<para>
The idea of using existential quantification in data type declarations
-was suggested by Laufer (I believe, thought doubtless someone will
-correct me), and implemented in Hope+. It's been in Lennart
+was suggested by Perry, and implemented in Hope+ (Nigel Perry, <emphasis>The Implementation
+of Practical Functional Programming Languages</emphasis>, PhD Thesis, University of
+London, 1991). It was later formalised by Laufer and Odersky
+(<emphasis>Polymorphic type inference and abstract data types</emphasis>,
+TOPLAS, 16(5), pp1411-1430, 1994).
+It's been in Lennart
Augustsson's <command>hbc</command> Haskell compiler for several years, and
proved very useful. Here's the idea. Consider the declaration:
</para>
<title>Type classes</title>
<para>
-An easy extension (implemented in <command>hbc</command>) is to allow
+An easy extension is to allow
arbitrary contexts before the constructor. For example:
</para>
</sect4>
<sect4>
+<title>Record Constructors</title>
+
+<para>
+GHC allows existentials to be used with records syntax as well. For example:
+
+<programlisting>
+data Counter a = forall self. NewCounter
+ { _this :: self
+ , _inc :: self -> self
+ , _display :: self -> IO ()
+ , tag :: a
+ }
+</programlisting>
+Here <literal>tag</literal> is a public field, with a well-typed selector
+function <literal>tag :: Counter a -> a</literal>. The <literal>self</literal>
+type is hidden from the outside; any attempt to apply <literal>_this</literal>,
+<literal>_inc</literal> or <literal>_output</literal> as functions will raise a
+compile-time error. In other words, <emphasis>GHC defines a record selector function
+only for fields whose type does not mention the existentially-quantified variables</emphasis>.
+(This example used an underscore in the fields for which record selectors
+will not be defined, but that is only programming style; GHC ignores them.)
+</para>
+
+<para>
+To make use of these hidden fields, we need to create some helper functions:
+
+<programlisting>
+inc :: Counter a -> Counter a
+inc (NewCounter x i d t) = NewCounter
+ { _this = i x, _inc = i, _display = d, tag = t }
+
+display :: Counter a -> IO ()
+display NewCounter{ _this = x, _display = d } = d x
+</programlisting>
+
+Now we can define counters with different underlying implementations:
+
+<programlisting>
+counterA :: Counter String
+counterA = NewCounter
+ { _this = 0, _inc = (1+), _display = print, tag = "A" }
+
+counterB :: Counter String
+counterB = NewCounter
+ { _this = "", _inc = ('#':), _display = putStrLn, tag = "B" }
+
+main = do
+ display (inc counterA) -- prints "1"
+ display (inc (inc counterB)) -- prints "##"
+</programlisting>
+
+In GADT declarations (see <xref linkend="gadt"/>), the explicit
+<literal>forall</literal> may be omitted. For example, we can express
+the same <literal>Counter a</literal> using GADT:
+
+<programlisting>
+data Counter a where
+ NewCounter { _this :: self
+ , _inc :: self -> self
+ , _display :: self -> IO ()
+ , tag :: a
+ }
+ :: Counter a
+</programlisting>
+
+At the moment, record update syntax is only supported for Haskell 98 data types,
+so the following function does <emphasis>not</emphasis> work:
+
+<programlisting>
+-- This is invalid; use explicit NewCounter instead for now
+setTag :: Counter a -> a -> Counter a
+setTag obj t = obj{ tag = t }
+</programlisting>
+
+</para>
+
+</sect4>
+
+
+<sect4>
<title>Restrictions</title>
<para>
<title>Class declarations</title>
<para>
-This section documents GHC's implementation of multi-parameter type
-classes. There's lots of background in the paper <ulink
+This section, and the next one, documents GHC's type-class extensions.
+There's lots of background in the paper <ulink
url="http://research.microsoft.com/~simonpj/Papers/type-class-design-space" >Type
classes: exploring the design space</ulink > (Simon Peyton Jones, Mark
Jones, Erik Meijer).
</para>
<para>
-There are the following constraints on class declarations:
-<orderedlist>
-<listitem>
+All the extensions are enabled by the <option>-fglasgow-exts</option> flag.
+</para>
+<sect3>
+<title>Multi-parameter type classes</title>
<para>
- <emphasis>Multi-parameter type classes are permitted</emphasis>. For example:
+Multi-parameter type classes are permitted. For example:
<programlisting>
...etc.
</programlisting>
-
-
</para>
-</listitem>
-<listitem>
-
-<para>
- <emphasis>The class hierarchy must be acyclic</emphasis>. However, the definition
-of "acyclic" involves only the superclass relationships. For example,
-this is OK:
-
-
-<programlisting>
- class C a where {
- op :: D b => a -> b -> b
- }
-
- class C a => D a where { ... }
-</programlisting>
-
-
-Here, <literal>C</literal> is a superclass of <literal>D</literal>, but it's OK for a
-class operation <literal>op</literal> of <literal>C</literal> to mention <literal>D</literal>. (It
-would not be OK for <literal>D</literal> to be a superclass of <literal>C</literal>.)
+</sect3>
-</para>
-</listitem>
-<listitem>
+<sect3>
+<title>The superclasses of a class declaration</title>
<para>
- <emphasis>There are no restrictions on the context in a class declaration
+There are no restrictions on the context in a class declaration
(which introduces superclasses), except that the class hierarchy must
-be acyclic</emphasis>. So these class declarations are OK:
+be acyclic. So these class declarations are OK:
<programlisting>
</para>
-</listitem>
-
-<listitem>
-
<para>
- <emphasis>All of the class type variables must be reachable (in the sense
-mentioned in <xref linkend="type-restrictions"/>)
-from the free variables of each method type
-</emphasis>. For example:
+As in Haskell 98, The class hierarchy must be acyclic. However, the definition
+of "acyclic" involves only the superclass relationships. For example,
+this is OK:
<programlisting>
- class Coll s a where
- empty :: s
- insert :: s -> a -> s
-</programlisting>
-
-
-is not OK, because the type of <literal>empty</literal> doesn't mention
-<literal>a</literal>. This rule is a consequence of Rule 1(a), above, for
-types, and has the same motivation.
-
-Sometimes, offending class declarations exhibit misunderstandings. For
-example, <literal>Coll</literal> might be rewritten
-
+ class C a where {
+ op :: D b => a -> b -> b
+ }
-<programlisting>
- class Coll s a where
- empty :: s a
- insert :: s a -> a -> s a
+ class C a => D a where { ... }
</programlisting>
-which makes the connection between the type of a collection of
-<literal>a</literal>'s (namely <literal>(s a)</literal>) and the element type <literal>a</literal>.
-Occasionally this really doesn't work, in which case you can split the
-class like this:
-
-
-<programlisting>
- class CollE s where
- empty :: s
-
- class CollE s => Coll s a where
- insert :: s -> a -> s
-</programlisting>
+Here, <literal>C</literal> is a superclass of <literal>D</literal>, but it's OK for a
+class operation <literal>op</literal> of <literal>C</literal> to mention <literal>D</literal>. (It
+would not be OK for <literal>D</literal> to be a superclass of <literal>C</literal>.)
+</para>
+</sect3>
-</para>
-</listitem>
-</orderedlist>
-</para>
<sect3 id="class-method-types">
<title>Class method types</title>
+
<para>
Haskell 98 prohibits class method types to mention constraints on the
class type variable, thus:
The type of <literal>elem</literal> is illegal in Haskell 98, because it
contains the constraint <literal>Eq a</literal>, constrains only the
class type variable (in this case <literal>a</literal>).
-</para>
-<para>
-With the <option>-fglasgow-exts</option> GHC lifts this restriction.
+GHC lifts this restriction.
</para>
+
</sect3>
-</sect2>
-<sect2 id="type-restrictions">
-<title>Type signatures</title>
+<sect3 id="functional-dependencies">
+<title>Functional dependencies
+</title>
-<sect3><title>The context of a type signature</title>
-<para>
-Unlike Haskell 98, constraints in types do <emphasis>not</emphasis> have to be of
-the form <emphasis>(class type-variable)</emphasis> or
-<emphasis>(class (type-variable type-variable ...))</emphasis>. Thus,
-these type signatures are perfectly OK
-<programlisting>
- g :: Eq [a] => ...
- g :: Ord (T a ()) => ...
-</programlisting>
+<para> Functional dependencies are implemented as described by Mark Jones
+in “<ulink url="http://www.cse.ogi.edu/~mpj/pubs/fundeps.html">Type Classes with Functional Dependencies</ulink>”, Mark P. Jones,
+In Proceedings of the 9th European Symposium on Programming,
+ESOP 2000, Berlin, Germany, March 2000, Springer-Verlag LNCS 1782,
+.
</para>
<para>
-GHC imposes the following restrictions on the constraints in a type signature.
-Consider the type:
-
+Functional dependencies are introduced by a vertical bar in the syntax of a
+class declaration; e.g.
<programlisting>
- forall tv1..tvn (c1, ...,cn) => type
-</programlisting>
-
-(Here, we write the "foralls" explicitly, although the Haskell source
-language omits them; in Haskell 98, all the free type variables of an
-explicit source-language type signature are universally quantified,
-except for the class type variables in a class declaration. However,
-in GHC, you can give the foralls if you want. See <xref linkend="universal-quantification"/>).
-</para>
-
-<para>
-
-<orderedlist>
-<listitem>
-
-<para>
- <emphasis>Each universally quantified type variable
-<literal>tvi</literal> must be reachable from <literal>type</literal></emphasis>.
-
-A type variable <literal>a</literal> is "reachable" if it it appears
-in the same constraint as either a type variable free in in
-<literal>type</literal>, or another reachable type variable.
-A value with a type that does not obey
-this reachability restriction cannot be used without introducing
-ambiguity; that is why the type is rejected.
-Here, for example, is an illegal type:
-
+ class (Monad m) => MonadState s m | m -> s where ...
-<programlisting>
- forall a. Eq a => Int
+ class Foo a b c | a b -> c where ...
</programlisting>
-
-
-When a value with this type was used, the constraint <literal>Eq tv</literal>
-would be introduced where <literal>tv</literal> is a fresh type variable, and
-(in the dictionary-translation implementation) the value would be
-applied to a dictionary for <literal>Eq tv</literal>. The difficulty is that we
-can never know which instance of <literal>Eq</literal> to use because we never
-get any more information about <literal>tv</literal>.
+There should be more documentation, but there isn't (yet). Yell if you need it.
</para>
<para>
-Note
-that the reachability condition is weaker than saying that <literal>a</literal> is
-functionally dependent on a type variable free in
-<literal>type</literal> (see <xref
-linkend="functional-dependencies"/>). The reason for this is there
-might be a "hidden" dependency, in a superclass perhaps. So
-"reachable" is a conservative approximation to "functionally dependent".
-For example, consider:
+In a class declaration, all of the class type variables must be reachable (in the sense
+mentioned in <xref linkend="type-restrictions"/>)
+from the free variables of each method type.
+For example:
+
<programlisting>
- class C a b | a -> b where ...
- class C a b => D a b where ...
- f :: forall a b. D a b => a -> a
+ class Coll s a where
+ empty :: s
+ insert :: s -> a -> s
</programlisting>
-This is fine, because in fact <literal>a</literal> does functionally determine <literal>b</literal>
-but that is not immediately apparent from <literal>f</literal>'s type.
-</para>
-</listitem>
-<listitem>
-
-<para>
- <emphasis>Every constraint <literal>ci</literal> must mention at least one of the
-universally quantified type variables <literal>tvi</literal></emphasis>.
-
-For example, this type is OK because <literal>C a b</literal> mentions the
-universally quantified type variable <literal>b</literal>:
-
+is not OK, because the type of <literal>empty</literal> doesn't mention
+<literal>a</literal>. Functional dependencies can make the type variable
+reachable:
<programlisting>
- forall a. C a b => burble
+ class Coll s a | s -> a where
+ empty :: s
+ insert :: s -> a -> s
</programlisting>
-
-The next type is illegal because the constraint <literal>Eq b</literal> does not
-mention <literal>a</literal>:
-
+Alternatively <literal>Coll</literal> might be rewritten
<programlisting>
- forall a. Eq b => burble
+ class Coll s a where
+ empty :: s a
+ insert :: s a -> a -> s a
</programlisting>
-The reason for this restriction is milder than the other one. The
-excluded types are never useful or necessary (because the offending
-context doesn't need to be witnessed at this point; it can be floated
-out). Furthermore, floating them out increases sharing. Lastly,
-excluding them is a conservative choice; it leaves a patch of
-territory free in case we need it later.
-
-</para>
-</listitem>
-
-</orderedlist>
-
-</para>
-</sect3>
+which makes the connection between the type of a collection of
+<literal>a</literal>'s (namely <literal>(s a)</literal>) and the element type <literal>a</literal>.
+Occasionally this really doesn't work, in which case you can split the
+class like this:
-<sect3 id="hoist">
-<title>For-all hoisting</title>
-<para>
-It is often convenient to use generalised type synonyms (see <xref linkend="type-synonyms"/>) at the right hand
-end of an arrow, thus:
-<programlisting>
- type Discard a = forall b. a -> b -> a
- g :: Int -> Discard Int
- g x y z = x+y
-</programlisting>
-Simply expanding the type synonym would give
-<programlisting>
- g :: Int -> (forall b. Int -> b -> Int)
-</programlisting>
-but GHC "hoists" the <literal>forall</literal> to give the isomorphic type
-<programlisting>
- g :: forall b. Int -> Int -> b -> Int
-</programlisting>
-In general, the rule is this: <emphasis>to determine the type specified by any explicit
-user-written type (e.g. in a type signature), GHC expands type synonyms and then repeatedly
-performs the transformation:</emphasis>
-<programlisting>
- <emphasis>type1</emphasis> -> forall a1..an. <emphasis>context2</emphasis> => <emphasis>type2</emphasis>
-==>
- forall a1..an. <emphasis>context2</emphasis> => <emphasis>type1</emphasis> -> <emphasis>type2</emphasis>
-</programlisting>
-(In fact, GHC tries to retain as much synonym information as possible for use in
-error messages, but that is a usability issue.) This rule applies, of course, whether
-or not the <literal>forall</literal> comes from a synonym. For example, here is another
-valid way to write <literal>g</literal>'s type signature:
-<programlisting>
- g :: Int -> Int -> forall b. b -> Int
-</programlisting>
-</para>
-<para>
-When doing this hoisting operation, GHC eliminates duplicate constraints. For
-example:
-<programlisting>
- type Foo a = (?x::Int) => Bool -> a
- g :: Foo (Foo Int)
-</programlisting>
-means
<programlisting>
- g :: (?x::Int) => Bool -> Bool -> Int
+ class CollE s where
+ empty :: s
+
+ class CollE s => Coll s a where
+ insert :: s -> a -> s
</programlisting>
</para>
</sect3>
+
+
+
</sect2>
<sect2 id="instance-decls">
<title>Instance declarations</title>
+<sect3 id="instance-heads">
+<title>Instance heads</title>
+
+<para>
+The <emphasis>head</emphasis> of an instance declaration is the part to the
+right of the "<literal>=></literal>". In Haskell 98 the head of an instance
+declaration
+must be of the form <literal>C (T a1 ... an)</literal>, where
+<literal>C</literal> is the class, <literal>T</literal> is a type constructor,
+and the <literal>a1 ... an</literal> are distinct type variables.
+</para>
+<para>
+The <option>-fglasgow-exts</option> flag lifts this restriction and allows the
+instance head to be of form <literal>C t1 ... tn</literal> where <literal>t1
+... tn</literal> are arbitrary types (provided, of course, everything is
+well-kinded). In particular, types <literal>ti</literal> can be type variables
+or structured types, and can contain repeated occurrences of a single type
+variable.
+Examples:
+<programlisting>
+ instance Eq (T a a) where ...
+ -- Repeated type variable
+
+ instance Eq (S [a]) where ...
+ -- Structured type
+
+ instance C Int [a] where ...
+ -- Multiple parameters
+</programlisting>
+</para>
+</sect3>
+
<sect3 id="instance-overlap">
<title>Overlapping instances</title>
<para>
<programlisting>
instance F a where ...
</programlisting>
-Note that instance heads <emphasis>may</emphasis> contain repeated type variables.
+Note that instance heads may contain repeated type variables (<xref linkend="instance-heads"/>).
For example, this is OK:
<programlisting>
instance Stateful (ST s) (MutVar s) where ...
<listitem>
<para>All of the types in the <emphasis>context</emphasis> of
-an instance declaration <emphasis>must</emphasis> be type variables.
+an instance declaration <emphasis>must</emphasis> be type variables, and
+there must be no repeated type variables in any one constraint.
Thus
<programlisting>
instance C a b => Eq (a,b) where ...
</programlisting>
is OK, but
<programlisting>
-instance C Int b => Foo b where ...
+instance C Int b => Foo [b] where ...
+</programlisting>
+is not OK (because of the non-type-variable <literal>Int</literal> in the context), and nor is
+<programlisting>
+instance C b b => Foo [b] where ...
</programlisting>
-is not OK.
+(because of the repeated type variable).
</para>
</listitem>
</orderedlist>
</sect2>
+<sect2 id="type-restrictions">
+<title>Type signatures</title>
+
+<sect3><title>The context of a type signature</title>
+<para>
+Unlike Haskell 98, constraints in types do <emphasis>not</emphasis> have to be of
+the form <emphasis>(class type-variable)</emphasis> or
+<emphasis>(class (type-variable type-variable ...))</emphasis>. Thus,
+these type signatures are perfectly OK
+<programlisting>
+ g :: Eq [a] => ...
+ g :: Ord (T a ()) => ...
+</programlisting>
+</para>
+<para>
+GHC imposes the following restrictions on the constraints in a type signature.
+Consider the type:
+
+<programlisting>
+ forall tv1..tvn (c1, ...,cn) => type
+</programlisting>
+
+(Here, we write the "foralls" explicitly, although the Haskell source
+language omits them; in Haskell 98, all the free type variables of an
+explicit source-language type signature are universally quantified,
+except for the class type variables in a class declaration. However,
+in GHC, you can give the foralls if you want. See <xref linkend="universal-quantification"/>).
+</para>
+
+<para>
+
+<orderedlist>
+<listitem>
+
+<para>
+ <emphasis>Each universally quantified type variable
+<literal>tvi</literal> must be reachable from <literal>type</literal></emphasis>.
+
+A type variable <literal>a</literal> is "reachable" if it it appears
+in the same constraint as either a type variable free in in
+<literal>type</literal>, or another reachable type variable.
+A value with a type that does not obey
+this reachability restriction cannot be used without introducing
+ambiguity; that is why the type is rejected.
+Here, for example, is an illegal type:
+
+
+<programlisting>
+ forall a. Eq a => Int
+</programlisting>
+
+
+When a value with this type was used, the constraint <literal>Eq tv</literal>
+would be introduced where <literal>tv</literal> is a fresh type variable, and
+(in the dictionary-translation implementation) the value would be
+applied to a dictionary for <literal>Eq tv</literal>. The difficulty is that we
+can never know which instance of <literal>Eq</literal> to use because we never
+get any more information about <literal>tv</literal>.
+</para>
+<para>
+Note
+that the reachability condition is weaker than saying that <literal>a</literal> is
+functionally dependent on a type variable free in
+<literal>type</literal> (see <xref
+linkend="functional-dependencies"/>). The reason for this is there
+might be a "hidden" dependency, in a superclass perhaps. So
+"reachable" is a conservative approximation to "functionally dependent".
+For example, consider:
+<programlisting>
+ class C a b | a -> b where ...
+ class C a b => D a b where ...
+ f :: forall a b. D a b => a -> a
+</programlisting>
+This is fine, because in fact <literal>a</literal> does functionally determine <literal>b</literal>
+but that is not immediately apparent from <literal>f</literal>'s type.
+</para>
+</listitem>
+<listitem>
+
+<para>
+ <emphasis>Every constraint <literal>ci</literal> must mention at least one of the
+universally quantified type variables <literal>tvi</literal></emphasis>.
+
+For example, this type is OK because <literal>C a b</literal> mentions the
+universally quantified type variable <literal>b</literal>:
+
+
+<programlisting>
+ forall a. C a b => burble
+</programlisting>
+
+
+The next type is illegal because the constraint <literal>Eq b</literal> does not
+mention <literal>a</literal>:
+
+
+<programlisting>
+ forall a. Eq b => burble
+</programlisting>
+
+
+The reason for this restriction is milder than the other one. The
+excluded types are never useful or necessary (because the offending
+context doesn't need to be witnessed at this point; it can be floated
+out). Furthermore, floating them out increases sharing. Lastly,
+excluding them is a conservative choice; it leaves a patch of
+territory free in case we need it later.
+
+</para>
+</listitem>
+
+</orderedlist>
+
+</para>
+</sect3>
+
+<sect3 id="hoist">
+<title>For-all hoisting</title>
+<para>
+It is often convenient to use generalised type synonyms (see <xref linkend="type-synonyms"/>) at the right hand
+end of an arrow, thus:
+<programlisting>
+ type Discard a = forall b. a -> b -> a
+
+ g :: Int -> Discard Int
+ g x y z = x+y
+</programlisting>
+Simply expanding the type synonym would give
+<programlisting>
+ g :: Int -> (forall b. Int -> b -> Int)
+</programlisting>
+but GHC "hoists" the <literal>forall</literal> to give the isomorphic type
+<programlisting>
+ g :: forall b. Int -> Int -> b -> Int
+</programlisting>
+In general, the rule is this: <emphasis>to determine the type specified by any explicit
+user-written type (e.g. in a type signature), GHC expands type synonyms and then repeatedly
+performs the transformation:</emphasis>
+<programlisting>
+ <emphasis>type1</emphasis> -> forall a1..an. <emphasis>context2</emphasis> => <emphasis>type2</emphasis>
+==>
+ forall a1..an. <emphasis>context2</emphasis> => <emphasis>type1</emphasis> -> <emphasis>type2</emphasis>
+</programlisting>
+(In fact, GHC tries to retain as much synonym information as possible for use in
+error messages, but that is a usability issue.) This rule applies, of course, whether
+or not the <literal>forall</literal> comes from a synonym. For example, here is another
+valid way to write <literal>g</literal>'s type signature:
+<programlisting>
+ g :: Int -> Int -> forall b. b -> Int
+</programlisting>
+</para>
+<para>
+When doing this hoisting operation, GHC eliminates duplicate constraints. For
+example:
+<programlisting>
+ type Foo a = (?x::Int) => Bool -> a
+ g :: Foo (Foo Int)
+</programlisting>
+means
+<programlisting>
+ g :: (?x::Int) => Bool -> Bool -> Int
+</programlisting>
+</para>
+</sect3>
+
+
+</sect2>
+
<sect2 id="implicit-parameters">
<title>Implicit parameters</title>
</sect2>
-<sect2 id="functional-dependencies">
-<title>Functional dependencies
-</title>
-
-<para> Functional dependencies are implemented as described by Mark Jones
-in “<ulink url="http://www.cse.ogi.edu/~mpj/pubs/fundeps.html">Type Classes with Functional Dependencies</ulink>”, Mark P. Jones,
-In Proceedings of the 9th European Symposium on Programming,
-ESOP 2000, Berlin, Germany, March 2000, Springer-Verlag LNCS 1782,
-.
-</para>
-<para>
-Functional dependencies are introduced by a vertical bar in the syntax of a
-class declaration; e.g.
-<programlisting>
- class (Monad m) => MonadState s m | m -> s where ...
-
- class Foo a b c | a b -> c where ...
-</programlisting>
-There should be more documentation, but there isn't (yet). Yell if you need it.
-</para>
-</sect2>
-
-
-
<sect2 id="sec-kinding">
<title>Explicitly-kinded quantification</title>
modules <literal>Data.Typeable</literal> and <literal>Data.Generics</literal> respectively, and the
appropriate class must be in scope before it can be mentioned in the <literal>deriving</literal> clause.
</para>
+<para>An instance of <literal>Typeable</literal> can only be derived if the
+data type has seven or fewer type parameters, all of kind <literal>*</literal>.
+The reason for this is that the <literal>Typeable</literal> class is derived using the scheme
+described in
+<ulink url="http://research.microsoft.com/%7Esimonpj/papers/hmap/gmap2.ps">
+Scrap More Boilerplate: Reflection, Zips, and Generalised Casts
+</ulink>.
+(Section 7.4 of the paper describes the multiple <literal>Typeable</literal> classes that
+are used, and only <literal>Typeable1</literal> up to
+<literal>Typeable7</literal> are provided in the library.)
+In other cases, there is nothing to stop the programmer writing a <literal>TypableX</literal>
+class, whose kind suits that of the data type constructor, and
+then writing the data type instance by hand.
+</para>
</sect2>
<sect2 id="newtype-deriving">
</sect2>
+<sect2 id="typing-binds">
+<title>Generalised typing of mutually recursive bindings</title>
+
+<para>
+The Haskell Report specifies that a group of bindings (at top level, or in a
+<literal>let</literal> or <literal>where</literal>) should be sorted into
+strongly-connected components, and then type-checked in dependency order
+(<ulink url="http://haskell.org/onlinereport/decls.html#sect4.5.1">Haskell
+Report, Section 4.5.1</ulink>).
+As each group is type-checked, any binders of the group that
+have
+an explicit type signature are put in the type environment with the specified
+polymorphic type,
+and all others are monomorphic until the group is generalised
+(<ulink url="http://haskell.org/onlinereport/decls.html#sect4.5.2">Haskell Report, Section 4.5.2</ulink>).
+</para>
+
+<para>Following a suggestion of Mark Jones, in his paper
+<ulink url="http://www.cse.ogi.edu/~mpj/thih/">Typing Haskell in
+Haskell</ulink>,
+GHC implements a more general scheme. If <option>-fglasgow-exts</option> is
+specified:
+<emphasis>the dependency analysis ignores references to variables that have an explicit
+type signature</emphasis>.
+As a result of this refined dependency analysis, the dependency groups are smaller, and more bindings will
+typecheck. For example, consider:
+<programlisting>
+ f :: Eq a => a -> Bool
+ f x = (x == x) || g True || g "Yes"
+
+ g y = (y <= y) || f True
+</programlisting>
+This is rejected by Haskell 98, but under Jones's scheme the definition for
+<literal>g</literal> is typechecked first, separately from that for
+<literal>f</literal>,
+because the reference to <literal>f</literal> in <literal>g</literal>'s right
+hand side is ingored by the dependency analysis. Then <literal>g</literal>'s
+type is generalised, to get
+<programlisting>
+ g :: Ord a => a -> Bool
+</programlisting>
+Now, the defintion for <literal>f</literal> is typechecked, with this type for
+<literal>g</literal> in the type environment.
+</para>
+
+<para>
+The same refined dependency analysis also allows the type signatures of
+mutually-recursive functions to have different contexts, something that is illegal in
+Haskell 98 (Section 4.5.2, last sentence). With
+<option>-fglasgow-exts</option>
+GHC only insists that the type signatures of a <emphasis>refined</emphasis> group have identical
+type signatures; in practice this means that only variables bound by the same
+pattern binding must have the same context. For example, this is fine:
+<programlisting>
+ f :: Eq a => a -> Bool
+ f x = (x == x) || g True
+
+ g :: Ord a => a -> Bool
+ g y = (y <= y) || f True
+</programlisting>
+</para>
+</sect2>
</sect1>
<!-- ==================== End of type system extensions ================= -->
eval :: Term a -> a
eval (Lit i) = i
eval (Succ t) = 1 + eval t
- eval (IsZero i) = eval i == 0
+ eval (IsZero t) = eval t == 0
eval (If b e1 e2) = if eval b then eval e1 else eval e2
- eval (Pair e1 e2) = (eval e2, eval e2)
+ eval (Pair e1 e2) = (eval e1, eval e2)
</programlisting>
These and many other examples are given in papers by Hongwei Xi, and Tim Sheard.
</para>
</para></listitem>
<listitem><para>
-You cannot use record syntax on a GADT-style data type declaration. (
-It's not clear what these it would mean. For example,
-the record selectors might ill-typed.)
-However, you can use strictness annotations, in the obvious places
+You can use record syntax on a GADT-style data type declaration:
+
+<programlisting>
+ data Term a where
+ Lit { val :: Int } :: Term Int
+ Succ { num :: Term Int } :: Term Int
+ Pred { num :: Term Int } :: Term Int
+ IsZero { arg :: Term Int } :: Term Bool
+ Pair { arg1 :: Term a
+ , arg2 :: Term b
+ } :: Term (a,b)
+ If { cnd :: Term Bool
+ , tru :: Term a
+ , fls :: Term a
+ } :: Term a
+</programlisting>
+For every constructor that has a field <literal>f</literal>, (a) the type of
+field <literal>f</literal> must be the same; and (b) the
+result type of the constructor must be the same; both modulo alpha conversion.
+Hence, in our example, we cannot merge the <literal>num</literal> and <literal>arg</literal>
+fields above into a
+single name. Although their field types are both <literal>Term Int</literal>,
+their selector functions actually have different types:
+
+<programlisting>
+ num :: Term Int -> Term Int
+ arg :: Term Bool -> Term Int
+</programlisting>
+
+At the moment, record updates are not yet possible with GADT, so support is
+limited to record construction, selection and pattern matching:
+
+<programlisting>
+ someTerm :: Term Bool
+ someTerm = IsZero { arg = Succ { num = Lit { val = 0 } } }
+
+ eval :: Term a -> a
+ eval Lit { val = i } = i
+ eval Succ { num = t } = eval t + 1
+ eval Pred { num = t } = eval t - 1
+ eval IsZero { arg = t } = eval t == 0
+ eval Pair { arg1 = t1, arg2 = t2 } = (eval t1, eval t2)
+ eval t@If{} = if eval (cnd t) then eval (tru t) else eval (fls t)
+</programlisting>
+
+</para></listitem>
+
+<listitem><para>
+You can use strictness annotations, in the obvious places
in the constructor type:
<programlisting>
data Term a where
</para>
<para> A splice can occur in place of
<itemizedlist>
- <listitem><para> an expression; the spliced expression must have type <literal>Expr</literal></para></listitem>
+ <listitem><para> an expression; the spliced expression must
+ have type <literal>Q Exp</literal></para></listitem>
<listitem><para> a list of top-level declarations; ; the spliced expression must have type <literal>Q [Dec]</literal></para></listitem>
- <listitem><para> [Planned, but not implemented yet.] a type; the spliced expression must have type <literal>Type</literal>.</para></listitem>
+ <listitem><para> [Planned, but not implemented yet.] a
+ type; the spliced expression must have type <literal>Q Typ</literal>.</para></listitem>
</itemizedlist>
(Note that the syntax for a declaration splice uses "<literal>$</literal>" not "<literal>splice</literal>" as in
the paper. Also the type of the enclosed expression must be <literal>Q [Dec]</literal>, not <literal>[Q Dec]</literal>
it won't make much sense unless you've read Hughes's paper.
This notation is translated to ordinary Haskell,
using combinators from the
-<ulink url="../libraries/base/Control.Arrow.html"><literal>Control.Arrow</literal></ulink>
+<ulink url="../libraries/base/Control-Arrow.html"><literal>Control.Arrow</literal></ulink>
module.
</para>
<literal>y</literal>.
In the next line, the output is discarded.
The arrow <function>returnA</function> is defined in the
-<ulink url="../libraries/base/Control.Arrow.html"><literal>Control.Arrow</literal></ulink>
+<ulink url="../libraries/base/Control-Arrow.html"><literal>Control.Arrow</literal></ulink>
module as <literal>arr id</literal>.
The above example is treated as an abbreviation for
<screen>
Note that variables not used later in the composition are projected out.
After simplification using rewrite rules (see <xref linkend="rewrite-rules"/>)
defined in the
-<ulink url="../libraries/base/Control.Arrow.html"><literal>Control.Arrow</literal></ulink>
+<ulink url="../libraries/base/Control-Arrow.html"><literal>Control.Arrow</literal></ulink>
module, this reduces to
<screen>
arr (\ x -> (x+1, x)) >>>
<listitem>
<para>
The module must import
-<ulink url="../libraries/base/Control.Arrow.html"><literal>Control.Arrow</literal></ulink>.
+<ulink url="../libraries/base/Control-Arrow.html"><literal>Control.Arrow</literal></ulink>.
</para>
</listitem>
</para>
<para>
-To have the compiler ignore uses of assert, use the compiler option
-<option>-fignore-asserts</option>. <indexterm><primary>-fignore-asserts
-option</primary></indexterm> That is, expressions of the form
+GHC ignores assertions when optimisation is turned on with the
+ <option>-O</option><indexterm><primary><option>-O</option></primary></indexterm> flag. That is, expressions of the form
<literal>assert pred e</literal> will be rewritten to
-<literal>e</literal>.
-</para>
+<literal>e</literal>. You can also disable assertions using the
+ <option>-fignore-asserts</option>
+ option<indexterm><primary><option>-fignore-asserts</option></primary>
+ </indexterm>.</para>
<para>
Assertion failures can be caught, see the documentation for the
</sect3>
</sect2>
+ <sect2 id="language-pragma">
+ <title>LANGUAGE pragma</title>
+
+ <indexterm><primary>LANGUAGE</primary><secondary>pragma</secondary></indexterm>
+ <indexterm><primary>pragma</primary><secondary>LANGUAGE</secondary></indexterm>
+
+ <para>This allows language extensions to be enabled in a portable way.
+ It is the intention that all Haskell compilers support the
+ <literal>LANGUAGE</literal> pragma with the same syntax, although not
+ all extensions are supported by all compilers, of
+ course. The <literal>LANGUAGE</literal> pragma should be used instead
+ of <literal>OPTIONS_GHC</literal>, if possible.</para>
+
+ <para>For example, to enable the FFI and preprocessing with CPP:</para>
+
+<programlisting>{-# LANGUAGE ForeignFunctionInterface, CPP #-}</programlisting>
+
+ <para>Any extension from the <literal>Extension</literal> type defined in
+ <ulink
+ url="../libraries/Cabal/Language-Haskell-Extension.html"><literal>Language.Haskell.Extension</literal></ulink> may be used. GHC will report an error if any of the requested extensions are not supported.</para>
+ </sect2>
+
+
<sect2 id="line-pragma">
<title>LINE pragma</title>
code. It lets you specify the line number and filename of the
original code; for example</para>
-<programlisting>
-{-# LINE 42 "Foo.vhs" #-}
-</programlisting>
+<programlisting>{-# LINE 42 "Foo.vhs" #-}</programlisting>
<para>if you'd generated the current file from something called
<filename>Foo.vhs</filename> and this line corresponds to line
for the original function, not its code):
<programlisting>
f :: Eq a => a -> b -> b
- {-# SPECIALISE g :: Int -> b -> b #-}
+ {-# SPECIALISE f :: Int -> b -> b #-}
g :: (Eq a, Ix b) => a -> b -> b
{-# SPECIALISE g :: (Eq a) => a -> Int -> Int #-}
well. If you use this kind of specialisation, let us know how well it works.
</para>
+<para>A <literal>SPECIALIZE</literal> pragma can optionally be followed with a
+<literal>INLINE</literal> or <literal>NOINLINE</literal> pragma, optionally
+followed by a phase, as described in <xref linkend="inline-noinline-pragma"/>.
+The <literal>INLINE</literal> pragma affects the specialised verison of the
+function (only), and applies even if the function is recursive. The motivating
+example is this:
+<programlisting>
+-- A GADT for arrays with type-indexed representation
+data Arr e where
+ ArrInt :: !Int -> ByteArray# -> Arr Int
+ ArrPair :: !Int -> Arr e1 -> Arr e2 -> Arr (e1, e2)
+
+(!:) :: Arr e -> Int -> e
+{-# SPECIALISE INLINE (!:) :: Arr Int -> Int -> Int #-}
+{-# SPECIALISE INLINE (!:) :: Arr (a, b) -> Int -> (a, b) #-}
+(ArrInt _ ba) !: (I# i) = I# (indexIntArray# ba i)
+(ArrPair _ a1 a2) !: i = (a1 !: i, a2 !: i)
+</programlisting>
+Here, <literal>(!:)</literal> is a recursive function that indexes arrays
+of type <literal>Arr e</literal>. Consider a call to <literal>(!:)</literal>
+at type <literal>(Int,Int)</literal>. The second specialisation will fire, and
+the specialised function will be inlined. It has two calls to
+<literal>(!:)</literal>,
+both at type <literal>Int</literal>. Both these calls fire the first
+specialisation, whose body is also inlined. The result is a type-based
+unrolling of the indexing function.</para>
+<para>Warning: you can make GHC diverge by using <literal>SPECIALISE INLINE</literal>
+on an ordinarily-recursive function.</para>
+
<para>Note: In earlier versions of GHC, it was possible to provide your own
specialised function for a given type: