\section[GHC.Base]{Module @GHC.Base@}

The overall structure of the GHC Prelude is a bit tricky.

  a) We want to avoid "orphan modules", i.e. ones with instance
        decls that don't belong either to a tycon or a class
        defined in the same module

  b) We want to avoid giant modules

So the rough structure is as follows, in (linearised) dependency order


GHC.Prim                Has no implementation.  It defines built-in things, and
                by importing it you bring them into scope.
                The source file is GHC.Prim.hi-boot, which is just
                copied to make GHC.Prim.hi

GHC.Base        Classes: Eq, Ord, Functor, Monad
                Types:   list, (), Int, Bool, Ordering, Char, String

Data.Tuple      Types: tuples, plus instances for GHC.Base classes

GHC.Show        Class: Show, plus instances for GHC.Base/GHC.Tup types

GHC.Enum        Class: Enum,  plus instances for GHC.Base/GHC.Tup types

Data.Maybe      Type: Maybe, plus instances for GHC.Base classes

GHC.List        List functions

GHC.Num         Class: Num, plus instances for Int
                Type:  Integer, plus instances for all classes so far (Eq, Ord, Num, Show)

                Integer is needed here because it is mentioned in the signature
                of 'fromInteger' in class Num

GHC.Real        Classes: Real, Integral, Fractional, RealFrac
                         plus instances for Int, Integer
                Types:  Ratio, Rational
                        plus intances for classes so far

                Rational is needed here because it is mentioned in the signature
                of 'toRational' in class Real

GHC.ST  The ST monad, instances and a few helper functions

Ix              Classes: Ix, plus instances for Int, Bool, Char, Integer, Ordering, tuples

GHC.Arr         Types: Array, MutableArray, MutableVar

                Arrays are used by a function in GHC.Float

GHC.Float       Classes: Floating, RealFloat
                Types:   Float, Double, plus instances of all classes so far

                This module contains everything to do with floating point.
                It is a big module (900 lines)
                With a bit of luck, many modules can be compiled without ever reading GHC.Float.hi


Other Prelude modules are much easier with fewer complex dependencies.

\begin{code}
{-# OPTIONS_GHC -XNoImplicitPrelude #-}
{-# OPTIONS_GHC -fno-warn-orphans #-}
{-# OPTIONS_HADDOCK hide #-}
-----------------------------------------------------------------------------
-- |
-- Module      :  GHC.Base
-- Copyright   :  (c) The University of Glasgow, 1992-2002
-- License     :  see libraries/base/LICENSE
-- 
-- Maintainer  :  cvs-ghc@haskell.org
-- Stability   :  internal
-- Portability :  non-portable (GHC extensions)
--
-- Basic data types and classes.
-- 
-----------------------------------------------------------------------------

#include "MachDeps.h"

-- #hide
module GHC.Base
        (
        module GHC.Base,
        module GHC.Bool,
        module GHC.Classes,
        module GHC.Generics,
        module GHC.Ordering,
        module GHC.Types,
        module GHC.Prim,        -- Re-export GHC.Prim and GHC.Err, to avoid lots
        module GHC.Err          -- of people having to import it explicitly
  ) 
        where

import GHC.Types
import GHC.Bool
import GHC.Classes
import GHC.Generics
import GHC.Ordering
import GHC.Prim
import {-# SOURCE #-} GHC.Show
import {-# SOURCE #-} GHC.Err
import {-# SOURCE #-} GHC.IO (failIO)

-- These two are not strictly speaking required by this module, but they are
-- implicit dependencies whenever () or tuples are mentioned, so adding them
-- as imports here helps to get the dependencies right in the new build system.
import GHC.Tuple ()
import GHC.Unit ()

infixr 9  .
infixr 5  ++
infixl 4  <$
infixl 1  >>, >>=
infixr 0  $

default ()              -- Double isn't available yet
\end{code}


%*********************************************************
%*                                                      *
\subsection{DEBUGGING STUFF}
%*  (for use when compiling GHC.Base itself doesn't work)
%*                                                      *
%*********************************************************

\begin{code}
{-
data  Bool  =  False | True
data Ordering = LT | EQ | GT 
data Char = C# Char#
type  String = [Char]
data Int = I# Int#
data  ()  =  ()
data [] a = MkNil

not True = False
(&&) True True = True
otherwise = True

build = error "urk"
foldr = error "urk"

unpackCString# :: Addr# -> [Char]
unpackFoldrCString# :: Addr# -> (Char  -> a -> a) -> a -> a 
unpackAppendCString# :: Addr# -> [Char] -> [Char]
unpackCStringUtf8# :: Addr# -> [Char]
unpackCString# a = error "urk"
unpackFoldrCString# a = error "urk"
unpackAppendCString# a = error "urk"
unpackCStringUtf8# a = error "urk"
-}
\end{code}


%*********************************************************
%*                                                      *
\subsection{Monadic classes @Functor@, @Monad@ }
%*                                                      *
%*********************************************************

\begin{code}
{- | The 'Functor' class is used for types that can be mapped over.
Instances of 'Functor' should satisfy the following laws:

> fmap id  ==  id
> fmap (f . g)  ==  fmap f . fmap g

The instances of 'Functor' for lists, 'Data.Maybe.Maybe' and 'System.IO.IO'
defined in the "Prelude" satisfy these laws.
-}

class  Functor f  where
    fmap        :: (a -> b) -> f a -> f b

    -- | Replace all locations in the input with the same value.
    -- The default definition is @'fmap' . 'const'@, but this may be
    -- overridden with a more efficient version.
    (<$)        :: a -> f b -> f a
    (<$)        =  fmap . const

{- | The 'Monad' class defines the basic operations over a /monad/,
a concept from a branch of mathematics known as /category theory/.
From the perspective of a Haskell programmer, however, it is best to
think of a monad as an /abstract datatype/ of actions.
Haskell's @do@ expressions provide a convenient syntax for writing
monadic expressions.

Minimal complete definition: '>>=' and 'return'.

Instances of 'Monad' should satisfy the following laws:

> return a >>= k  ==  k a
> m >>= return  ==  m
> m >>= (\x -> k x >>= h)  ==  (m >>= k) >>= h

Instances of both 'Monad' and 'Functor' should additionally satisfy the law:

> fmap f xs  ==  xs >>= return . f

The instances of 'Monad' for lists, 'Data.Maybe.Maybe' and 'System.IO.IO'
defined in the "Prelude" satisfy these laws.
-}

class  Monad m  where
    -- | Sequentially compose two actions, passing any value produced
    -- by the first as an argument to the second.
    (>>=)       :: forall a b. m a -> (a -> m b) -> m b
    -- | Sequentially compose two actions, discarding any value produced
    -- by the first, like sequencing operators (such as the semicolon)
    -- in imperative languages.
    (>>)        :: forall a b. m a -> m b -> m b
        -- Explicit for-alls so that we know what order to
        -- give type arguments when desugaring

    -- | Inject a value into the monadic type.
    return      :: a -> m a
    -- | Fail with a message.  This operation is not part of the
    -- mathematical definition of a monad, but is invoked on pattern-match
    -- failure in a @do@ expression.
    fail        :: String -> m a

    m >> k      = m >>= \_ -> k
    fail s      = error s
\end{code}


%*********************************************************
%*                                                      *
\subsection{The list type}
%*                                                      *
%*********************************************************

\begin{code}
-- do explicitly: deriving (Eq, Ord)
-- to avoid weird names like con2tag_[]#

instance (Eq a) => Eq [a] where
    {-# SPECIALISE instance Eq [Char] #-}
    []     == []     = True
    (x:xs) == (y:ys) = x == y && xs == ys
    _xs    == _ys    = False

instance (Ord a) => Ord [a] where
    {-# SPECIALISE instance Ord [Char] #-}
    compare []     []     = EQ
    compare []     (_:_)  = LT
    compare (_:_)  []     = GT
    compare (x:xs) (y:ys) = case compare x y of
                                EQ    -> compare xs ys
                                other -> other

instance Functor [] where
    fmap = map

instance  Monad []  where
    m >>= k             = foldr ((++) . k) [] m
    m >> k              = foldr ((++) . (\ _ -> k)) [] m
    return x            = [x]
    fail _              = []
\end{code}

A few list functions that appear here because they are used here.
The rest of the prelude list functions are in GHC.List.

----------------------------------------------
--      foldr/build/augment
----------------------------------------------
  
\begin{code}
-- | 'foldr', applied to a binary operator, a starting value (typically
-- the right-identity of the operator), and a list, reduces the list
-- using the binary operator, from right to left:
--
-- > foldr f z [x1, x2, ..., xn] == x1 `f` (x2 `f` ... (xn `f` z)...)

foldr            :: (a -> b -> b) -> b -> [a] -> b
-- foldr _ z []     =  z
-- foldr f z (x:xs) =  f x (foldr f z xs)
{-# INLINE [0] foldr #-}
-- Inline only in the final stage, after the foldr/cons rule has had a chance
foldr k z xs = go xs
             where
               go []     = z
               go (y:ys) = y `k` go ys

-- | A list producer that can be fused with 'foldr'.
-- This function is merely
--
-- >    build g = g (:) []
--
-- but GHC's simplifier will transform an expression of the form
-- @'foldr' k z ('build' g)@, which may arise after inlining, to @g k z@,
-- which avoids producing an intermediate list.

build   :: forall a. (forall b. (a -> b -> b) -> b -> b) -> [a]
{-# INLINE [1] build #-}
        -- The INLINE is important, even though build is tiny,
        -- because it prevents [] getting inlined in the version that
        -- appears in the interface file.  If [] *is* inlined, it
        -- won't match with [] appearing in rules in an importing module.
        --
        -- The "1" says to inline in phase 1

build g = g (:) []

-- | A list producer that can be fused with 'foldr'.
-- This function is merely
--
-- >    augment g xs = g (:) xs
--
-- but GHC's simplifier will transform an expression of the form
-- @'foldr' k z ('augment' g xs)@, which may arise after inlining, to
-- @g k ('foldr' k z xs)@, which avoids producing an intermediate list.

augment :: forall a. (forall b. (a->b->b) -> b -> b) -> [a] -> [a]
{-# INLINE [1] augment #-}
augment g xs = g (:) xs

{-# RULES
"fold/build"    forall k z (g::forall b. (a->b->b) -> b -> b) . 
                foldr k z (build g) = g k z

"foldr/augment" forall k z xs (g::forall b. (a->b->b) -> b -> b) . 
                foldr k z (augment g xs) = g k (foldr k z xs)

"foldr/id"                        foldr (:) [] = \x  -> x
"foldr/app"     [1] forall ys. foldr (:) ys = \xs -> xs ++ ys
        -- Only activate this from phase 1, because that's
        -- when we disable the rule that expands (++) into foldr

-- The foldr/cons rule looks nice, but it can give disastrously
-- bloated code when commpiling
--      array (a,b) [(1,2), (2,2), (3,2), ...very long list... ]
-- i.e. when there are very very long literal lists
-- So I've disabled it for now. We could have special cases
-- for short lists, I suppose.
-- "foldr/cons" forall k z x xs. foldr k z (x:xs) = k x (foldr k z xs)

"foldr/single"  forall k z x. foldr k z [x] = k x z
"foldr/nil"     forall k z.   foldr k z []  = z 

"augment/build" forall (g::forall b. (a->b->b) -> b -> b)
                       (h::forall b. (a->b->b) -> b -> b) .
                       augment g (build h) = build (\c n -> g c (h c n))
"augment/nil"   forall (g::forall b. (a->b->b) -> b -> b) .
                        augment g [] = build g
 #-}

-- This rule is true, but not (I think) useful:
--      augment g (augment h t) = augment (\cn -> g c (h c n)) t
\end{code}


----------------------------------------------
--              map     
----------------------------------------------

\begin{code}
-- | 'map' @f xs@ is the list obtained by applying @f@ to each element
-- of @xs@, i.e.,
--
-- > map f [x1, x2, ..., xn] == [f x1, f x2, ..., f xn]
-- > map f [x1, x2, ...] == [f x1, f x2, ...]

map :: (a -> b) -> [a] -> [b]
map _ []     = []
map f (x:xs) = f x : map f xs

-- Note eta expanded
mapFB ::  (elt -> lst -> lst) -> (a -> elt) -> a -> lst -> lst
{-# INLINE [0] mapFB #-}
mapFB c f x ys = c (f x) ys

-- The rules for map work like this.
-- 
-- Up to (but not including) phase 1, we use the "map" rule to
-- rewrite all saturated applications of map with its build/fold 
-- form, hoping for fusion to happen.
-- In phase 1 and 0, we switch off that rule, inline build, and
-- switch on the "mapList" rule, which rewrites the foldr/mapFB
-- thing back into plain map.  
--
-- It's important that these two rules aren't both active at once 
-- (along with build's unfolding) else we'd get an infinite loop 
-- in the rules.  Hence the activation control below.
--
-- The "mapFB" rule optimises compositions of map.
--
-- This same pattern is followed by many other functions: 
-- e.g. append, filter, iterate, repeat, etc.

{-# RULES
"map"       [~1] forall f xs.   map f xs                = build (\c n -> foldr (mapFB c f) n xs)
"mapList"   [1]  forall f.      foldr (mapFB (:) f) []  = map f
"mapFB"     forall c f g.       mapFB (mapFB c f) g     = mapFB c (f.g) 
  #-}
\end{code}


----------------------------------------------
--              append  
----------------------------------------------
\begin{code}
-- | Append two lists, i.e.,
--
-- > [x1, ..., xm] ++ [y1, ..., yn] == [x1, ..., xm, y1, ..., yn]
-- > [x1, ..., xm] ++ [y1, ...] == [x1, ..., xm, y1, ...]
--
-- If the first list is not finite, the result is the first list.

(++) :: [a] -> [a] -> [a]
(++) []     ys = ys
(++) (x:xs) ys = x : xs ++ ys

{-# RULES
"++"    [~1] forall xs ys. xs ++ ys = augment (\c n -> foldr c n xs) ys
  #-}

\end{code}


%*********************************************************
%*                                                      *
\subsection{Type @Bool@}
%*                                                      *
%*********************************************************

\begin{code}
-- |The 'Bool' type is an enumeration.  It is defined with 'False'
-- first so that the corresponding 'Prelude.Enum' instance will give
-- 'Prelude.fromEnum' 'False' the value zero, and
-- 'Prelude.fromEnum' 'True' the value 1.
-- The actual definition is in the ghc-prim package.

-- XXX These don't work:
-- deriving instance Eq Bool
-- deriving instance Ord Bool
-- <wired into compiler>:
--     Illegal binding of built-in syntax: con2tag_Bool#

instance Eq Bool where
    True  == True  = True
    False == False = True
    _     == _     = False

instance Ord Bool where
    compare False True  = LT
    compare True  False = GT
    compare _     _     = EQ

-- Read is in GHC.Read, Show in GHC.Show

-- |'otherwise' is defined as the value 'True'.  It helps to make
-- guards more readable.  eg.
--
-- >  f x | x < 0     = ...
-- >      | otherwise = ...
otherwise               :: Bool
otherwise               =  True
\end{code}

%*********************************************************
%*                                                      *
\subsection{Type @Ordering@}
%*                                                      *
%*********************************************************

\begin{code}
-- | Represents an ordering relationship between two values: less
-- than, equal to, or greater than.  An 'Ordering' is returned by
-- 'compare'.
-- XXX These don't work:
-- deriving instance Eq Ordering
-- deriving instance Ord Ordering
-- Illegal binding of built-in syntax: con2tag_Ordering#
instance Eq Ordering where
    EQ == EQ = True
    LT == LT = True
    GT == GT = True
    _  == _  = False
        -- Read in GHC.Read, Show in GHC.Show

instance Ord Ordering where
    LT <= _  = True
    _  <= LT = False
    EQ <= _  = True
    _  <= EQ = False
    GT <= GT = True
\end{code}


%*********************************************************
%*                                                      *
\subsection{Type @Char@ and @String@}
%*                                                      *
%*********************************************************

\begin{code}
-- | A 'String' is a list of characters.  String constants in Haskell are values
-- of type 'String'.
--
type String = [Char]

{-| The character type 'Char' is an enumeration whose values represent
Unicode (or equivalently ISO\/IEC 10646) characters
(see <http://www.unicode.org/> for details).
This set extends the ISO 8859-1 (Latin-1) character set
(the first 256 charachers), which is itself an extension of the ASCII
character set (the first 128 characters).
A character literal in Haskell has type 'Char'.

To convert a 'Char' to or from the corresponding 'Int' value defined
by Unicode, use 'Prelude.toEnum' and 'Prelude.fromEnum' from the
'Prelude.Enum' class respectively (or equivalently 'ord' and 'chr').
-}

-- We don't use deriving for Eq and Ord, because for Ord the derived
-- instance defines only compare, which takes two primops.  Then
-- '>' uses compare, and therefore takes two primops instead of one.

instance Eq Char where
    (C# c1) == (C# c2) = c1 `eqChar#` c2
    (C# c1) /= (C# c2) = c1 `neChar#` c2

instance Ord Char where
    (C# c1) >  (C# c2) = c1 `gtChar#` c2
    (C# c1) >= (C# c2) = c1 `geChar#` c2
    (C# c1) <= (C# c2) = c1 `leChar#` c2
    (C# c1) <  (C# c2) = c1 `ltChar#` c2

{-# RULES
"x# `eqChar#` x#" forall x#. x# `eqChar#` x# = True
"x# `neChar#` x#" forall x#. x# `neChar#` x# = False
"x# `gtChar#` x#" forall x#. x# `gtChar#` x# = False
"x# `geChar#` x#" forall x#. x# `geChar#` x# = True
"x# `leChar#` x#" forall x#. x# `leChar#` x# = True
"x# `ltChar#` x#" forall x#. x# `ltChar#` x# = False
  #-}

-- | The 'Prelude.toEnum' method restricted to the type 'Data.Char.Char'.
chr :: Int -> Char
chr i@(I# i#)
 | int2Word# i# `leWord#` int2Word# 0x10FFFF# = C# (chr# i#)
 | otherwise
    = error ("Prelude.chr: bad argument: " ++ showSignedInt (I# 9#) i "")

unsafeChr :: Int -> Char
unsafeChr (I# i#) = C# (chr# i#)

-- | The 'Prelude.fromEnum' method restricted to the type 'Data.Char.Char'.
ord :: Char -> Int
ord (C# c#) = I# (ord# c#)
\end{code}

String equality is used when desugaring pattern-matches against strings.

\begin{code}
eqString :: String -> String -> Bool
eqString []       []       = True
eqString (c1:cs1) (c2:cs2) = c1 == c2 && cs1 `eqString` cs2
eqString _        _        = False

{-# RULES "eqString" (==) = eqString #-}
-- eqString also has a BuiltInRule in PrelRules.lhs:
--      eqString (unpackCString# (Lit s1)) (unpackCString# (Lit s2) = s1==s2
\end{code}


%*********************************************************
%*                                                      *
\subsection{Type @Int@}
%*                                                      *
%*********************************************************

\begin{code}
zeroInt, oneInt, twoInt, maxInt, minInt :: Int
zeroInt = I# 0#
oneInt  = I# 1#
twoInt  = I# 2#

{- Seems clumsy. Should perhaps put minInt and MaxInt directly into MachDeps.h -}
#if WORD_SIZE_IN_BITS == 31
minInt  = I# (-0x40000000#)
maxInt  = I# 0x3FFFFFFF#
#elif WORD_SIZE_IN_BITS == 32
minInt  = I# (-0x80000000#)
maxInt  = I# 0x7FFFFFFF#
#else 
minInt  = I# (-0x8000000000000000#)
maxInt  = I# 0x7FFFFFFFFFFFFFFF#
#endif

instance Eq Int where
    (==) = eqInt
    (/=) = neInt

instance Ord Int where
    compare = compareInt
    (<)     = ltInt
    (<=)    = leInt
    (>=)    = geInt
    (>)     = gtInt

compareInt :: Int -> Int -> Ordering
(I# x#) `compareInt` (I# y#) = compareInt# x# y#

compareInt# :: Int# -> Int# -> Ordering
compareInt# x# y#
    | x# <#  y# = LT
    | x# ==# y# = EQ
    | otherwise = GT
\end{code}


%*********************************************************
%*                                                      *
\subsection{The function type}
%*                                                      *
%*********************************************************

\begin{code}
-- | Identity function.
id                      :: a -> a
id x                    =  x

-- | The call '(lazy e)' means the same as 'e', but 'lazy' has a 
-- magical strictness property: it is lazy in its first argument, 
-- even though its semantics is strict.
lazy :: a -> a
lazy x = x
-- Implementation note: its strictness and unfolding are over-ridden
-- by the definition in MkId.lhs; in both cases to nothing at all.
-- That way, 'lazy' does not get inlined, and the strictness analyser
-- sees it as lazy.  Then the worker/wrapper phase inlines it.
-- Result: happiness


-- | The call '(inline f)' reduces to 'f', but 'inline' has a BuiltInRule
-- that tries to inline 'f' (if it has an unfolding) unconditionally
-- The 'NOINLINE' pragma arranges that inline only gets inlined (and
-- hence eliminated) late in compilation, after the rule has had
-- a god chance to fire.
inline :: a -> a
{-# NOINLINE[0] inline #-}
inline x = x

-- Assertion function.  This simply ignores its boolean argument.
-- The compiler may rewrite it to @('assertError' line)@.

-- | If the first argument evaluates to 'True', then the result is the
-- second argument.  Otherwise an 'AssertionFailed' exception is raised,
-- containing a 'String' with the source file and line number of the
-- call to 'assert'.
--
-- Assertions can normally be turned on or off with a compiler flag
-- (for GHC, assertions are normally on unless optimisation is turned on 
-- with @-O@ or the @-fignore-asserts@
-- option is given).  When assertions are turned off, the first
-- argument to 'assert' is ignored, and the second argument is
-- returned as the result.

--      SLPJ: in 5.04 etc 'assert' is in GHC.Prim,
--      but from Template Haskell onwards it's simply
--      defined here in Base.lhs
assert :: Bool -> a -> a
assert _pred r = r

breakpoint :: a -> a
breakpoint r = r

breakpointCond :: Bool -> a -> a
breakpointCond _ r = r

data Opaque = forall a. O a

-- | Constant function.
const                   :: a -> b -> a
const x _               =  x

-- | Function composition.
{-# INLINE (.) #-}
(.)       :: (b -> c) -> (a -> b) -> a -> c
(.) f g x = f (g x)

-- | @'flip' f@ takes its (first) two arguments in the reverse order of @f@.
flip                    :: (a -> b -> c) -> b -> a -> c
flip f x y              =  f y x

-- | Application operator.  This operator is redundant, since ordinary
-- application @(f x)@ means the same as @(f '$' x)@. However, '$' has
-- low, right-associative binding precedence, so it sometimes allows
-- parentheses to be omitted; for example:
--
-- >     f $ g $ h x  =  f (g (h x))
--
-- It is also useful in higher-order situations, such as @'map' ('$' 0) xs@,
-- or @'Data.List.zipWith' ('$') fs xs@.
{-# INLINE ($) #-}
($)                     :: (a -> b) -> a -> b
f $ x                   =  f x

-- | @'until' p f@ yields the result of applying @f@ until @p@ holds.
until                   :: (a -> Bool) -> (a -> a) -> a -> a
until p f x | p x       =  x
            | otherwise =  until p f (f x)

-- | 'asTypeOf' is a type-restricted version of 'const'.  It is usually
-- used as an infix operator, and its typing forces its first argument
-- (which is usually overloaded) to have the same type as the second.
asTypeOf                :: a -> a -> a
asTypeOf                =  const
\end{code}

%*********************************************************
%*                                                      *
\subsection{@Functor@ and @Monad@ instances for @IO@}
%*                                                      *
%*********************************************************

\begin{code}
instance  Functor IO where
   fmap f x = x >>= (return . f)

instance  Monad IO  where
    {-# INLINE return #-}
    {-# INLINE (>>)   #-}
    {-# INLINE (>>=)  #-}
    m >> k    = m >>= \ _ -> k
    return    = returnIO
    (>>=)     = bindIO
    fail s    = GHC.IO.failIO s

returnIO :: a -> IO a
returnIO x = IO $ \ s -> (# s, x #)

bindIO :: IO a -> (a -> IO b) -> IO b
bindIO (IO m) k = IO $ \ s -> case m s of (# new_s, a #) -> unIO (k a) new_s

thenIO :: IO a -> IO b -> IO b
thenIO (IO m) k = IO $ \ s -> case m s of (# new_s, _ #) -> unIO k new_s

unIO :: IO a -> (State# RealWorld -> (# State# RealWorld, a #))
unIO (IO a) = a
\end{code}

%*********************************************************
%*                                                      *
\subsection{@getTag@}
%*                                                      *
%*********************************************************

Returns the 'tag' of a constructor application; this function is used
by the deriving code for Eq, Ord and Enum.

The primitive dataToTag# requires an evaluated constructor application
as its argument, so we provide getTag as a wrapper that performs the
evaluation before calling dataToTag#.  We could have dataToTag#
evaluate its argument, but we prefer to do it this way because (a)
dataToTag# can be an inline primop if it doesn't need to do any
evaluation, and (b) we want to expose the evaluation to the
simplifier, because it might be possible to eliminate the evaluation
in the case when the argument is already known to be evaluated.

\begin{code}
{-# INLINE getTag #-}
getTag :: a -> Int#
getTag x = x `seq` dataToTag# x
\end{code}

%*********************************************************
%*                                                      *
\subsection{Numeric primops}
%*                                                      *
%*********************************************************

\begin{code}
divInt# :: Int# -> Int# -> Int#
x# `divInt#` y#
        -- Be careful NOT to overflow if we do any additional arithmetic
        -- on the arguments...  the following  previous version of this
        -- code has problems with overflow:
--    | (x# ># 0#) && (y# <# 0#) = ((x# -# y#) -# 1#) `quotInt#` y#
--    | (x# <# 0#) && (y# ># 0#) = ((x# -# y#) +# 1#) `quotInt#` y#
    | (x# ># 0#) && (y# <# 0#) = ((x# -# 1#) `quotInt#` y#) -# 1#
    | (x# <# 0#) && (y# ># 0#) = ((x# +# 1#) `quotInt#` y#) -# 1#
    | otherwise                = x# `quotInt#` y#

modInt# :: Int# -> Int# -> Int#
x# `modInt#` y#
    | (x# ># 0#) && (y# <# 0#) ||
      (x# <# 0#) && (y# ># 0#)    = if r# /=# 0# then r# +# y# else 0#
    | otherwise                   = r#
    where
    !r# = x# `remInt#` y#
\end{code}

Definitions of the boxed PrimOps; these will be
used in the case of partial applications, etc.

\begin{code}
{-# INLINE eqInt #-}
{-# INLINE neInt #-}
{-# INLINE gtInt #-}
{-# INLINE geInt #-}
{-# INLINE ltInt #-}
{-# INLINE leInt #-}
{-# INLINE plusInt #-}
{-# INLINE minusInt #-}
{-# INLINE timesInt #-}
{-# INLINE quotInt #-}
{-# INLINE remInt #-}
{-# INLINE negateInt #-}

plusInt, minusInt, timesInt, quotInt, remInt, divInt, modInt :: Int -> Int -> Int
(I# x) `plusInt`  (I# y) = I# (x +# y)
(I# x) `minusInt` (I# y) = I# (x -# y)
(I# x) `timesInt` (I# y) = I# (x *# y)
(I# x) `quotInt`  (I# y) = I# (x `quotInt#` y)
(I# x) `remInt`   (I# y) = I# (x `remInt#`  y)
(I# x) `divInt`   (I# y) = I# (x `divInt#`  y)
(I# x) `modInt`   (I# y) = I# (x `modInt#`  y)

{-# RULES
"x# +# 0#" forall x#. x# +# 0# = x#
"0# +# x#" forall x#. 0# +# x# = x#
"x# -# 0#" forall x#. x# -# 0# = x#
"x# -# x#" forall x#. x# -# x# = 0#
"x# *# 0#" forall x#. x# *# 0# = 0#
"0# *# x#" forall x#. 0# *# x# = 0#
"x# *# 1#" forall x#. x# *# 1# = x#
"1# *# x#" forall x#. 1# *# x# = x#
  #-}

negateInt :: Int -> Int
negateInt (I# x) = I# (negateInt# x)

gtInt, geInt, eqInt, neInt, ltInt, leInt :: Int -> Int -> Bool
(I# x) `gtInt` (I# y) = x >#  y
(I# x) `geInt` (I# y) = x >=# y
(I# x) `eqInt` (I# y) = x ==# y
(I# x) `neInt` (I# y) = x /=# y
(I# x) `ltInt` (I# y) = x <#  y
(I# x) `leInt` (I# y) = x <=# y

{-# RULES
"x# ># x#"  forall x#. x# >#  x# = False
"x# >=# x#" forall x#. x# >=# x# = True
"x# ==# x#" forall x#. x# ==# x# = True
"x# /=# x#" forall x#. x# /=# x# = False
"x# <# x#"  forall x#. x# <#  x# = False
"x# <=# x#" forall x#. x# <=# x# = True
  #-}

{-# RULES
"plusFloat x 0.0"   forall x#. plusFloat#  x#   0.0# = x#
"plusFloat 0.0 x"   forall x#. plusFloat#  0.0# x#   = x#
"minusFloat x 0.0"  forall x#. minusFloat# x#   0.0# = x#
"minusFloat x x"    forall x#. minusFloat# x#   x#   = 0.0#
"timesFloat x 0.0"  forall x#. timesFloat# x#   0.0# = 0.0#
"timesFloat0.0 x"   forall x#. timesFloat# 0.0# x#   = 0.0#
"timesFloat x 1.0"  forall x#. timesFloat# x#   1.0# = x#
"timesFloat 1.0 x"  forall x#. timesFloat# 1.0# x#   = x#
"divideFloat x 1.0" forall x#. divideFloat# x#  1.0# = x#
  #-}

{-# RULES
"plusDouble x 0.0"   forall x#. (+##) x#    0.0## = x#
"plusDouble 0.0 x"   forall x#. (+##) 0.0## x#    = x#
"minusDouble x 0.0"  forall x#. (-##) x#    0.0## = x#
"timesDouble x 1.0"  forall x#. (*##) x#    1.0## = x#
"timesDouble 1.0 x"  forall x#. (*##) 1.0## x#    = x#
"divideDouble x 1.0" forall x#. (/##) x#    1.0## = x#
  #-}

{-
We'd like to have more rules, but for example:

This gives wrong answer (0) for NaN - NaN (should be NaN):
    "minusDouble x x"    forall x#. (-##) x#    x#    = 0.0##

This gives wrong answer (0) for 0 * NaN (should be NaN):
    "timesDouble 0.0 x"  forall x#. (*##) 0.0## x#    = 0.0##

This gives wrong answer (0) for NaN * 0 (should be NaN):
    "timesDouble x 0.0"  forall x#. (*##) x#    0.0## = 0.0##

These are tested by num014.
-}

-- Wrappers for the shift operations.  The uncheckedShift# family are
-- undefined when the amount being shifted by is greater than the size
-- in bits of Int#, so these wrappers perform a check and return
-- either zero or -1 appropriately.
--
-- Note that these wrappers still produce undefined results when the
-- second argument (the shift amount) is negative.

-- | Shift the argument left by the specified number of bits
-- (which must be non-negative).
shiftL# :: Word# -> Int# -> Word#
a `shiftL#` b   | b >=# WORD_SIZE_IN_BITS# = int2Word# 0#
                | otherwise                = a `uncheckedShiftL#` b

-- | Shift the argument right by the specified number of bits
-- (which must be non-negative).
shiftRL# :: Word# -> Int# -> Word#
a `shiftRL#` b  | b >=# WORD_SIZE_IN_BITS# = int2Word# 0#
                | otherwise                = a `uncheckedShiftRL#` b

-- | Shift the argument left by the specified number of bits
-- (which must be non-negative).
iShiftL# :: Int# -> Int# -> Int#
a `iShiftL#` b  | b >=# WORD_SIZE_IN_BITS# = 0#
                | otherwise                = a `uncheckedIShiftL#` b

-- | Shift the argument right (signed) by the specified number of bits
-- (which must be non-negative).
iShiftRA# :: Int# -> Int# -> Int#
a `iShiftRA#` b | b >=# WORD_SIZE_IN_BITS# = if a <# 0# then (-1#) else 0#
                | otherwise                = a `uncheckedIShiftRA#` b

-- | Shift the argument right (unsigned) by the specified number of bits
-- (which must be non-negative).
iShiftRL# :: Int# -> Int# -> Int#
a `iShiftRL#` b | b >=# WORD_SIZE_IN_BITS# = 0#
                | otherwise                = a `uncheckedIShiftRL#` b

#if WORD_SIZE_IN_BITS == 32
{-# RULES
"narrow32Int#"  forall x#. narrow32Int#   x# = x#
"narrow32Word#" forall x#. narrow32Word#   x# = x#
   #-}
#endif

{-# RULES
"int2Word2Int"  forall x#. int2Word# (word2Int# x#) = x#
"word2Int2Word" forall x#. word2Int# (int2Word# x#) = x#
  #-}
\end{code}


%********************************************************
%*                                                      *
\subsection{Unpacking C strings}
%*                                                      *
%********************************************************

This code is needed for virtually all programs, since it's used for
unpacking the strings of error messages.

\begin{code}
unpackCString# :: Addr# -> [Char]
{-# NOINLINE unpackCString# #-}
    -- There's really no point in inlining this, ever, cos
    -- the loop doesn't specialise in an interesting
    -- But it's pretty small, so there's a danger that
    -- it'll be inlined at every literal, which is a waste
unpackCString# addr 
  = unpack 0#
  where
    unpack nh
      | ch `eqChar#` '\0'# = []
      | otherwise          = C# ch : unpack (nh +# 1#)
      where
        !ch = indexCharOffAddr# addr nh

unpackAppendCString# :: Addr# -> [Char] -> [Char]
{-# NOINLINE unpackAppendCString# #-}
     -- See the NOINLINE note on unpackCString# 
unpackAppendCString# addr rest
  = unpack 0#
  where
    unpack nh
      | ch `eqChar#` '\0'# = rest
      | otherwise          = C# ch : unpack (nh +# 1#)
      where
        !ch = indexCharOffAddr# addr nh

unpackFoldrCString# :: Addr# -> (Char  -> a -> a) -> a -> a 
{-# NOINLINE [0] unpackFoldrCString# #-}
-- Unlike unpackCString#, there *is* some point in inlining unpackFoldrCString#, 
-- because we get better code for the function call.
-- However, don't inline till right at the end;
-- usually the unpack-list rule turns it into unpackCStringList
-- It also has a BuiltInRule in PrelRules.lhs:
--      unpackFoldrCString# "foo" c (unpackFoldrCString# "baz" c n)
--        =  unpackFoldrCString# "foobaz" c n
unpackFoldrCString# addr f z 
  = unpack 0#
  where
    unpack nh
      | ch `eqChar#` '\0'# = z
      | otherwise          = C# ch `f` unpack (nh +# 1#)
      where
        !ch = indexCharOffAddr# addr nh

unpackCStringUtf8# :: Addr# -> [Char]
unpackCStringUtf8# addr 
  = unpack 0#
  where
    unpack nh
      | ch `eqChar#` '\0'#   = []
      | ch `leChar#` '\x7F'# = C# ch : unpack (nh +# 1#)
      | ch `leChar#` '\xDF'# =
          C# (chr# (((ord# ch                                  -# 0xC0#) `uncheckedIShiftL#`  6#) +#
                     (ord# (indexCharOffAddr# addr (nh +# 1#)) -# 0x80#))) :
          unpack (nh +# 2#)
      | ch `leChar#` '\xEF'# =
          C# (chr# (((ord# ch                                  -# 0xE0#) `uncheckedIShiftL#` 12#) +#
                    ((ord# (indexCharOffAddr# addr (nh +# 1#)) -# 0x80#) `uncheckedIShiftL#`  6#) +#
                     (ord# (indexCharOffAddr# addr (nh +# 2#)) -# 0x80#))) :
          unpack (nh +# 3#)
      | otherwise            =
          C# (chr# (((ord# ch                                  -# 0xF0#) `uncheckedIShiftL#` 18#) +#
                    ((ord# (indexCharOffAddr# addr (nh +# 1#)) -# 0x80#) `uncheckedIShiftL#` 12#) +#
                    ((ord# (indexCharOffAddr# addr (nh +# 2#)) -# 0x80#) `uncheckedIShiftL#`  6#) +#
                     (ord# (indexCharOffAddr# addr (nh +# 3#)) -# 0x80#))) :
          unpack (nh +# 4#)
      where
        !ch = indexCharOffAddr# addr nh

unpackNBytes# :: Addr# -> Int# -> [Char]
unpackNBytes# _addr 0#   = []
unpackNBytes#  addr len# = unpack [] (len# -# 1#)
    where
     unpack acc i#
      | i# <# 0#  = acc
      | otherwise = 
         case indexCharOffAddr# addr i# of
            ch -> unpack (C# ch : acc) (i# -# 1#)

{-# RULES
"unpack"       [~1] forall a   . unpackCString# a             = build (unpackFoldrCString# a)
"unpack-list"  [1]  forall a   . unpackFoldrCString# a (:) [] = unpackCString# a
"unpack-append"     forall a n . unpackFoldrCString# a (:) n  = unpackAppendCString# a n

-- There's a built-in rule (in PrelRules.lhs) for
--      unpackFoldr "foo" c (unpackFoldr "baz" c n)  =  unpackFoldr "foobaz" c n

  #-}
\end{code}

#ifdef __HADDOCK__
\begin{code}
-- | A special argument for the 'Control.Monad.ST.ST' type constructor,
-- indexing a state embedded in the 'Prelude.IO' monad by
-- 'Control.Monad.ST.stToIO'.
data RealWorld
\end{code}
#endif