not a synonym
newTyConRhs :: TyCon -> ([TyVar], Type)
newTyConRhs (AlgTyCon {tyConTyVars = tvs, algTcRhs = NewTyCon { nt_rhs = rhs }}) = (tvs, rhs)
newTyConRhs tycon = pprPanic "newTyConRhs" (ppr tycon)

-- | Extract the bound type variables and type expansion of an eta-contracted type synonym 'TyCon'.
-- Panics if the 'TyCon' is not a synonym
newTyConEtadRhs :: TyCon -> ([TyVar], Type)
newTyConEtadRhs (AlgTyCon {algTcRhs = NewTyCon { nt_etad_rhs = tvs_rhs }}) = tvs_rhs
newTyConEtadRhs tycon = pprPanic "newTyConEtadRhs" (ppr tycon)

-- | Extracts the @newtype@ coercion from such a 'TyCon', which can be used to construct something
-- with the @newtype@s type from its representation type (right hand side). If the supplied 'TyCon'
-- is not a @newtype@, returns @Nothing@
newTyConCo_maybe :: TyCon -> Maybe CoAxiom
newTyConCo_maybe (AlgTyCon {algTcRhs = NewTyCon { nt_co = co }}) = Just co
newTyConCo_maybe _                                               = Nothing

newTyConCo :: TyCon -> CoAxiom
newTyConCo tc = case newTyConCo_maybe tc of
                 Just co -> co
                 Nothing -> pprPanic "newTyConCo" (ppr tc)

-- | Find the primitive representation of a 'TyCon'
tyConPrimRep :: TyCon -> PrimRep
tyConPrimRep (PrimTyCon {primTyConRep = rep}) = rep
tyConPrimRep tc = ASSERT(not (isUnboxedTupleTyCon tc)) PtrRep
\end{code} \begin{code}
-- | Find the \"stupid theta\" of the 'TyCon'. A \"stupid theta\" is the context to the left of
-- an algebraic type declaration, e.g. @Eq a@ in the declaration @data Eq a => T a ...@
tyConStupidTheta :: TyCon -> [PredType]
tyConStupidTheta (AlgTyCon {algTcStupidTheta = stupid}) = stupid
tyConStupidTheta (TupleTyCon {})                        = []
tyConStupidTheta tycon = pprPanic "tyConStupidTheta" (ppr tycon)
\end{code} \begin{code}
-- | Extract the 'TyVar's bound by a type synonym and the corresponding (unsubstituted) right hand side.
-- If the given 'TyCon' is not a type synonym, panics
synTyConDefn :: TyCon -> ([TyVar], Type)
synTyConDefn (SynTyCon {tyConTyVars = tyvars, synTcRhs = SynonymTyCon ty})
  = (tyvars, ty)
synTyConDefn tycon = pprPanic "getSynTyConDefn" (ppr tycon)

-- | Extract the information pertaining to the right hand side of a type synonym (@type@) declaration. Panics
-- if the given 'TyCon' is not a type synonym
synTyConRhs :: TyCon -> SynTyConRhs
synTyConRhs (SynTyCon {synTcRhs = rhs}) = rhs
synTyConRhs tc                          = pprPanic "synTyConRhs" (ppr tc)

-- | Find the expansion of the type synonym represented by the given 'TyCon'. The free variables of this
-- type will typically include those 'TyVar's bound by the 'TyCon'. Panics if the 'TyCon' is not that of
-- a type synonym
synTyConType :: TyCon -> Type
synTyConType tc = case synTcRhs tc of
                    SynonymTyCon t -> t
                    _              -> pprPanic "synTyConType" (ppr tc)
\end{code} \begin{code}
-- | If the given 'TyCon' has a /single/ data constructor, i.e. it is a @data@ type with one
-- alternative, a tuple type or a @newtype@ then that constructor is returned. If the 'TyCon'
-- has more than one constructor, or represents a primitive or function type constructor then
-- @Nothing@ is returned. In any other case, the function panics
tyConSingleDataCon_maybe :: TyCon -> Maybe DataCon
tyConSingleDataCon_maybe (TupleTyCon {dataCon = c})                            = Just c
tyConSingleDataCon_maybe (AlgTyCon {algTcRhs = DataTyCon { data_cons = [c] }}) = Just c
tyConSingleDataCon_maybe (AlgTyCon {algTcRhs = NewTyCon { data_con = c }})     = Just c
tyConSingleDataCon_maybe _                                                     = Nothing
\end{code} \begin{code}
-- | Is this 'TyCon' that for a class instance?
isClassTyCon :: TyCon -> Bool
isClassTyCon (AlgTyCon {algTcParent = ClassTyCon _}) = True
isClassTyCon _                                       = False

-- | If this 'TyCon' is that for a class instance, return the class it is for.
-- Otherwise returns @Nothing@
tyConClass_maybe :: TyCon -> Maybe Class
tyConClass_maybe (AlgTyCon {algTcParent = ClassTyCon clas}) = Just clas
tyConClass_maybe _                                          = Nothing

tyConTuple_maybe :: TyCon -> Maybe TupleSort
tyConTuple_maybe (TupleTyCon {tyConTupleSort = sort}) = Just sort
tyConTuple_maybe _                                    = Nothing

----------------------------------------------------------------------------
tyConParent :: TyCon -> TyConParent
tyConParent (AlgTyCon {algTcParent = parent}) = parent
tyConParent (SynTyCon {synTcParent = parent}) = parent
tyConParent _                                 = NoParentTyCon

----------------------------------------------------------------------------
-- | Is this 'TyCon' that for a family instance, be that for a synonym or an
-- algebraic family instance?
isFamInstTyCon :: TyCon -> Bool
isFamInstTyCon tc = case tyConParent tc of
                      FamInstTyCon {} -> True
                      _               -> False

tyConFamInstSig_maybe :: TyCon -> Maybe (TyCon, [Type], CoAxiom)
tyConFamInstSig_maybe tc
  = case tyConParent tc of
      FamInstTyCon ax f ts -> Just (f, ts, ax)
      _                    -> Nothing

-- | If this 'TyCon' is that of a family instance, return the family in question
-- and the instance types. Otherwise, return @Nothing@
tyConFamInst_maybe :: TyCon -> Maybe (TyCon, [Type])
tyConFamInst_maybe tc
  = case tyConParent tc of
      FamInstTyCon _ f ts -> Just (f, ts)
      _                   -> Nothing

-- | If this 'TyCon' is that of a family instance, return a 'TyCon' which represents
-- a coercion identifying the representation type with the type instance family.
-- Otherwise, return @Nothing@
tyConFamilyCoercion_maybe :: TyCon -> Maybe CoAxiom
tyConFamilyCoercion_maybe tc
  = case tyConParent tc of
      FamInstTyCon co _ _ -> Just co
      _                   -> Nothing
\end{code} %************************************************************************ %* * \subsection[TyCon-instances]{Instance declarations for @TyCon@} %* * %************************************************************************ @TyCon@s are compared by comparing their @Unique@s. The strictness analyser needs @Ord@. It is a lexicographic order with the property @(a<=b) || (b<=a)@. \begin{code}
instance Eq TyCon where
    a == b = case (a `compare` b) of { EQ -> True;   _ -> False }
    a /= b = case (a `compare` b) of { EQ -> False;  _ -> True  }

instance Ord TyCon where
    a <= b = case (a `compare` b) of { LT -> True;  EQ -> True;  GT -> False }
    a <  b = case (a `compare` b) of { LT -> True;  EQ -> False; GT -> False }
    a >= b = case (a `compare` b) of { LT -> False; EQ -> True;  GT -> True  }
    a >  b = case (a `compare` b) of { LT -> False; EQ -> False; GT -> True  }
    compare a b = getUnique a `compare` getUnique b

instance Uniquable TyCon where
    getUnique tc = tyConUnique tc

instance Outputable TyCon where
  -- At the moment a promoted TyCon has the same Name as its
  -- corresponding TyCon, so we add the quote to distinguish it here
  ppr tc = pprPromotionQuote tc <> ppr (tyConName tc)

pprPromotionQuote :: TyCon -> SDoc
pprPromotionQuote (PromotedDataCon {}) = char '\''   -- Quote promoted DataCons in types
pprPromotionQuote (PromotedTyCon {})   = ifPprDebug (char '\'') 
pprPromotionQuote _                    = empty       -- However, we don't quote TyCons in kinds
                                                     -- e.g.   type family T a :: Bool -> *
                                                     -- cf Trac #5952.  Except with -dppr-debug

instance NamedThing TyCon where
    getName = tyConName

instance Data.Data TyCon where
    -- don't traverse?
    toConstr _   = abstractConstr "TyCon"
    gunfold _ _  = error "gunfold"
    dataTypeOf _ = mkNoRepType "TyCon"

-------------------
instance Eq CoAxiom where
    a == b = case (a `compare` b) of { EQ -> True;   _ -> False }
    a /= b = case (a `compare` b) of { EQ -> False;  _ -> True  }

instance Ord CoAxiom where
    a <= b = case (a `compare` b) of { LT -> True;  EQ -> True;  GT -> False }
    a <  b = case (a `compare` b) of { LT -> True;  EQ -> False; GT -> False }
    a >= b = case (a `compare` b) of { LT -> False; EQ -> True;  GT -> True  }
    a >  b = case (a `compare` b) of { LT -> False; EQ -> False; GT -> True  }
    compare a b = getUnique a `compare` getUnique b

instance Uniquable CoAxiom where
    getUnique = co_ax_unique

instance Outputable CoAxiom where
    ppr = ppr . getName

instance NamedThing CoAxiom where
    getName = co_ax_name

instance Data.Data CoAxiom where
    -- don't traverse?
    toConstr _   = abstractConstr "CoAxiom"
    gunfold _ _  = error "gunfold"
    dataTypeOf _ = mkNoRepType "CoAxiom"
\end{code}