-- (c) The University of Glasgow 2012

{-# LANGUAGE CPP, DataKinds, DeriveDataTypeable, GADTs, KindSignatures,
             ScopedTypeVariables, StandaloneDeriving, RoleAnnotations #-}

-- | Module for coercion axioms, used to represent type family instances
-- and newtypes

module CoAxiom (
       BranchFlag, Branched, Unbranched, BranchIndex, Branches(..),
       manyBranches, unbranched,
       fromBranches, numBranches,
       mapAccumBranches,

       CoAxiom(..), CoAxBranch(..),

       toBranchedAxiom, toUnbranchedAxiom,
       coAxiomName, coAxiomArity, coAxiomBranches,
       coAxiomTyCon, isImplicitCoAxiom, coAxiomNumPats,
       coAxiomNthBranch, coAxiomSingleBranch_maybe, coAxiomRole,
       coAxiomSingleBranch, coAxBranchTyVars, coAxBranchCoVars,
       coAxBranchRoles,
       coAxBranchLHS, coAxBranchRHS, coAxBranchSpan, coAxBranchIncomps,
       placeHolderIncomps,

       Role(..), fsFromRole,

       CoAxiomRule(..), TypeEqn,
       BuiltInSynFamily(..), trivialBuiltInFamily
       ) where

import GhcPrelude

import {-# SOURCE #-} TyCoRep ( Type, pprType )
import {-# SOURCE #-} TyCon ( TyCon )
import Outputable
import FastString
import Name
import Unique
import Var
import Util
import Binary
import Pair
import BasicTypes
import Data.Typeable ( Typeable )
import SrcLoc
import qualified Data.Data as Data
import Data.Array
import Data.List ( mapAccumL )

#include "HsVersions.h"

{-
Note [Coercion axiom branches]
~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
In order to allow closed type families, an axiom needs to contain an
ordered list of alternatives, called branches. The kind of the coercion built
from an axiom is determined by which index is used when building the coercion
from the axiom.

For example, consider the axiom derived from the following declaration:

type family F a where
  F [Int] = Bool
  F [a]   = Double
  F (a b) = Char

This will give rise to this axiom:

axF :: {                                         F [Int] ~ Bool
       ; forall (a :: *).                        F [a]   ~ Double
       ; forall (k :: *) (a :: k -> *) (b :: k). F (a b) ~ Char
       }

The axiom is used with the AxiomInstCo constructor of Coercion. If we wish
to have a coercion showing that F (Maybe Int) ~ Char, it will look like

axF[2] <*> <Maybe> <Int> :: F (Maybe Int) ~ Char
-- or, written using concrete-ish syntax --
AxiomInstCo axF 2 [Refl *, Refl Maybe, Refl Int]

Note that the index is 0-based.

For type-checking, it is also necessary to check that no previous pattern
can unify with the supplied arguments. After all, it is possible that some
of the type arguments are lambda-bound type variables whose instantiation may
cause an earlier match among the branches. We wish to prohibit this behavior,
so the type checker rules out the choice of a branch where a previous branch
can unify. See also [Apartness] in FamInstEnv.hs.

For example, the following is malformed, where 'a' is a lambda-bound type
variable:

axF[2] <*> <a> <Bool> :: F (a Bool) ~ Char

Why? Because a might be instantiated with [], meaning that branch 1 should
apply, not branch 2. This is a vital consistency check; without it, we could
derive Int ~ Bool, and that is a Bad Thing.

Note [Branched axioms]
~~~~~~~~~~~~~~~~~~~~~~
Although a CoAxiom has the capacity to store many branches, in certain cases,
we want only one. These cases are in data/newtype family instances, newtype
coercions, and type family instances.
Furthermore, these unbranched axioms are used in a
variety of places throughout GHC, and it would difficult to generalize all of
that code to deal with branched axioms, especially when the code can be sure
of the fact that an axiom is indeed a singleton. At the same time, it seems
dangerous to assume singlehood in various places through GHC.

The solution to this is to label a CoAxiom with a phantom type variable
declaring whether it is known to be a singleton or not. The branches
are stored using a special datatype, declared below, that ensures that the
type variable is accurate.

************************************************************************
*                                                                      *
                    Branches
*                                                                      *
************************************************************************
-}

type BranchIndex = Int  -- The index of the branch in the list of branches
                        -- Counting from zero

-- promoted data type
data BranchFlag = Branched | Unbranched
type Branched = 'Branched
type Unbranched = 'Unbranched
-- By using type synonyms for the promoted constructors, we avoid needing
-- DataKinds and the promotion quote in client modules. This also means that
-- we don't need to export the term-level constructors, which should never be used.

newtype Branches (br :: BranchFlag)
  = MkBranches { Branches br -> Array BranchIndex CoAxBranch
unMkBranches :: Array BranchIndex CoAxBranch }
type role Branches nominal

manyBranches :: [CoAxBranch] -> Branches Branched
manyBranches :: [CoAxBranch] -> Branches Branched
manyBranches brs :: [CoAxBranch]
brs = ASSERT( snd bnds >= fst bnds )
                   Array BranchIndex CoAxBranch -> Branches Branched
forall (br :: BranchFlag).
Array BranchIndex CoAxBranch -> Branches br
MkBranches ((BranchIndex, BranchIndex)
-> [CoAxBranch] -> Array BranchIndex CoAxBranch
forall i e. Ix i => (i, i) -> [e] -> Array i e
listArray (BranchIndex, BranchIndex)
bnds [CoAxBranch]
brs)
  where
    bnds :: (BranchIndex, BranchIndex)
bnds = (0, [CoAxBranch] -> BranchIndex
forall (t :: * -> *) a. Foldable t => t a -> BranchIndex
length [CoAxBranch]
brs BranchIndex -> BranchIndex -> BranchIndex
forall a. Num a => a -> a -> a
- 1)

unbranched :: CoAxBranch -> Branches Unbranched
unbranched :: CoAxBranch -> Branches Unbranched
unbranched br :: CoAxBranch
br = Array BranchIndex CoAxBranch -> Branches Unbranched
forall (br :: BranchFlag).
Array BranchIndex CoAxBranch -> Branches br
MkBranches ((BranchIndex, BranchIndex)
-> [CoAxBranch] -> Array BranchIndex CoAxBranch
forall i e. Ix i => (i, i) -> [e] -> Array i e
listArray (0, 0) [CoAxBranch
br])

toBranched :: Branches br -> Branches Branched
toBranched :: Branches br -> Branches Branched
toBranched = Array BranchIndex CoAxBranch -> Branches Branched
forall (br :: BranchFlag).
Array BranchIndex CoAxBranch -> Branches br
MkBranches (Array BranchIndex CoAxBranch -> Branches Branched)
-> (Branches br -> Array BranchIndex CoAxBranch)
-> Branches br
-> Branches Branched
forall b c a. (b -> c) -> (a -> b) -> a -> c
. Branches br -> Array BranchIndex CoAxBranch
forall (br :: BranchFlag).
Branches br -> Array BranchIndex CoAxBranch
unMkBranches

toUnbranched :: Branches br -> Branches Unbranched
toUnbranched :: Branches br -> Branches Unbranched
toUnbranched (MkBranches arr :: Array BranchIndex CoAxBranch
arr) = ASSERT( bounds arr == (0,0) )
                                Array BranchIndex CoAxBranch -> Branches Unbranched
forall (br :: BranchFlag).
Array BranchIndex CoAxBranch -> Branches br
MkBranches Array BranchIndex CoAxBranch
arr

fromBranches :: Branches br -> [CoAxBranch]
fromBranches :: Branches br -> [CoAxBranch]
fromBranches = Array BranchIndex CoAxBranch -> [CoAxBranch]
forall i e. Array i e -> [e]
elems (Array BranchIndex CoAxBranch -> [CoAxBranch])
-> (Branches br -> Array BranchIndex CoAxBranch)
-> Branches br
-> [CoAxBranch]
forall b c a. (b -> c) -> (a -> b) -> a -> c
. Branches br -> Array BranchIndex CoAxBranch
forall (br :: BranchFlag).
Branches br -> Array BranchIndex CoAxBranch
unMkBranches

branchesNth :: Branches br -> BranchIndex -> CoAxBranch
branchesNth :: Branches br -> BranchIndex -> CoAxBranch
branchesNth (MkBranches arr :: Array BranchIndex CoAxBranch
arr) n :: BranchIndex
n = Array BranchIndex CoAxBranch
arr Array BranchIndex CoAxBranch -> BranchIndex -> CoAxBranch
forall i e. Ix i => Array i e -> i -> e
! BranchIndex
n

numBranches :: Branches br -> Int
numBranches :: Branches br -> BranchIndex
numBranches (MkBranches arr :: Array BranchIndex CoAxBranch
arr) = (BranchIndex, BranchIndex) -> BranchIndex
forall a b. (a, b) -> b
snd (Array BranchIndex CoAxBranch -> (BranchIndex, BranchIndex)
forall i e. Array i e -> (i, i)
bounds Array BranchIndex CoAxBranch
arr) BranchIndex -> BranchIndex -> BranchIndex
forall a. Num a => a -> a -> a
+ 1

-- | The @[CoAxBranch]@ passed into the mapping function is a list of
-- all previous branches, reversed
mapAccumBranches :: ([CoAxBranch] -> CoAxBranch -> CoAxBranch)
                  -> Branches br -> Branches br
mapAccumBranches :: ([CoAxBranch] -> CoAxBranch -> CoAxBranch)
-> Branches br -> Branches br
mapAccumBranches f :: [CoAxBranch] -> CoAxBranch -> CoAxBranch
f (MkBranches arr :: Array BranchIndex CoAxBranch
arr)
  = Array BranchIndex CoAxBranch -> Branches br
forall (br :: BranchFlag).
Array BranchIndex CoAxBranch -> Branches br
MkBranches ((BranchIndex, BranchIndex)
-> [CoAxBranch] -> Array BranchIndex CoAxBranch
forall i e. Ix i => (i, i) -> [e] -> Array i e
listArray (Array BranchIndex CoAxBranch -> (BranchIndex, BranchIndex)
forall i e. Array i e -> (i, i)
bounds Array BranchIndex CoAxBranch
arr) (([CoAxBranch], [CoAxBranch]) -> [CoAxBranch]
forall a b. (a, b) -> b
snd (([CoAxBranch], [CoAxBranch]) -> [CoAxBranch])
-> ([CoAxBranch], [CoAxBranch]) -> [CoAxBranch]
forall a b. (a -> b) -> a -> b
$ ([CoAxBranch] -> CoAxBranch -> ([CoAxBranch], CoAxBranch))
-> [CoAxBranch] -> [CoAxBranch] -> ([CoAxBranch], [CoAxBranch])
forall (t :: * -> *) a b c.
Traversable t =>
(a -> b -> (a, c)) -> a -> t b -> (a, t c)
mapAccumL [CoAxBranch] -> CoAxBranch -> ([CoAxBranch], CoAxBranch)
go [] (Array BranchIndex CoAxBranch -> [CoAxBranch]
forall i e. Array i e -> [e]
elems Array BranchIndex CoAxBranch
arr)))
  where
    go :: [CoAxBranch] -> CoAxBranch -> ([CoAxBranch], CoAxBranch)
    go :: [CoAxBranch] -> CoAxBranch -> ([CoAxBranch], CoAxBranch)
go prev_branches :: [CoAxBranch]
prev_branches cur_branch :: CoAxBranch
cur_branch = ( CoAxBranch
cur_branch CoAxBranch -> [CoAxBranch] -> [CoAxBranch]
forall a. a -> [a] -> [a]
: [CoAxBranch]
prev_branches
                                  , [CoAxBranch] -> CoAxBranch -> CoAxBranch
f [CoAxBranch]
prev_branches CoAxBranch
cur_branch )


{-
************************************************************************
*                                                                      *
                    Coercion axioms
*                                                                      *
************************************************************************

Note [Storing compatibility]
~~~~~~~~~~~~~~~~~~~~~~~~~~~~
During axiom application, we need to be aware of which branches are compatible
with which others. The full explanation is in Note [Compatibility] in
FamInstEnv. (The code is placed there to avoid a dependency from CoAxiom on
the unification algorithm.) Although we could theoretically compute
compatibility on the fly, this is silly, so we store it in a CoAxiom.

Specifically, each branch refers to all other branches with which it is
incompatible. This list might well be empty, and it will always be for the
first branch of any axiom.

CoAxBranches that do not (yet) belong to a CoAxiom should have a panic thunk
stored in cab_incomps. The incompatibilities are properly a property of the
axiom as a whole, and they are computed only when the final axiom is built.

During serialization, the list is converted into a list of the indices
of the branches.
-}

-- | A 'CoAxiom' is a \"coercion constructor\", i.e. a named equality axiom.

-- If you edit this type, you may need to update the GHC formalism
-- See Note [GHC Formalism] in coreSyn/CoreLint.hs
data CoAxiom br
  = CoAxiom                   -- Type equality axiom.
    { CoAxiom br -> Unique
co_ax_unique   :: Unique        -- Unique identifier
    , CoAxiom br -> Name
co_ax_name     :: Name          -- Name for pretty-printing
    , CoAxiom br -> Role
co_ax_role     :: Role          -- Role of the axiom's equality
    , CoAxiom br -> TyCon
co_ax_tc       :: TyCon         -- The head of the LHS patterns
                                      -- e.g.  the newtype or family tycon
    , CoAxiom br -> Branches br
co_ax_branches :: Branches br   -- The branches that form this axiom
    , CoAxiom br -> Bool
co_ax_implicit :: Bool          -- True <=> the axiom is "implicit"
                                      -- See Note [Implicit axioms]
         -- INVARIANT: co_ax_implicit == True implies length co_ax_branches == 1.
    }

data CoAxBranch
  = CoAxBranch
    { CoAxBranch -> SrcSpan
cab_loc      :: SrcSpan       -- Location of the defining equation
                                    -- See Note [CoAxiom locations]
    , CoAxBranch -> [TyVar]
cab_tvs      :: [TyVar]       -- Bound type variables; not necessarily fresh
    , CoAxBranch -> [TyVar]
cab_eta_tvs  :: [TyVar]       -- Eta-reduced tyvars
                                    -- See Note [CoAxBranch type variables]
                                    -- cab_tvs and cab_lhs may be eta-reduded; see
                                    -- Note [Eta reduction for data families]
    , CoAxBranch -> [TyVar]
cab_cvs      :: [CoVar]       -- Bound coercion variables
                                    -- Always empty, for now.
                                    -- See Note [Constraints in patterns]
                                    -- in TcTyClsDecls
    , CoAxBranch -> [Role]
cab_roles    :: [Role]        -- See Note [CoAxBranch roles]
    , CoAxBranch -> [Type]
cab_lhs      :: [Type]        -- Type patterns to match against
                                    -- See Note [CoAxiom saturation]
    , CoAxBranch -> Type
cab_rhs      :: Type          -- Right-hand side of the equality
    , CoAxBranch -> [CoAxBranch]
cab_incomps  :: [CoAxBranch]  -- The previous incompatible branches
                                    -- See Note [Storing compatibility]
    }
  deriving Typeable CoAxBranch
DataType
Constr
Typeable CoAxBranch =>
(forall (c :: * -> *).
 (forall d b. Data d => c (d -> b) -> d -> c b)
 -> (forall g. g -> c g) -> CoAxBranch -> c CoAxBranch)
-> (forall (c :: * -> *).
    (forall b r. Data b => c (b -> r) -> c r)
    -> (forall r. r -> c r) -> Constr -> c CoAxBranch)
-> (CoAxBranch -> Constr)
-> (CoAxBranch -> DataType)
-> (forall (t :: * -> *) (c :: * -> *).
    Typeable t =>
    (forall d. Data d => c (t d)) -> Maybe (c CoAxBranch))
-> (forall (t :: * -> * -> *) (c :: * -> *).
    Typeable t =>
    (forall d e. (Data d, Data e) => c (t d e))
    -> Maybe (c CoAxBranch))
-> ((forall b. Data b => b -> b) -> CoAxBranch -> CoAxBranch)
-> (forall r r'.
    (r -> r' -> r)
    -> r -> (forall d. Data d => d -> r') -> CoAxBranch -> r)
-> (forall r r'.
    (r' -> r -> r)
    -> r -> (forall d. Data d => d -> r') -> CoAxBranch -> r)
-> (forall u. (forall d. Data d => d -> u) -> CoAxBranch -> [u])
-> (forall u.
    BranchIndex -> (forall d. Data d => d -> u) -> CoAxBranch -> u)
-> (forall (m :: * -> *).
    Monad m =>
    (forall d. Data d => d -> m d) -> CoAxBranch -> m CoAxBranch)
-> (forall (m :: * -> *).
    MonadPlus m =>
    (forall d. Data d => d -> m d) -> CoAxBranch -> m CoAxBranch)
-> (forall (m :: * -> *).
    MonadPlus m =>
    (forall d. Data d => d -> m d) -> CoAxBranch -> m CoAxBranch)
-> Data CoAxBranch
CoAxBranch -> DataType
CoAxBranch -> Constr
(forall b. Data b => b -> b) -> CoAxBranch -> CoAxBranch
(forall d b. Data d => c (d -> b) -> d -> c b)
-> (forall g. g -> c g) -> CoAxBranch -> c CoAxBranch
(forall b r. Data b => c (b -> r) -> c r)
-> (forall r. r -> c r) -> Constr -> c CoAxBranch
forall a.
Typeable a =>
(forall (c :: * -> *).
 (forall d b. Data d => c (d -> b) -> d -> c b)
 -> (forall g. g -> c g) -> a -> c a)
-> (forall (c :: * -> *).
    (forall b r. Data b => c (b -> r) -> c r)
    -> (forall r. r -> c r) -> Constr -> c a)
-> (a -> Constr)
-> (a -> DataType)
-> (forall (t :: * -> *) (c :: * -> *).
    Typeable t =>
    (forall d. Data d => c (t d)) -> Maybe (c a))
-> (forall (t :: * -> * -> *) (c :: * -> *).
    Typeable t =>
    (forall d e. (Data d, Data e) => c (t d e)) -> Maybe (c a))
-> ((forall b. Data b => b -> b) -> a -> a)
-> (forall r r'.
    (r -> r' -> r) -> r -> (forall d. Data d => d -> r') -> a -> r)
-> (forall r r'.
    (r' -> r -> r) -> r -> (forall d. Data d => d -> r') -> a -> r)
-> (forall u. (forall d. Data d => d -> u) -> a -> [u])
-> (forall u.
    BranchIndex -> (forall d. Data d => d -> u) -> a -> u)
-> (forall (m :: * -> *).
    Monad m =>
    (forall d. Data d => d -> m d) -> a -> m a)
-> (forall (m :: * -> *).
    MonadPlus m =>
    (forall d. Data d => d -> m d) -> a -> m a)
-> (forall (m :: * -> *).
    MonadPlus m =>
    (forall d. Data d => d -> m d) -> a -> m a)
-> Data a
forall u.
BranchIndex -> (forall d. Data d => d -> u) -> CoAxBranch -> u
forall u. (forall d. Data d => d -> u) -> CoAxBranch -> [u]
forall r r'.
(r -> r' -> r)
-> r -> (forall d. Data d => d -> r') -> CoAxBranch -> r
forall r r'.
(r' -> r -> r)
-> r -> (forall d. Data d => d -> r') -> CoAxBranch -> r
forall (m :: * -> *).
Monad m =>
(forall d. Data d => d -> m d) -> CoAxBranch -> m CoAxBranch
forall (m :: * -> *).
MonadPlus m =>
(forall d. Data d => d -> m d) -> CoAxBranch -> m CoAxBranch
forall (c :: * -> *).
(forall b r. Data b => c (b -> r) -> c r)
-> (forall r. r -> c r) -> Constr -> c CoAxBranch
forall (c :: * -> *).
(forall d b. Data d => c (d -> b) -> d -> c b)
-> (forall g. g -> c g) -> CoAxBranch -> c CoAxBranch
forall (t :: * -> *) (c :: * -> *).
Typeable t =>
(forall d. Data d => c (t d)) -> Maybe (c CoAxBranch)
forall (t :: * -> * -> *) (c :: * -> *).
Typeable t =>
(forall d e. (Data d, Data e) => c (t d e)) -> Maybe (c CoAxBranch)
$cCoAxBranch :: Constr
$tCoAxBranch :: DataType
gmapMo :: (forall d. Data d => d -> m d) -> CoAxBranch -> m CoAxBranch
$cgmapMo :: forall (m :: * -> *).
MonadPlus m =>
(forall d. Data d => d -> m d) -> CoAxBranch -> m CoAxBranch
gmapMp :: (forall d. Data d => d -> m d) -> CoAxBranch -> m CoAxBranch
$cgmapMp :: forall (m :: * -> *).
MonadPlus m =>
(forall d. Data d => d -> m d) -> CoAxBranch -> m CoAxBranch
gmapM :: (forall d. Data d => d -> m d) -> CoAxBranch -> m CoAxBranch
$cgmapM :: forall (m :: * -> *).
Monad m =>
(forall d. Data d => d -> m d) -> CoAxBranch -> m CoAxBranch
gmapQi :: BranchIndex -> (forall d. Data d => d -> u) -> CoAxBranch -> u
$cgmapQi :: forall u.
BranchIndex -> (forall d. Data d => d -> u) -> CoAxBranch -> u
gmapQ :: (forall d. Data d => d -> u) -> CoAxBranch -> [u]
$cgmapQ :: forall u. (forall d. Data d => d -> u) -> CoAxBranch -> [u]
gmapQr :: (r' -> r -> r)
-> r -> (forall d. Data d => d -> r') -> CoAxBranch -> r
$cgmapQr :: forall r r'.
(r' -> r -> r)
-> r -> (forall d. Data d => d -> r') -> CoAxBranch -> r
gmapQl :: (r -> r' -> r)
-> r -> (forall d. Data d => d -> r') -> CoAxBranch -> r
$cgmapQl :: forall r r'.
(r -> r' -> r)
-> r -> (forall d. Data d => d -> r') -> CoAxBranch -> r
gmapT :: (forall b. Data b => b -> b) -> CoAxBranch -> CoAxBranch
$cgmapT :: (forall b. Data b => b -> b) -> CoAxBranch -> CoAxBranch
dataCast2 :: (forall d e. (Data d, Data e) => c (t d e)) -> Maybe (c CoAxBranch)
$cdataCast2 :: forall (t :: * -> * -> *) (c :: * -> *).
Typeable t =>
(forall d e. (Data d, Data e) => c (t d e)) -> Maybe (c CoAxBranch)
dataCast1 :: (forall d. Data d => c (t d)) -> Maybe (c CoAxBranch)
$cdataCast1 :: forall (t :: * -> *) (c :: * -> *).
Typeable t =>
(forall d. Data d => c (t d)) -> Maybe (c CoAxBranch)
dataTypeOf :: CoAxBranch -> DataType
$cdataTypeOf :: CoAxBranch -> DataType
toConstr :: CoAxBranch -> Constr
$ctoConstr :: CoAxBranch -> Constr
gunfold :: (forall b r. Data b => c (b -> r) -> c r)
-> (forall r. r -> c r) -> Constr -> c CoAxBranch
$cgunfold :: forall (c :: * -> *).
(forall b r. Data b => c (b -> r) -> c r)
-> (forall r. r -> c r) -> Constr -> c CoAxBranch
gfoldl :: (forall d b. Data d => c (d -> b) -> d -> c b)
-> (forall g. g -> c g) -> CoAxBranch -> c CoAxBranch
$cgfoldl :: forall (c :: * -> *).
(forall d b. Data d => c (d -> b) -> d -> c b)
-> (forall g. g -> c g) -> CoAxBranch -> c CoAxBranch
$cp1Data :: Typeable CoAxBranch
Data.Data

toBranchedAxiom :: CoAxiom br -> CoAxiom Branched
toBranchedAxiom :: CoAxiom br -> CoAxiom Branched
toBranchedAxiom (CoAxiom unique :: Unique
unique name :: Name
name role :: Role
role tc :: TyCon
tc branches :: Branches br
branches implicit :: Bool
implicit)
  = Unique
-> Name
-> Role
-> TyCon
-> Branches Branched
-> Bool
-> CoAxiom Branched
forall (br :: BranchFlag).
Unique
-> Name -> Role -> TyCon -> Branches br -> Bool -> CoAxiom br
CoAxiom Unique
unique Name
name Role
role TyCon
tc (Branches br -> Branches Branched
forall (br :: BranchFlag). Branches br -> Branches Branched
toBranched Branches br
branches) Bool
implicit

toUnbranchedAxiom :: CoAxiom br -> CoAxiom Unbranched
toUnbranchedAxiom :: CoAxiom br -> CoAxiom Unbranched
toUnbranchedAxiom (CoAxiom unique :: Unique
unique name :: Name
name role :: Role
role tc :: TyCon
tc branches :: Branches br
branches implicit :: Bool
implicit)
  = Unique
-> Name
-> Role
-> TyCon
-> Branches Unbranched
-> Bool
-> CoAxiom Unbranched
forall (br :: BranchFlag).
Unique
-> Name -> Role -> TyCon -> Branches br -> Bool -> CoAxiom br
CoAxiom Unique
unique Name
name Role
role TyCon
tc (Branches br -> Branches Unbranched
forall (br :: BranchFlag). Branches br -> Branches Unbranched
toUnbranched Branches br
branches) Bool
implicit

coAxiomNumPats :: CoAxiom br -> Int
coAxiomNumPats :: CoAxiom br -> BranchIndex
coAxiomNumPats = [Type] -> BranchIndex
forall (t :: * -> *) a. Foldable t => t a -> BranchIndex
length ([Type] -> BranchIndex)
-> (CoAxiom br -> [Type]) -> CoAxiom br -> BranchIndex
forall b c a. (b -> c) -> (a -> b) -> a -> c
. CoAxBranch -> [Type]
coAxBranchLHS (CoAxBranch -> [Type])
-> (CoAxiom br -> CoAxBranch) -> CoAxiom br -> [Type]
forall b c a. (b -> c) -> (a -> b) -> a -> c
. ((CoAxiom br -> BranchIndex -> CoAxBranch)
-> BranchIndex -> CoAxiom br -> CoAxBranch
forall a b c. (a -> b -> c) -> b -> a -> c
flip CoAxiom br -> BranchIndex -> CoAxBranch
forall (br :: BranchFlag). CoAxiom br -> BranchIndex -> CoAxBranch
coAxiomNthBranch 0)

coAxiomNthBranch :: CoAxiom br -> BranchIndex -> CoAxBranch
coAxiomNthBranch :: CoAxiom br -> BranchIndex -> CoAxBranch
coAxiomNthBranch (CoAxiom { co_ax_branches :: forall (br :: BranchFlag). CoAxiom br -> Branches br
co_ax_branches = Branches br
bs }) index :: BranchIndex
index
  = Branches br -> BranchIndex -> CoAxBranch
forall (br :: BranchFlag). Branches br -> BranchIndex -> CoAxBranch
branchesNth Branches br
bs BranchIndex
index

coAxiomArity :: CoAxiom br -> BranchIndex -> Arity
coAxiomArity :: CoAxiom br -> BranchIndex -> BranchIndex
coAxiomArity ax :: CoAxiom br
ax index :: BranchIndex
index
  = [TyVar] -> BranchIndex
forall (t :: * -> *) a. Foldable t => t a -> BranchIndex
length [TyVar]
tvs BranchIndex -> BranchIndex -> BranchIndex
forall a. Num a => a -> a -> a
+ [TyVar] -> BranchIndex
forall (t :: * -> *) a. Foldable t => t a -> BranchIndex
length [TyVar]
cvs
  where
    CoAxBranch { cab_tvs :: CoAxBranch -> [TyVar]
cab_tvs = [TyVar]
tvs, cab_cvs :: CoAxBranch -> [TyVar]
cab_cvs = [TyVar]
cvs } = CoAxiom br -> BranchIndex -> CoAxBranch
forall (br :: BranchFlag). CoAxiom br -> BranchIndex -> CoAxBranch
coAxiomNthBranch CoAxiom br
ax BranchIndex
index

coAxiomName :: CoAxiom br -> Name
coAxiomName :: CoAxiom br -> Name
coAxiomName = CoAxiom br -> Name
forall (br :: BranchFlag). CoAxiom br -> Name
co_ax_name

coAxiomRole :: CoAxiom br -> Role
coAxiomRole :: CoAxiom br -> Role
coAxiomRole = CoAxiom br -> Role
forall (br :: BranchFlag). CoAxiom br -> Role
co_ax_role

coAxiomBranches :: CoAxiom br -> Branches br
coAxiomBranches :: CoAxiom br -> Branches br
coAxiomBranches = CoAxiom br -> Branches br
forall (br :: BranchFlag). CoAxiom br -> Branches br
co_ax_branches

coAxiomSingleBranch_maybe :: CoAxiom br -> Maybe CoAxBranch
coAxiomSingleBranch_maybe :: CoAxiom br -> Maybe CoAxBranch
coAxiomSingleBranch_maybe (CoAxiom { co_ax_branches :: forall (br :: BranchFlag). CoAxiom br -> Branches br
co_ax_branches = MkBranches arr :: Array BranchIndex CoAxBranch
arr })
  | (BranchIndex, BranchIndex) -> BranchIndex
forall a b. (a, b) -> b
snd (Array BranchIndex CoAxBranch -> (BranchIndex, BranchIndex)
forall i e. Array i e -> (i, i)
bounds Array BranchIndex CoAxBranch
arr) BranchIndex -> BranchIndex -> Bool
forall a. Eq a => a -> a -> Bool
== 0
  = CoAxBranch -> Maybe CoAxBranch
forall a. a -> Maybe a
Just (CoAxBranch -> Maybe CoAxBranch) -> CoAxBranch -> Maybe CoAxBranch
forall a b. (a -> b) -> a -> b
$ Array BranchIndex CoAxBranch
arr Array BranchIndex CoAxBranch -> BranchIndex -> CoAxBranch
forall i e. Ix i => Array i e -> i -> e
! 0
  | Bool
otherwise
  = Maybe CoAxBranch
forall a. Maybe a
Nothing

coAxiomSingleBranch :: CoAxiom Unbranched -> CoAxBranch
coAxiomSingleBranch :: CoAxiom Unbranched -> CoAxBranch
coAxiomSingleBranch (CoAxiom { co_ax_branches :: forall (br :: BranchFlag). CoAxiom br -> Branches br
co_ax_branches = MkBranches arr :: Array BranchIndex CoAxBranch
arr })
  = Array BranchIndex CoAxBranch
arr Array BranchIndex CoAxBranch -> BranchIndex -> CoAxBranch
forall i e. Ix i => Array i e -> i -> e
! 0

coAxiomTyCon :: CoAxiom br -> TyCon
coAxiomTyCon :: CoAxiom br -> TyCon
coAxiomTyCon = CoAxiom br -> TyCon
forall (br :: BranchFlag). CoAxiom br -> TyCon
co_ax_tc

coAxBranchTyVars :: CoAxBranch -> [TyVar]
coAxBranchTyVars :: CoAxBranch -> [TyVar]
coAxBranchTyVars = CoAxBranch -> [TyVar]
cab_tvs

coAxBranchCoVars :: CoAxBranch -> [CoVar]
coAxBranchCoVars :: CoAxBranch -> [TyVar]
coAxBranchCoVars = CoAxBranch -> [TyVar]
cab_cvs

coAxBranchLHS :: CoAxBranch -> [Type]
coAxBranchLHS :: CoAxBranch -> [Type]
coAxBranchLHS = CoAxBranch -> [Type]
cab_lhs

coAxBranchRHS :: CoAxBranch -> Type
coAxBranchRHS :: CoAxBranch -> Type
coAxBranchRHS = CoAxBranch -> Type
cab_rhs

coAxBranchRoles :: CoAxBranch -> [Role]
coAxBranchRoles :: CoAxBranch -> [Role]
coAxBranchRoles = CoAxBranch -> [Role]
cab_roles

coAxBranchSpan :: CoAxBranch -> SrcSpan
coAxBranchSpan :: CoAxBranch -> SrcSpan
coAxBranchSpan = CoAxBranch -> SrcSpan
cab_loc

isImplicitCoAxiom :: CoAxiom br -> Bool
isImplicitCoAxiom :: CoAxiom br -> Bool
isImplicitCoAxiom = CoAxiom br -> Bool
forall (br :: BranchFlag). CoAxiom br -> Bool
co_ax_implicit

coAxBranchIncomps :: CoAxBranch -> [CoAxBranch]
coAxBranchIncomps :: CoAxBranch -> [CoAxBranch]
coAxBranchIncomps = CoAxBranch -> [CoAxBranch]
cab_incomps

-- See Note [Compatibility checking] in FamInstEnv
placeHolderIncomps :: [CoAxBranch]
placeHolderIncomps :: [CoAxBranch]
placeHolderIncomps = String -> [CoAxBranch]
forall a. String -> a
panic "placeHolderIncomps"

{- Note [CoAxiom saturation]
~~~~~~~~~~~~~~~~~~~~~~~~~~~~
* When co

Note [CoAxBranch type variables]
~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
In the case of a CoAxBranch of an associated type-family instance,
we use the *same* type variables (where possible) as the
enclosing class or instance.  Consider

  instance C Int [z] where
     type F Int [z] = ...   -- Second param must be [z]

In the CoAxBranch in the instance decl (F Int [z]) we use the
same 'z', so that it's easy to check that that type is the same
as that in the instance header.

So, unlike FamInsts, there is no expectation that the cab_tvs
are fresh wrt each other, or any other CoAxBranch.

Note [CoAxBranch roles]
~~~~~~~~~~~~~~~~~~~~~~~
Consider this code:

  newtype Age = MkAge Int
  newtype Wrap a = MkWrap a

  convert :: Wrap Age -> Int
  convert (MkWrap (MkAge i)) = i

We want this to compile to:

  NTCo:Wrap :: forall a. Wrap a ~R a
  NTCo:Age  :: Age ~R Int
  convert = \x -> x |> (NTCo:Wrap[0] NTCo:Age[0])

But, note that NTCo:Age is at role R. Thus, we need to be able to pass
coercions at role R into axioms. However, we don't *always* want to be able to
do this, as it would be disastrous with type families. The solution is to
annotate the arguments to the axiom with roles, much like we annotate tycon
tyvars. Where do these roles get set? Newtype axioms inherit their roles from
the newtype tycon; family axioms are all at role N.

Note [CoAxiom locations]
~~~~~~~~~~~~~~~~~~~~~~~~
The source location of a CoAxiom is stored in two places in the
datatype tree.
  * The first is in the location info buried in the Name of the
    CoAxiom. This span includes all of the branches of a branched
    CoAxiom.
  * The second is in the cab_loc fields of the CoAxBranches.

In the case of a single branch, we can extract the source location of
the branch from the name of the CoAxiom. In other cases, we need an
explicit SrcSpan to correctly store the location of the equation
giving rise to the FamInstBranch.

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

Note [Eta reduction for data families]
~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
Consider this
   data family T a b :: *
   newtype instance T Int a = MkT (IO a) deriving( Monad )
We'd like this to work.

From the 'newtype instance' you might think we'd get:
   newtype TInt a = MkT (IO a)
   axiom ax1 a :: T Int a ~ TInt a   -- The newtype-instance part
   axiom ax2 a :: TInt a ~ IO a      -- The newtype part

But now what can we do?  We have this problem
   Given:   d  :: Monad IO
   Wanted:  d' :: Monad (T Int) = d |> ????
What coercion can we use for the ???

Solution: eta-reduce both axioms, thus:
   axiom ax1 :: T Int ~ TInt
   axiom ax2 :: TInt ~ IO
Now
   d' = d |> Monad (sym (ax2 ; ax1))

----- Bottom line ------

For a CoAxBranch for a data family instance with representation
TyCon rep_tc:

  - cab_tvs (of its CoAxiom) may be shorter
    than tyConTyVars of rep_tc.

  - cab_lhs may be shorter than tyConArity of the family tycon
       i.e. LHS is unsaturated

  - cab_rhs will be (rep_tc cab_tvs)
       i.e. RHS is un-saturated

  - This eta reduction happens for data instances as well
    as newtype instances. Here we want to eta-reduce the data family axiom.

  - This eta-reduction is done in TcInstDcls.tcDataFamInstDecl.

But for a /type/ family
  - cab_lhs has the exact arity of the family tycon

There are certain situations (e.g., pretty-printing) where it is necessary to
deal with eta-expanded data family instances. For these situations, the
cab_eta_tvs field records the stuff that has been eta-reduced away.
So if we have
    axiom forall a b. F [a->b] = D b a
and cab_eta_tvs is [p,q], then the original user-written definition
looked like
    axiom forall a b p q. F [a->b] p q = D b a p q
(See #9692, #14179, and #15845 for examples of what can go wrong if
we don't eta-expand when showing things to the user.)

(See also Note [Newtype eta] in TyCon.  This is notionally separate
and deals with the axiom connecting a newtype with its representation
type; but it too is eta-reduced.)
-}

instance Eq (CoAxiom br) where
    a :: CoAxiom br
a == :: CoAxiom br -> CoAxiom br -> Bool
== b :: CoAxiom br
b = CoAxiom br -> Unique
forall a. Uniquable a => a -> Unique
getUnique CoAxiom br
a Unique -> Unique -> Bool
forall a. Eq a => a -> a -> Bool
== CoAxiom br -> Unique
forall a. Uniquable a => a -> Unique
getUnique CoAxiom br
b
    a :: CoAxiom br
a /= :: CoAxiom br -> CoAxiom br -> Bool
/= b :: CoAxiom br
b = CoAxiom br -> Unique
forall a. Uniquable a => a -> Unique
getUnique CoAxiom br
a Unique -> Unique -> Bool
forall a. Eq a => a -> a -> Bool
/= CoAxiom br -> Unique
forall a. Uniquable a => a -> Unique
getUnique CoAxiom br
b

instance Uniquable (CoAxiom br) where
    getUnique :: CoAxiom br -> Unique
getUnique = CoAxiom br -> Unique
forall (br :: BranchFlag). CoAxiom br -> Unique
co_ax_unique

instance Outputable (CoAxiom br) where
    ppr :: CoAxiom br -> SDoc
ppr = Name -> SDoc
forall a. Outputable a => a -> SDoc
ppr (Name -> SDoc) -> (CoAxiom br -> Name) -> CoAxiom br -> SDoc
forall b c a. (b -> c) -> (a -> b) -> a -> c
. CoAxiom br -> Name
forall a. NamedThing a => a -> Name
getName

instance NamedThing (CoAxiom br) where
    getName :: CoAxiom br -> Name
getName = CoAxiom br -> Name
forall (br :: BranchFlag). CoAxiom br -> Name
co_ax_name

instance Typeable br => Data.Data (CoAxiom br) where
    -- don't traverse?
    toConstr :: CoAxiom br -> Constr
toConstr _   = String -> Constr
abstractConstr "CoAxiom"
    gunfold :: (forall b r. Data b => c (b -> r) -> c r)
-> (forall r. r -> c r) -> Constr -> c (CoAxiom br)
gunfold _ _  = String -> Constr -> c (CoAxiom br)
forall a. HasCallStack => String -> a
error "gunfold"
    dataTypeOf :: CoAxiom br -> DataType
dataTypeOf _ = String -> DataType
mkNoRepType "CoAxiom"

instance Outputable CoAxBranch where
  ppr :: CoAxBranch -> SDoc
ppr (CoAxBranch { cab_loc :: CoAxBranch -> SrcSpan
cab_loc = SrcSpan
loc
                  , cab_lhs :: CoAxBranch -> [Type]
cab_lhs = [Type]
lhs
                  , cab_rhs :: CoAxBranch -> Type
cab_rhs = Type
rhs }) =
    String -> SDoc
text "CoAxBranch" SDoc -> SDoc -> SDoc
<+> SDoc -> SDoc
parens (SrcSpan -> SDoc
forall a. Outputable a => a -> SDoc
ppr SrcSpan
loc) SDoc -> SDoc -> SDoc
<> SDoc
colon
      SDoc -> SDoc -> SDoc
<+> SDoc -> SDoc
brackets ([SDoc] -> SDoc
fsep (SDoc -> [SDoc] -> [SDoc]
punctuate SDoc
comma ((Type -> SDoc) -> [Type] -> [SDoc]
forall a b. (a -> b) -> [a] -> [b]
map Type -> SDoc
pprType [Type]
lhs)))
      SDoc -> SDoc -> SDoc
<+> String -> SDoc
text "=>" SDoc -> SDoc -> SDoc
<+> Type -> SDoc
pprType Type
rhs

{-
************************************************************************
*                                                                      *
                    Roles
*                                                                      *
************************************************************************

Roles are defined here to avoid circular dependencies.
-}

-- See Note [Roles] in Coercion
-- defined here to avoid cyclic dependency with Coercion
--
-- Order of constructors matters: the Ord instance coincides with the *super*typing
-- relation on roles.
data Role = Nominal | Representational | Phantom
  deriving (Role -> Role -> Bool
(Role -> Role -> Bool) -> (Role -> Role -> Bool) -> Eq Role
forall a. (a -> a -> Bool) -> (a -> a -> Bool) -> Eq a
/= :: Role -> Role -> Bool
$c/= :: Role -> Role -> Bool
== :: Role -> Role -> Bool
$c== :: Role -> Role -> Bool
Eq, Eq Role
Eq Role =>
(Role -> Role -> Ordering)
-> (Role -> Role -> Bool)
-> (Role -> Role -> Bool)
-> (Role -> Role -> Bool)
-> (Role -> Role -> Bool)
-> (Role -> Role -> Role)
-> (Role -> Role -> Role)
-> Ord Role
Role -> Role -> Bool
Role -> Role -> Ordering
Role -> Role -> Role
forall a.
Eq a =>
(a -> a -> Ordering)
-> (a -> a -> Bool)
-> (a -> a -> Bool)
-> (a -> a -> Bool)
-> (a -> a -> Bool)
-> (a -> a -> a)
-> (a -> a -> a)
-> Ord a
min :: Role -> Role -> Role
$cmin :: Role -> Role -> Role
max :: Role -> Role -> Role
$cmax :: Role -> Role -> Role
>= :: Role -> Role -> Bool
$c>= :: Role -> Role -> Bool
> :: Role -> Role -> Bool
$c> :: Role -> Role -> Bool
<= :: Role -> Role -> Bool
$c<= :: Role -> Role -> Bool
< :: Role -> Role -> Bool
$c< :: Role -> Role -> Bool
compare :: Role -> Role -> Ordering
$ccompare :: Role -> Role -> Ordering
$cp1Ord :: Eq Role
Ord, Typeable Role
DataType
Constr
Typeable Role =>
(forall (c :: * -> *).
 (forall d b. Data d => c (d -> b) -> d -> c b)
 -> (forall g. g -> c g) -> Role -> c Role)
-> (forall (c :: * -> *).
    (forall b r. Data b => c (b -> r) -> c r)
    -> (forall r. r -> c r) -> Constr -> c Role)
-> (Role -> Constr)
-> (Role -> DataType)
-> (forall (t :: * -> *) (c :: * -> *).
    Typeable t =>
    (forall d. Data d => c (t d)) -> Maybe (c Role))
-> (forall (t :: * -> * -> *) (c :: * -> *).
    Typeable t =>
    (forall d e. (Data d, Data e) => c (t d e)) -> Maybe (c Role))
-> ((forall b. Data b => b -> b) -> Role -> Role)
-> (forall r r'.
    (r -> r' -> r) -> r -> (forall d. Data d => d -> r') -> Role -> r)
-> (forall r r'.
    (r' -> r -> r) -> r -> (forall d. Data d => d -> r') -> Role -> r)
-> (forall u. (forall d. Data d => d -> u) -> Role -> [u])
-> (forall u.
    BranchIndex -> (forall d. Data d => d -> u) -> Role -> u)
-> (forall (m :: * -> *).
    Monad m =>
    (forall d. Data d => d -> m d) -> Role -> m Role)
-> (forall (m :: * -> *).
    MonadPlus m =>
    (forall d. Data d => d -> m d) -> Role -> m Role)
-> (forall (m :: * -> *).
    MonadPlus m =>
    (forall d. Data d => d -> m d) -> Role -> m Role)
-> Data Role
Role -> DataType
Role -> Constr
(forall b. Data b => b -> b) -> Role -> Role
(forall d b. Data d => c (d -> b) -> d -> c b)
-> (forall g. g -> c g) -> Role -> c Role
(forall b r. Data b => c (b -> r) -> c r)
-> (forall r. r -> c r) -> Constr -> c Role
forall a.
Typeable a =>
(forall (c :: * -> *).
 (forall d b. Data d => c (d -> b) -> d -> c b)
 -> (forall g. g -> c g) -> a -> c a)
-> (forall (c :: * -> *).
    (forall b r. Data b => c (b -> r) -> c r)
    -> (forall r. r -> c r) -> Constr -> c a)
-> (a -> Constr)
-> (a -> DataType)
-> (forall (t :: * -> *) (c :: * -> *).
    Typeable t =>
    (forall d. Data d => c (t d)) -> Maybe (c a))
-> (forall (t :: * -> * -> *) (c :: * -> *).
    Typeable t =>
    (forall d e. (Data d, Data e) => c (t d e)) -> Maybe (c a))
-> ((forall b. Data b => b -> b) -> a -> a)
-> (forall r r'.
    (r -> r' -> r) -> r -> (forall d. Data d => d -> r') -> a -> r)
-> (forall r r'.
    (r' -> r -> r) -> r -> (forall d. Data d => d -> r') -> a -> r)
-> (forall u. (forall d. Data d => d -> u) -> a -> [u])
-> (forall u.
    BranchIndex -> (forall d. Data d => d -> u) -> a -> u)
-> (forall (m :: * -> *).
    Monad m =>
    (forall d. Data d => d -> m d) -> a -> m a)
-> (forall (m :: * -> *).
    MonadPlus m =>
    (forall d. Data d => d -> m d) -> a -> m a)
-> (forall (m :: * -> *).
    MonadPlus m =>
    (forall d. Data d => d -> m d) -> a -> m a)
-> Data a
forall u. BranchIndex -> (forall d. Data d => d -> u) -> Role -> u
forall u. (forall d. Data d => d -> u) -> Role -> [u]
forall r r'.
(r -> r' -> r) -> r -> (forall d. Data d => d -> r') -> Role -> r
forall r r'.
(r' -> r -> r) -> r -> (forall d. Data d => d -> r') -> Role -> r
forall (m :: * -> *).
Monad m =>
(forall d. Data d => d -> m d) -> Role -> m Role
forall (m :: * -> *).
MonadPlus m =>
(forall d. Data d => d -> m d) -> Role -> m Role
forall (c :: * -> *).
(forall b r. Data b => c (b -> r) -> c r)
-> (forall r. r -> c r) -> Constr -> c Role
forall (c :: * -> *).
(forall d b. Data d => c (d -> b) -> d -> c b)
-> (forall g. g -> c g) -> Role -> c Role
forall (t :: * -> *) (c :: * -> *).
Typeable t =>
(forall d. Data d => c (t d)) -> Maybe (c Role)
forall (t :: * -> * -> *) (c :: * -> *).
Typeable t =>
(forall d e. (Data d, Data e) => c (t d e)) -> Maybe (c Role)
$cPhantom :: Constr
$cRepresentational :: Constr
$cNominal :: Constr
$tRole :: DataType
gmapMo :: (forall d. Data d => d -> m d) -> Role -> m Role
$cgmapMo :: forall (m :: * -> *).
MonadPlus m =>
(forall d. Data d => d -> m d) -> Role -> m Role
gmapMp :: (forall d. Data d => d -> m d) -> Role -> m Role
$cgmapMp :: forall (m :: * -> *).
MonadPlus m =>
(forall d. Data d => d -> m d) -> Role -> m Role
gmapM :: (forall d. Data d => d -> m d) -> Role -> m Role
$cgmapM :: forall (m :: * -> *).
Monad m =>
(forall d. Data d => d -> m d) -> Role -> m Role
gmapQi :: BranchIndex -> (forall d. Data d => d -> u) -> Role -> u
$cgmapQi :: forall u. BranchIndex -> (forall d. Data d => d -> u) -> Role -> u
gmapQ :: (forall d. Data d => d -> u) -> Role -> [u]
$cgmapQ :: forall u. (forall d. Data d => d -> u) -> Role -> [u]
gmapQr :: (r' -> r -> r) -> r -> (forall d. Data d => d -> r') -> Role -> r
$cgmapQr :: forall r r'.
(r' -> r -> r) -> r -> (forall d. Data d => d -> r') -> Role -> r
gmapQl :: (r -> r' -> r) -> r -> (forall d. Data d => d -> r') -> Role -> r
$cgmapQl :: forall r r'.
(r -> r' -> r) -> r -> (forall d. Data d => d -> r') -> Role -> r
gmapT :: (forall b. Data b => b -> b) -> Role -> Role
$cgmapT :: (forall b. Data b => b -> b) -> Role -> Role
dataCast2 :: (forall d e. (Data d, Data e) => c (t d e)) -> Maybe (c Role)
$cdataCast2 :: forall (t :: * -> * -> *) (c :: * -> *).
Typeable t =>
(forall d e. (Data d, Data e) => c (t d e)) -> Maybe (c Role)
dataCast1 :: (forall d. Data d => c (t d)) -> Maybe (c Role)
$cdataCast1 :: forall (t :: * -> *) (c :: * -> *).
Typeable t =>
(forall d. Data d => c (t d)) -> Maybe (c Role)
dataTypeOf :: Role -> DataType
$cdataTypeOf :: Role -> DataType
toConstr :: Role -> Constr
$ctoConstr :: Role -> Constr
gunfold :: (forall b r. Data b => c (b -> r) -> c r)
-> (forall r. r -> c r) -> Constr -> c Role
$cgunfold :: forall (c :: * -> *).
(forall b r. Data b => c (b -> r) -> c r)
-> (forall r. r -> c r) -> Constr -> c Role
gfoldl :: (forall d b. Data d => c (d -> b) -> d -> c b)
-> (forall g. g -> c g) -> Role -> c Role
$cgfoldl :: forall (c :: * -> *).
(forall d b. Data d => c (d -> b) -> d -> c b)
-> (forall g. g -> c g) -> Role -> c Role
$cp1Data :: Typeable Role
Data.Data)

-- These names are slurped into the parser code. Changing these strings
-- will change the **surface syntax** that GHC accepts! If you want to
-- change only the pretty-printing, do some replumbing. See
-- mkRoleAnnotDecl in RdrHsSyn
fsFromRole :: Role -> FastString
fsFromRole :: Role -> FastString
fsFromRole Nominal          = String -> FastString
fsLit "nominal"
fsFromRole Representational = String -> FastString
fsLit "representational"
fsFromRole Phantom          = String -> FastString
fsLit "phantom"

instance Outputable Role where
  ppr :: Role -> SDoc
ppr = FastString -> SDoc
ftext (FastString -> SDoc) -> (Role -> FastString) -> Role -> SDoc
forall b c a. (b -> c) -> (a -> b) -> a -> c
. Role -> FastString
fsFromRole

instance Binary Role where
  put_ :: BinHandle -> Role -> IO ()
put_ bh :: BinHandle
bh Nominal          = BinHandle -> Word8 -> IO ()
putByte BinHandle
bh 1
  put_ bh :: BinHandle
bh Representational = BinHandle -> Word8 -> IO ()
putByte BinHandle
bh 2
  put_ bh :: BinHandle
bh Phantom          = BinHandle -> Word8 -> IO ()
putByte BinHandle
bh 3

  get :: BinHandle -> IO Role
get bh :: BinHandle
bh = do Word8
tag <- BinHandle -> IO Word8
getByte BinHandle
bh
              case Word8
tag of 1 -> Role -> IO Role
forall (m :: * -> *) a. Monad m => a -> m a
return Role
Nominal
                          2 -> Role -> IO Role
forall (m :: * -> *) a. Monad m => a -> m a
return Role
Representational
                          3 -> Role -> IO Role
forall (m :: * -> *) a. Monad m => a -> m a
return Role
Phantom
                          _ -> String -> IO Role
forall a. String -> a
panic ("get Role " String -> String -> String
forall a. [a] -> [a] -> [a]
++ Word8 -> String
forall a. Show a => a -> String
show Word8
tag)

{-
************************************************************************
*                                                                      *
                    CoAxiomRule
              Rules for building Evidence
*                                                                      *
************************************************************************

Conditional axioms.  The general idea is that a `CoAxiomRule` looks like this:

    forall as. (r1 ~ r2, s1 ~ s2) => t1 ~ t2

My intention is to reuse these for both (~) and (~#).
The short-term plan is to use this datatype to represent the type-nat axioms.
In the longer run, it may be good to unify this and `CoAxiom`,
as `CoAxiom` is the special case when there are no assumptions.
-}

-- | A more explicit representation for `t1 ~ t2`.
type TypeEqn = Pair Type

-- | For now, we work only with nominal equality.
data CoAxiomRule = CoAxiomRule
  { CoAxiomRule -> FastString
coaxrName      :: FastString
  , CoAxiomRule -> [Role]
coaxrAsmpRoles :: [Role]    -- roles of parameter equations
  , CoAxiomRule -> Role
coaxrRole      :: Role      -- role of resulting equation
  , CoAxiomRule -> [TypeEqn] -> Maybe TypeEqn
coaxrProves    :: [TypeEqn] -> Maybe TypeEqn
        -- ^ coaxrProves returns @Nothing@ when it doesn't like
        -- the supplied arguments.  When this happens in a coercion
        -- that means that the coercion is ill-formed, and Core Lint
        -- checks for that.
  }

instance Data.Data CoAxiomRule where
  -- don't traverse?
  toConstr :: CoAxiomRule -> Constr
toConstr _   = String -> Constr
abstractConstr "CoAxiomRule"
  gunfold :: (forall b r. Data b => c (b -> r) -> c r)
-> (forall r. r -> c r) -> Constr -> c CoAxiomRule
gunfold _ _  = String -> Constr -> c CoAxiomRule
forall a. HasCallStack => String -> a
error "gunfold"
  dataTypeOf :: CoAxiomRule -> DataType
dataTypeOf _ = String -> DataType
mkNoRepType "CoAxiomRule"

instance Uniquable CoAxiomRule where
  getUnique :: CoAxiomRule -> Unique
getUnique = FastString -> Unique
forall a. Uniquable a => a -> Unique
getUnique (FastString -> Unique)
-> (CoAxiomRule -> FastString) -> CoAxiomRule -> Unique
forall b c a. (b -> c) -> (a -> b) -> a -> c
. CoAxiomRule -> FastString
coaxrName

instance Eq CoAxiomRule where
  x :: CoAxiomRule
x == :: CoAxiomRule -> CoAxiomRule -> Bool
== y :: CoAxiomRule
y = CoAxiomRule -> FastString
coaxrName CoAxiomRule
x FastString -> FastString -> Bool
forall a. Eq a => a -> a -> Bool
== CoAxiomRule -> FastString
coaxrName CoAxiomRule
y

instance Ord CoAxiomRule where
  compare :: CoAxiomRule -> CoAxiomRule -> Ordering
compare x :: CoAxiomRule
x y :: CoAxiomRule
y = FastString -> FastString -> Ordering
forall a. Ord a => a -> a -> Ordering
compare (CoAxiomRule -> FastString
coaxrName CoAxiomRule
x) (CoAxiomRule -> FastString
coaxrName CoAxiomRule
y)

instance Outputable CoAxiomRule where
  ppr :: CoAxiomRule -> SDoc
ppr = FastString -> SDoc
forall a. Outputable a => a -> SDoc
ppr (FastString -> SDoc)
-> (CoAxiomRule -> FastString) -> CoAxiomRule -> SDoc
forall b c a. (b -> c) -> (a -> b) -> a -> c
. CoAxiomRule -> FastString
coaxrName


-- Type checking of built-in families
data BuiltInSynFamily = BuiltInSynFamily
  { BuiltInSynFamily -> [Type] -> Maybe (CoAxiomRule, [Type], Type)
sfMatchFam      :: [Type] -> Maybe (CoAxiomRule, [Type], Type)
  , BuiltInSynFamily -> [Type] -> Type -> [TypeEqn]
sfInteractTop   :: [Type] -> Type -> [TypeEqn]
  , BuiltInSynFamily -> [Type] -> Type -> [Type] -> Type -> [TypeEqn]
sfInteractInert :: [Type] -> Type ->
                       [Type] -> Type -> [TypeEqn]
  }

-- Provides default implementations that do nothing.
trivialBuiltInFamily :: BuiltInSynFamily
trivialBuiltInFamily :: BuiltInSynFamily
trivialBuiltInFamily = BuiltInSynFamily :: ([Type] -> Maybe (CoAxiomRule, [Type], Type))
-> ([Type] -> Type -> [TypeEqn])
-> ([Type] -> Type -> [Type] -> Type -> [TypeEqn])
-> BuiltInSynFamily
BuiltInSynFamily
  { sfMatchFam :: [Type] -> Maybe (CoAxiomRule, [Type], Type)
sfMatchFam      = \_ -> Maybe (CoAxiomRule, [Type], Type)
forall a. Maybe a
Nothing
  , sfInteractTop :: [Type] -> Type -> [TypeEqn]
sfInteractTop   = \_ _ -> []
  , sfInteractInert :: [Type] -> Type -> [Type] -> Type -> [TypeEqn]
sfInteractInert = \_ _ _ _ -> []
  }