From 4d228365aca9b5ed2ea90dd706a866042e776b14 Mon Sep 17 00:00:00 2001 From: aarne Date: Thu, 5 Jul 2007 09:58:52 +0000 Subject: updated gf-modules --- doc/gf-modules.html | 1804 ++++++++++++++++++++++++++++----------------------- 1 file changed, 1009 insertions(+), 795 deletions(-) (limited to 'doc/gf-modules.html') diff --git a/doc/gf-modules.html b/doc/gf-modules.html index 52859c2c0..6292bd855 100644 --- a/doc/gf-modules.html +++ b/doc/gf-modules.html @@ -1,586 +1,725 @@ - - - - -
- - - - - -

The Module System of GF

- -

- -8/4/2005 - 10/4 - -

- -Aarne Ranta - -

- -A GF grammar consists of a set of modules, which can be + + + + +The Module System of GF + +

The Module System of GF

+ +Aarne Ranta
+8/4/2005 - 5/7/2007 +
+ +

+
+

+ + +

+
+

+

+A GF grammar consists of a set of modules, which can be combined in different ways to build different grammars. -There are several different types of modules: -

+There are several different types of modules: +

+ + +

We will go through the module types in this order, which is also -their order of "importance" from the most frequently used to -the more esoteric/advanced ones. - -

- -This document is meant as an appendix to the GF tutorial, and -presupposes knowledge of GF judgements and expressions. It aims -just to tell what module system adds to the old functionality; -some information is repeated to give understanding on how the -module system relates to the already familiar uses of GF grammars. - - - -

The principal module types

- -

Abstract syntax

- +their order of "importance" from the most basic to +the more advanced ones. +

+

+This document presupposes knowledge of GF judgements and expressions, which can +be gained from the GF tutorial. It aims +to give a systamatic description of the module system; +some tutorial information is repeated to make the document +self-contained. +

+ +

The principal module types

+ +

Abstract syntax

+

Any GF grammar that is used in an application will probably contain at least one module -of the abstract module type. Here is an example of +of the abstract module type. Here is an example of such a module, defining a fragment of propositional logic. -

-  abstract Logic = {
-    cat Prop ;
-    fun Conj : Prop -> Prop -> Prop ;
-    fun Disj : Prop -> Prop -> Prop ;
-    fun Impl : Prop -> Prop -> Prop ;
-    fun Falsum : Prop ;
-    }
-
-The name of this module is Logic. - -

- -An abstract module defines an abstract syntax, which +

+
+    abstract Logic = {
+      cat Prop ;
+      fun Conj : Prop -> Prop -> Prop ;
+      fun Disj : Prop -> Prop -> Prop ;
+      fun Impl : Prop -> Prop -> Prop ;
+      fun Falsum : Prop ;
+      }
+
+

+The name of this module is Logic. +

+

+An abstract module defines an abstract syntax, which is a language-independent representation of a fragment of language. -It consists of two kinds of judgements: -

- -

Compilation of abstract syntax

- -The GF grammar compiler expects to find the module Logic in a file named -Logic.gf. When the compiler is run, it produces -another file, named Logic.gfc. This file is in the -format called canonical GF, which is the "machine language" -of GF. Next time that the module Logic is needed in -compiling a grammar, it can be read from the compiled (gfc) -file instead of the source (gf) file, unless the source +

+There can also be def and data judgements in an +abstract syntax. +

+ +

Compilation of abstract syntax

+

+The GF grammar compiler expects to find the module Logic in a file named +Logic.gf. When the compiler is run, it produces +another file, named Logic.gfc. This file is in the +format called canonical GF, which is the "machine language" +of GF. Next time that the module Logic is needed in +compiling a grammar, it can be read from the compiled (gfc) +file instead of the source (gf) file, unless the source has been changed after the compilation. - - -

Concrete syntax

- +

+ +

Concrete syntax

+

In order for a GF grammar to describe a concrete language, the abstract -syntax must be completed with a concrete syntax of it. -For this purpose, we use modules of type concrete: for instance, -

-  concrete LogicEng of Logic = {
-    lincat Prop = {s : Str} ;
-    lin Conj a b = {s = a.s ++ "and" ++ b.s} ;
-    lin Disj a b = {s = a.s ++ "or"  ++ b.s} ;
-    lin Impl a b = {s = "if" ++ a.s ++ "then"  ++ b.s} ;
-    lin Falsum = {s = ["we have a contradiction"]} ;
-    }
-
-The module LogicEng is a concrete syntax of the -abstract syntax Logic. The GF grammar compiler checks that -the concrete is valid with respect to the abstract syntax of +syntax must be completed with a concrete syntax of it. +For this purpose, we use modules of type concrete: for instance, +

+
+    concrete LogicEng of Logic = {
+      lincat Prop = {s : Str} ;
+      lin Conj a b = {s = a.s ++ "and" ++ b.s} ;
+      lin Disj a b = {s = a.s ++ "or"  ++ b.s} ;
+      lin Impl a b = {s = "if" ++ a.s ++ "then"  ++ b.s} ;
+      lin Falsum = {s = ["we have a contradiction"]} ;
+      }
+
+

+The module LogicEng is a concrete syntax of the +abstract syntax Logic. The GF grammar compiler checks that +the concrete is valid with respect to the abstract syntax of which it is claimed to be. The validity requires that there has to be -

+

+ + +

Validity also requires that the linearization functions defined by -lin judgements are type-correct with respect to the +lin judgements are type-correct with respect to the linearization types of the arguments and value of the function. - -

- -There can also be lindef and printname judgements in a +

+

+There can also be lindef and printname judgements in a concrete syntax. - - -

Top-level grammar

- -When a concrete module is successfully compiled, a gfc -file is produced in the same way as for abstract modules. The -pair of an abstract and a corresponding concrete module -is a top-level grammar, which can be used in the GF system to +

+ +

Top-level grammar

+

+When a concrete module is successfully compiled, a gfc +file is produced in the same way as for abstract modules. The +pair of an abstract and a corresponding concrete module +is a top-level grammar, which can be used in the GF system to perform various tasks. The most fundamental tasks are -

+ +

In the current grammar, infinitely many trees and strings are recognized, although no very interesting ones. For example, the tree -

-  Impl (Disj Falsum Falsum) Falsum
-
+

+
+    Impl (Disj Falsum Falsum) Falsum
+
+

has the linearization -

-  if we have a contradiction or we have a contradiction then we have a contradiction
-
+

+
+    if we have a contradiction or we have a contradiction then we have a contradiction
+
+

which in turn can be parsed uniquely as that tree. - - -

Compiling top-level grammars

- -When GF compiles the module LogicEng it also has to compile -all modules that it depends on (in this case, just Logic). +

+ +

Compiling top-level grammars

+

+When GF compiles the module LogicEng it also has to compile +all modules that it depends on (in this case, just Logic). The compilation process starts with dependency analysis to find all these modules, recursively, starting from the explicitly imported one. -The compiler then reads either gf or gfc files, in +The compiler then reads either gf or gfc files, in a dependency order. The decision on which files to read depends on time stamps and dependencies in a natural way, so that all and only those modules that have to be compiled are compiled. (This behaviour can be changed with flags, see below.) - - -

Using top-level grammars

- -To use a top-level grammar in the GF system, one uses the import -command (short name i). For instance, -
-  i LogicEng.gf
-
+

+ +

Using top-level grammars

+

+To use a top-level grammar in the GF system, one uses the import +command (short name i). For instance, +

+
+    i LogicEng.gf
+
+

It is also possible to specify the imported grammar(s) on the command line when invoking GF: -

-  gf LogicEng.gf
-
-Various compilation flags can be added to both ways of compiling a module: - -Importing a grammar makes it visible in GF's internal state. To see -what modules are available, use the command print_options (po). -You can empty the state with the command empty (e); this is +

+
+    gf LogicEng.gf
+
+

+Various compilation flags can be added to both ways of compiling a module: +

+ + +

+A complete list of flags can be obtained in GF by help i. +

+

+Importing a grammar makes it visible in GF's internal state. To see +what modules are available, use the command print_options (po). +You can empty the state with the command empty (e); this is needed if you want to read in grammars with a different abstract syntax than the current one without exiting GF. - -

- +

+

Grammar modules can reside in different directories. They can then be found -by means of a search path, which is a flag such as -

-  -path=.:../prelude
-
-given to the import command or the shell command invoking GF. +by means of a search path, which is a flag such as +

+
+    -path=.:api/toplevel:prelude
+
+

+given to the import command or the shell command invoking GF. (It can also be defined in the grammar file; see below.) The compiler -writes every gfc file in the same directory as the corresponding -gf file. - -

- -Parsing and linearization can be performed with the parse -(p) and linearize (l) commands, respectively. +writes every gfc file in the same directory as the corresponding +gf file. +

+

+The path is relative to the working directory pwd, so that +all directories listed are primarily interpreted as subdirectories of +pwd. Secondarily, they are searched relative to the value of the +environment variable GF_LIB_PATH, which is by default set to +/usr/local/share/GF. +

+

+Parsing and linearization can be performed with the parse +(p) and linearize (l) commands, respectively. For instance, -

-  > l Impl (Disj Falsum Falsum) Falsum
-   if we have a contradiction or we have a contradiction then we have a contradiction
-
-  > p -cat=Prop "we have a contradiction"
-  Falsum
-
-Notice that the parse command needs the parsing category +

+
+    > l Impl (Disj Falsum Falsum) Falsum
+     if we have a contradiction or we have a contradiction then we have a contradiction
+  
+    > p -cat=Prop "we have a contradiction"
+    Falsum
+
+

+Notice that the parse command needs the parsing category as a flag. This necessary since a grammar can have several possible parsing categories ("entry points"). - - - -

Multilingual grammar

- -One abstract syntax can have several concrete syntaxes. -Here are two new ones for Logic: -
-  concrete LogicFre of Logic = {
-    lincat Prop = {s : Str} ;
-    lin Conj a b = {s = a.s ++ "et" ++ b.s} ;
-    lin Disj a b = {s = a.s ++ "ou"  ++ b.s} ;
-    lin Impl a b = {s = "si" ++ a.s ++ "alors"  ++ b.s} ;
-    lin Falsum = {s = ["nous avons une contradiction"]} ;
-    }
-
-  concrete LogicSymb of Logic = {
-    lincat Prop = {s : Str} ;
-    lin Conj a b = {s = "(" ++ a.s ++ "&" ++ b.s ++ ")"} ;
-    lin Disj a b = {s = "(" ++ a.s ++ "v" ++ b.s ++ ")"} ;
-    lin Impl a b = {s = "(" ++ a.s ++ "->" ++ b.s ++ ")"} ;
-    lin Falsum = {s = "_|_"} ;
-    }
-
-The four modules Logic, LogicEng, LogicFre, and -LogicSymb together form a multilingual grammar, in which +

+ +

Multilingual grammar

+

+One abstract syntax can have several concrete syntaxes. +Here are two new ones for Logic: +

+
+    concrete LogicFre of Logic = {
+      lincat Prop = {s : Str} ;
+      lin Conj a b = {s = a.s ++ "et" ++ b.s} ;
+      lin Disj a b = {s = a.s ++ "ou"  ++ b.s} ;
+      lin Impl a b = {s = "si" ++ a.s ++ "alors"  ++ b.s} ;
+      lin Falsum = {s = ["nous avons une contradiction"]} ;
+      }
+  
+    concrete LogicSymb of Logic = {
+      lincat Prop = {s : Str} ;
+      lin Conj a b = {s = "(" ++ a.s ++ "&" ++ b.s ++ ")"} ;
+      lin Disj a b = {s = "(" ++ a.s ++ "v" ++ b.s ++ ")"} ;
+      lin Impl a b = {s = "(" ++ a.s ++ "->" ++ b.s ++ ")"} ;
+      lin Falsum = {s = "_|_"} ;
+      }
+
+

+The four modules Logic, LogicEng, LogicFre, and +LogicSymb together form a multilingual grammar, in which it is possible to perform parsing and linearization with respect to any of the concrete syntaxes. As a combination of parsing and linearization, -one can also perform translation from one language to another. -(By language we mean the set of expressions generated by one +one can also perform translation from one language to another. +(By language we mean the set of expressions generated by one concrete syntax.) - - -

Using multilingual grammars

- +

+ +

Using multilingual grammars

+

Any combination of abstract syntax and corresponding concrete syntaxes is thus a multilingual grammar. With many languages and other enrichments (as described below), a multilingual grammar easily grows to the size of tens of modules. The grammar developer, having finished her job, can -package the result in a multilingual canonical grammar, a file -with the suffix .gfcm. For instance, to compile the set of grammars +package the result in a multilingual canonical grammar, a file +with the suffix .gfcm. For instance, to compile the set of grammars described by now, the following sequence of GF commands can be used: -

-  i LogicEng.gf
-  i LogicFre.gf
-  i LogicSymb.gf
-  pm | wf logic.gfcm
-
-The "end user" of the grammar only needs the file logic.gfcm to +

+
+    i LogicEng.gf
+    i LogicFre.gf
+    i LogicSymb.gf
+    pm | wf logic.gfcm
+
+

+The "end user" of the grammar only needs the file logic.gfcm to access all the functionality of the multilingual grammar. It can be -imported in the GF system in the same way as .gf files. But -it can also be used in the Embedded Java Interpreter for GF to -build Java programs of which the multilingual grammar functionalities +imported in the GF system in the same way as .gf files. But +it can also be used in the +Embedded Java Interpreter for GF +to build Java programs of which the multilingual grammar functionalities (linearization, parsing, translation) form a part. - -

- +

+

In a multilingual grammar, the concrete syntax module names work as names of languages that can be selected for linearization and parsing: -

-  > l -lang=LogicFre Impl Falsum Falsum
-  si nous avons une contradiction alors nous avons une contradiction
-
-  > l -lang=LogicSymb Impl Falsum Falsum
-  ( _|_ -> _|_ )
-
-  > p -cat=Prop -lang=LogicSymb "( _|_ & _|_ )"
-  Conj Falsum Falsum
-
-The option -multi gives linearization to all languages: -
-  > l -multi Impl Falsum Falsum
-  if we have a contradiction then we have a contradiction
-  si nous avons une contradiction alors nous avons une contradiction
-  ( _|_ -> _|_ )
-
-Translation can be obtained by using a pipe from a parser +

+
+    > l -lang=LogicFre Impl Falsum Falsum
+    si nous avons une contradiction alors nous avons une contradiction
+  
+    > l -lang=LogicSymb Impl Falsum Falsum
+    ( _|_ -> _|_ )
+  
+    > p -cat=Prop -lang=LogicSymb "( _|_ & _|_ )"
+    Conj Falsum Falsum
+
+

+The option -multi gives linearization to all languages: +

+
+    > l -multi Impl Falsum Falsum
+    if we have a contradiction then we have a contradiction
+    si nous avons une contradiction alors nous avons une contradiction
+    ( _|_ -> _|_ )
+
+

+Translation can be obtained by using a pipe from a parser to a linearizer: -

-  > p -cat=Prop -lang=LogicSymb "( _|_ & _|_ )" | l -lang=LogicEng
-  if we have a contradiction then we have a contradiction
-
- - -

Exercise

- -Write yet another concrete syntax of Logic, for -a language or symbolic notation of your choice. - - -

Resource modules

- -The concrete modules shown above would look much nicer if +

+
+    > p -cat=Prop -lang=LogicSymb "( _|_ & _|_ )" | l -lang=LogicEng
+    if we have a contradiction then we have a contradiction
+
+

+ +

Resource modules

+

+The concrete modules shown above would look much nicer if we used the main idea of functional programming: avoid repetitive -code by using functions that capture repeated patterns of +code by using functions that capture repeated patterns of expressions. A collection of such functions can be a valuable -resource for a programmer, reusable in many different -top-level grammars. Thus we introduce the resource +resource for a programmer, reusable in many different +top-level grammars. Thus we introduce the resource module type, with the first example -

-  resource Util = {
-    oper SS : Type = {s : Str} ;
-    oper ss : Str -> SS = \s -> {s = s} ;
-    oper paren : Str -> Str = \s -> "(" ++ s ++ ")" ;
-    oper infix : Str -> SS -> SS -> SS = \h,x,y ->
-      ss (x.s ++ h ++ y.s) ;
-    oper infixp : Str -> SS -> SS -> SS = \h,x,y ->
-      ss (paren (infix h x y)) ;
-    }
-
-Modules of resource type have two forms of judgement: - -A resource can be used in a concrete (or another -resource) by opening it. This means that +

+
+    resource Util = {
+      oper SS : Type = {s : Str} ;
+      oper ss : Str -> SS = \s -> {s = s} ;
+      oper paren : Str -> Str = \s -> "(" ++ s ++ ")" ;
+      oper infix : Str -> SS -> SS -> SS = \h,x,y ->
+        ss (x.s ++ h ++ y.s) ;
+      oper infixp : Str -> SS -> SS -> SS = \h,x,y ->
+        ss (paren (infix h x y)) ;
+      }
+
+

+Modules of resource type have two forms of judgement: +

+ + +

+A resource can be used in a concrete (or another +resource) by opening it. This means that all operations (and parameter types) defined in the resource module become usable in module that opens it. For instance, -we can rewrite the module LogicSymb much more concisely: -

-  concrete LogicSymb of Logic = open Util in {
-    lincat Prop = SS ;
-    lin Conj = infixp "&" ;
-    lin Disj = infixp "v" ;
-    lin Impl = infixp "->" ;
-    lin Falsum = ss "_|_" ;
-    }
-
-What happens when this variant of LogicSymb is -compiled is that the oper-defined constants -of Util are inlined in the -right-hand-sides of the judgements of LogicSymb, -and these expressions are partially evaluated, i.e. -computed as far as possible. The generated gfc file +we can rewrite the module LogicSymb much more concisely: +

+
+    concrete LogicSymb of Logic = open Util in {
+      lincat Prop = SS ;
+      lin Conj = infixp "&" ;
+      lin Disj = infixp "v" ;
+      lin Impl = infixp "->" ;
+      lin Falsum = ss "_|_" ;
+      }
+
+

+What happens when this variant of LogicSymb is +compiled is that the oper-defined constants +of Util are inlined in the +right-hand-sides of the judgements of LogicSymb, +and these expressions are partially evaluated, i.e. +computed as far as possible. The generated gfc file will look just like the file generated for the first version -of LogicSymb - at least, it will do the same job. - -

- -Several resource modules can be opened +of LogicSymb - at least, it will do the same job. +

+

+Several resource modules can be opened at the same time. If the modules contain same names, the -conflict can be resolved by qualified opening and +conflict can be resolved by qualified opening and reference. For instance, -

-  concrete LogicSymb of Logic = open Util, Prelude in { ...
-    } ;
-
-(where Prelude is a standard library of GF) brings -into scope two definitions of the constant SS. +

+
+    concrete LogicSymb of Logic = open Util, Prelude in { ...
+      } ;
+
+

+(where Prelude is a standard library of GF) brings +into scope two definitions of the constant SS. To specify which one is used, you can write -Util.SS or Prelude.SS instead of just SS. +Util.SS or Prelude.SS instead of just SS. You can also introduce abbreviations to avoid long qualifiers, e.g. -

-  concrete LogicSymb of Logic = open (U=Util), (P=Prelude) in { ...
-    } ;
-
-which means that you can write U.SS and P.SS. - - -

Compiling resource modules

- -The compilation of a resource module differs -from the compilation of abstract and -concrete modules because oper operations -do not in general have values in gfc. A gfc -file is generated, but it contains only -param judgements (also recall that opers +

+
+    concrete LogicSymb of Logic = open (U=Util), (P=Prelude) in { ...
+      } ;
+
+

+which means that you can write U.SS and P.SS. +

+

+Judgements of param and oper forms may also be used +in concrete modules, and they are then considered local +to those modules, i.e. they are not exported. +

+ +

Compiling resource modules

+

+The compilation of a resource module differs +from the compilation of abstract and +concrete modules because oper operations +do not in general have values in gfc. A gfc +file is generated, but it contains only +param judgements (also recall that opers are inlined in their top-level use sites, so it is not necessary to save them in the compiled grammar). However, since computing the operations over and over again can be time comsuming, and since type checking -resource modules also takes time, a third kind -of file is generated for resource modules: a .gfr +resource modules also takes time, a third kind +of file is generated for resource modules: a .gfr file. This file is written in the GF source code notation, -but it is type checked and type annotated, and opers +but it is type checked and type annotated, and opers are computed as far as possible. - -

- -If you look at any gfc or gfr file generated +

+

+If you look at any gfc or gfr file generated by the GF compiler, you see that all names have been replaced by their qualified variants. This is an important first step (after parsing) the compiler does. As for the commands in the GF shell, some output qualified names and some not. The difference does not always result from firm principles. - - -

Using resource modules

- -The typical use is through open in a -concrete module, which means that -resource modules are not imported on their own. +

+ +

Using resource modules

+

+The typical use is through open in a +concrete module, which means that +resource modules are not imported on their own. However, in the developing and testing phase of grammars, it -can be useful to evaluate opers with different +can be useful to evaluate opers with different arguments. To prevent them from being thrown away after inlining, the --retain option can be used: -

-  > i -retain Util.gf
-
-The command compute_concrete (cc) +-retain option can be used: +

+
+    > i -retain Util.gf
+
+

+The command compute_concrete (cc) can now be used for evaluating expressions that may contain -operations defined in Util: -

-  > cc ss (paren "foo")
-  {s = "(" ++ "foo" ++ ")"}
-
-To find out what opers are available for a given type, -the command show_operations (so) can be used: -
-  > so SS
-  Util.ss : Str -> SS ;
-  Util.infix : Str -> SS -> SS -> SS ;
-  Util.infixp : Str -> SS -> SS -> SS ;
-
- - -

Exercise

- -Rewrite the modules LogicEng and LogicFre -by making use of the resource. - - -

Inheritance

- +operations defined in Util: +

+
+    > cc ss (paren "foo")
+    {s = "(" ++ "foo" ++ ")"}
+
+

+To find out what opers are available for a given type, +the command show_operations (so) can be used: +

+
+    > so SS
+    Util.ss : Str -> SS ;
+    Util.infix : Str -> SS -> SS -> SS ;
+    Util.infixp : Str -> SS -> SS -> SS ;
+
+

+ +

Inheritance

+

The most characteristic modularity of GF lies in the division of -grammars into abstract, concrete, and -resource modules. This permits writing multilingual +grammars into abstract, concrete, and +resource modules. This permits writing multilingual grammar and sharing the maximum of code between different languages. - -

- -In addition to this special kind of modularity, GF provides inheritance, +

+

+In addition to this special kind of modularity, GF provides inheritance, which is familiar from other programming languages (in particular, object-oriented ones). Inheritance means that a module inherits all -judgements from another module; we also say that it extends +judgements from another module; we also say that it extends the other module. Inheritance is useful to divide big grammars into smaller units, and also to reuse the same units in different bigger grammars. - -

- +

+

The first example of inheritance is for abstract syntax. Let us -extend the module Logic to Arithmetic: -

-  abstract Arithmetic = Logic ** {
-    cat Nat ;
-    fun Even : Nat -> Prop ;
-    fun Odd  : Nat -> Prop ;
-    fun Zero : Nat ;
-    fun Succ : Nat -> Nat ;
-    }
-
+extend the module Logic to Arithmetic: +

+
+    abstract Arithmetic = Logic ** {
+      cat Nat ;
+      fun Even : Nat -> Prop ;
+      fun Odd  : Nat -> Prop ;
+      fun Zero : Nat ;
+      fun Succ : Nat -> Nat ;
+      }
+
+

In parallel with the extension of the abstract syntax -Logic to Arithmetic, we can extend -the concrete syntax LogicEng to ArithmeticEng: -

-  concrete ArithmeticEng of Arithmetic = LogicEng ** open Util in {
-    lincat Nat = SS ;
-    lin Even x = ss (x.s ++ "is" ++ "even") ;
-    lin Odd x = ss (x.s ++ "is" ++ "odd") ;
-    lin Zero = ss "zero" ;
-    lin Succ x = ss ("the" ++ "successor" ++ "of" ++ x.s) ;
-    }
-
-Another extension of Logic is Geometry, -
-  abstract Geometry = Logic ** {
-    cat Point ;
-    cat Line ;
-    fun Incident : Point -> Line -> Prop ;
-    }
-
+Logic to Arithmetic, we can extend +the concrete syntax LogicEng to ArithmeticEng: +

+
+    concrete ArithmeticEng of Arithmetic = LogicEng ** open Util in {
+      lincat Nat = SS ;
+      lin Even x = ss (x.s ++ "is" ++ "even") ;
+      lin Odd x = ss (x.s ++ "is" ++ "odd") ;
+      lin Zero = ss "zero" ;
+      lin Succ x = ss ("the" ++ "successor" ++ "of" ++ x.s) ;
+      }
+
+

+Another extension of Logic is Geometry, +

+
+    abstract Geometry = Logic ** {
+      cat Point ;
+      cat Line ;
+      fun Incident : Point -> Line -> Prop ;
+      }
+
+

The corresponding concrete syntax is left as exercise. - -

- -Inheritance can be multiple, which means that a module +

+ +

Multiple inheritance

+

+Inheritance can be multiple, which means that a module may extend many modules at the same time. Suppose, for instance, that we want to build a module for mathematics covering both arithmetic and geometry, and the underlying logic. We then write -

-  abstract Mathematics = Arithmetic, Geometry ** {
-    } ;
-
+

+
+    abstract Mathematics = Arithmetic, Geometry ** {
+      } ;
+
+

We could of course add some new judgements in this module, but -it is not necessary to do so. - -

- -The module Mathematics also shows that it is possibe +it is not necessary to do so. If no new judgements are added, the +module body can be omitted: +

+
+    abstract Mathematics = Arithmetic, Geometry ;
+
+

+

+The module Mathematics shows that it is possibe to extend a module already built by extension. The correctness criterion for extensions is that the same name -(cat, fun, oper, or param) +(cat, fun, oper, or param) may not be defined twice in the resulting union of names. -That the names defined in Logic are "inherited twice" -by Mathematics (via both Arithmetic and -Geometry) is no violation of this rule; the usual +That the names defined in Logic are "inherited twice" +by Mathematics (via both Arithmetic and +Geometry) is no violation of this rule; the usual problems of multiple inheritance do not arise, since the definitions of inherited constants cannot be changed. - - -

Compiling inheritance

- +

+ +

Restricted inheritance

+

+Inheritance can be restricted, which means that only some of +the constants are inherited. There are two dual notations for this: +

+
+    A [f,g]
+
+

+meaning that only f and g are inherited from A, and +

+
+    A-[f,g]
+
+

+meaning that everything except f is g are inherited from A. +

+

+Constants that are not inherited may be redefined in the inheriting module. +

+ +

Compiling inheritance

+

Inherited judgements are not copied into the inheriting modules. -Instead, an indirection is created for each inherited name, -as can be seen by looking into the generated gfc (and -gfr) files. Thus for instance the names -

-  Mathematics.Prop  Arithmetic.Prop  Geometry.Prop Logic.Prop
-
+Instead, an indirection is created for each inherited name, +as can be seen by looking into the generated gfc (and +gfr) files. Thus for instance the names +

+
+    Mathematics.Prop  Arithmetic.Prop  Geometry.Prop Logic.Prop
+
+

all refer to the same category, declared in the module -Logic. - - - -

Inspecting grammar hierarchies

- -The command visualize_graph (vg) shows the +Logic. +

+ +

Inspecting grammar hierarchies

+

+The command visualize_graph (vg) shows the dependency graph in the current GF shell state. The graph can also be saved in a file and used e.g. in documentation, by the -command print_multi -graph (pm -graph). - - -

Reuse of top-level grammars as resources

- +command print_multi -graph (pm -graph). +

+

+The vg command uses the free software packages Graphviz (commad dot) +and Ghostscript (command gv). +

+ +

Reuse of top-level grammars as resources

+

Top-level grammars have a straightforward translation to -resource modules. The translation concerns +resource modules. The translation concerns pairs of abstract-concrete judgements: -

-  cat C ;               ===>  oper C : Type = T ;
-  lincat C = T ;
-
-  fun f : A ;           ===>  oper f : A = t ;
-  lin f = t ;
-
-Due to this translation, a concrete module -can be opened in the same way as a -resource module; the translation is done +

+
+    cat C ;               ===>  oper C : Type = T ;
+    lincat C = T ;
+  
+    fun f : A ;           ===>  oper f : A = t ;
+    lin f = t ;
+
+

+Due to this translation, a concrete module +can be opened in the same way as a +resource module; the translation is done on the fly (it is computationally very cheap). - -

- +

+

Modular grammar engineering often means that some grammarians focus on the semantics of the domain whereas others take care of linguistic details. Thus a typical reuse opens a -linguistically oriented resource grammar, -

-  abstract Resource = {
-    cat S ; NP ; A ;
-    fun PredA : NP -> A -> S ;
-    }
-  concrete ResourceEng of Resource = {
-    lincat S = ... ; 
-    lin PredA = ... ;
-    }
-
-The application grammar, instead of giving linearizations +linguistically oriented resource grammar, +

+
+    abstract Resource = {
+      cat S ; NP ; A ;
+      fun PredA : NP -> A -> S ;
+      }
+    concrete ResourceEng of Resource = {
+      lincat S = ... ; 
+      lin PredA = ... ;
+      }
+
+

+The application grammar, instead of giving linearizations explicitly, just reduces them to categories and functions in the resource grammar: -

-  concrete ArithmeticEng of Arithmetic = LogicEng ** open ResourceEng in {
-    lincat Nat = NP ;
-    lin Even x = PredA x (regA "even") ;
-    }
-
+

+
+    concrete ArithmeticEng of Arithmetic = LogicEng ** open ResourceEng in {
+      lincat Nat = NP ;
+      lin Even x = PredA x (regA "even") ;
+      }
+
+

If the resource grammar is only capable of generating grammatically correct expressions, then the grammaticality of the application grammar is also guaranteed: the type checker of GF is used as @@ -588,382 +727,457 @@ grammar checker. To guarantee distinctions between categories that have the same linearization type, the actual translation used in GF adds to every linearization type and linearization -a lock field, -

-  cat C ;                    ===>  oper C : Type = T ** {lock_C : {}} ;
-  lincat C = T ;
-
-  fun f : C_1 ... C_n -> C ; ===>  oper f : C_1 ... C_n -> C = \x_1,...,x_n -> 
-  lin f = t ;                        t x_1 ... x_n ** {lock_C = <>};
-
+a lock field, +

+
+    cat C ;                    ===>  oper C : Type = T ** {lock_C : {}} ;
+    lincat C = T ;
+  
+    fun f : C_1 ... C_n -> C ; ===>  oper f : C_1 ... C_n -> C = \x_1,...,x_n -> 
+    lin f = t ;                        t x_1 ... x_n ** {lock_C = &lt;>};
+
+

(Notice that the latter translation is type-correct because of -record subtyping, which means that t can ignore the +record subtyping, which means that t can ignore the lock fields of its arguments.) An application grammarian who only uses resource grammar categories and functions never needs to write these lock fields herself. Having to do so serves as a warning that the grammaticality guarantee given by the resource grammar no longer holds. - - -

Additional module types

- -

Interfaces, instances, and incomplete grammars

- -One difference between top-level grammars and resource +

+

+Note. The lock field mechanism is experimental, and may be changed +to a stronger abstraction mechnism in the future. This may result in +hand-written lock fields ceasing to work. +

+ +

Additional module types

+ +

Interfaces, instances, and incomplete grammars

+

+One difference between top-level grammars and resource modules is that the former systematically separete the declarations of categories and functions from their definitions. -In the reuse translation creating and oper judgement, -the declaration coming from the abstract module is put -together with the definition coming from the concrete +In the reuse translation creating and oper judgement, +the declaration coming from the abstract module is put +together with the definition coming from the concrete module. - -

- +

+

However, the separation of declarations and definitions is so useful a notion that GF also has specific modules types that -resource modules into two parts. In this splitting, -an interface module corresponds to an abstract syntax, +resource modules into two parts. In this splitting, +an interface module corresponds to an abstract syntax, in giving the declarations of operations (and parameter types). For instance, a generic markup interface would look as follows: -

-  interface Markup = open Util in {
-    oper Boldface : Str -> Str ;
-    oper Heading  : Str -> Str ;
-    oper markupSS : (Str -> Str) -> SS -> SS = \f,r ->
-      ss (f r.s) ;
-    } 
-
-The definitions of the constants declared in an interface -are given in an instance module (which is always of -an interface, in the same way as a concrete is always -of an abstract). The following instances +

+
+    interface Markup = open Util in {
+      oper Boldface : Str -> Str ;
+      oper Heading  : Str -> Str ;
+      oper markupSS : (Str -> Str) -> SS -> SS = \f,r ->
+        ss (f r.s) ;
+      } 
+
+

+The definitions of the constants declared in an interface +are given in an instance module (which is always of +an interface, in the same way as a concrete is always +of an abstract). The following instances define markup in HTML and latex. -

-  instance MarkupHTML of Markup = open Util in {
-    oper Boldface s = "<b>" ++ s ++ "</b>" ; 
-    oper Heading  s = "<h2>" ++ s ++ "</h2>" ; 
-    } 
-
-  instance MarkupLatex of Markup = open Util in {
-    oper Boldface s = "\\textbf{" ++ s ++ "}" ; 
-    oper Heading  s = "\\section{" ++ s ++ "}" ; 
-    } 
-
-Notice that both interfaces and instances may -open resources (and also reused top-level grammars). -An interface may moreover define some of the operations it +

+
+    instance MarkupHTML of Markup = open Util in {
+      oper Boldface s = "&lt;b>" ++ s ++ "&lt;/b>" ; 
+      oper Heading  s = "&lt;h2>" ++ s ++ "&lt;/h2>" ; 
+      } 
+  
+    instance MarkupLatex of Markup = open Util in {
+      oper Boldface s = "\\textbf{" ++ s ++ "}" ; 
+      oper Heading  s = "\\section{" ++ s ++ "}" ; 
+      } 
+
+

+Notice that both interfaces and instances may +open resources (and also reused top-level grammars). +An interface may moreover define some of the operations it declares; these definitions are inherited by all instances and cannot be changed in them. Inheritance by module extension is possible, as always, between modules of the same type. - - -

Using an interface

- -An interface or an instance -can be opened in -a concrete using the same syntax as when opening -a resource. For an instance, the semantics +

+ +

Using an interface

+

+An interface or an instance +can be opened in +a concrete using the same syntax as when opening +a resource. For an instance, the semantics is the same as when opening the definitions together with -the type signatures - one can think of an interface -and an instance of it together forming an ordinary -resource. Opening an interface, however, +the type signatures - one can think of an interface +and an instance of it together forming an ordinary +resource. Opening an interface, however, is different: functions that are only declared without having a definition cannot be compiled (inlined); neither can functions whose definitions depend on undefined functions. - -

- -A module that opens an interface is therefore -incomplete, and has to be completed with an -instance of the interface to become complete. To make +

+

+A module that opens an interface is therefore +incomplete, and has to be completed with an +instance of the interface to become complete. To make this situation clear, GF requires any module that opens an -interface to be marked as incomplete. Thus +interface to be marked as incomplete. Thus the module -

-  incomplete concrete DocMarkup of Doc = open Markup in {
-    ...
-    }
-
-uses the interface Markup to place markup in +

+
+    incomplete concrete DocMarkup of Doc = open Markup in {
+      ...
+      }
+
+

+uses the interface Markup to place markup in chosen places in its linearization rules, but the implementation of markup - whether in HTML or in LaTeX - is left unspecified. This is a powerful way of sharing the code of a whole module with just differences in the definitions of some constants. - -

- -Another terminology for incomplete modules is -parametrized modules or functors. -The interface gives the list of parameters +

+

+Another terminology for incomplete modules is +parametrized modules or functors. +The interface gives the list of parameters that the functor depends on. - - -

Instantiating an interface

- -To complete an incomplete module, each inteface -that it opens has to be provided an instance. The following +

+ +

Instantiating an interface

+

+To complete an incomplete module, each inteface +that it opens has to be provided an instance. The following syntax is used for this: -

-  concrete DocHTML of Doc = DocMarkup with (Markup = MarkupHTML) ;
-
-Instantiation of Markup with MarkupLatex is +

+
+    concrete DocHTML of Doc = DocMarkup with (Markup = MarkupHTML) ;
+
+

+Instantiation of Markup with MarkupLatex is another one-liner. - -

- +

+

If more interfaces than one are instantiated, a comma-separated list of equations in parentheses is used, e.g. -

-  concrete RulesIta = CategoriesIta ** RulesRomance with
-    (TypesRomance = TypesIta), (SyntaxRomance = SyntaxIta) ;
-
-(an example from the GF resource grammar library, where languages for -Romance languages share two interfaces). -All interfaces that are opened in the completed model +

+
+    concrete MusicIta = MusicI with
+      (Syntax = SyntaxIta), (LexMusic = LexMusicIta) ;
+
+

+This example shows a common design pattern for building applications: +the concrete syntax is a functor on the generic resource grammar library +interface Syntax and a domain-specific lexicon interface, here +LexMusic. +

+

+All interfaces that are opened in the completed model must be completed. - -

- -Notice that the completion of an incomplete module +

+

+Notice that the completion of an incomplete module may at the same time extend modules of the same type (which need -not be completions). But it cannot add new judgements. - - -

Compiling interfaces, instances, and parametrized modules

- +not be completions). It can also add new judgements in a module body, +and restrict inheritance from the functor. +

+
+    concrete MusicIta = MusicI - [f] with
+      (Syntax = SyntaxIta), (LexMusic = LexMusicIta) ** {
+  
+    lin f = ...
+  
+    } ;
+
+

+ +

Compiling interfaces, instances, and parametrized modules

+

Interfaces, instances, and parametric modules are purely a front-end feature of GF: these module types do not exist in -the gfc and gfr formats. The compiler has +the gfc and gfr formats. The compiler has nevertheless to keep track of their dependencies and modification times. Here is a summary of how they are compiled: -

+

+This means that some generated code is duplicated, because those operations that +do have complete definitions in an interface are copied to each of +the instances. +

+ +

Summary of module syntax and semantics

+ +

Abstract syntax modules

+

Syntax: -

-abstract A = (A1,...,An **)? -{J1 ; ... ; Jm ; } - -

- +

+

+abstract A = (A1,...,An **)? +{J1 ; ... ; Jm ; } +

+

where -

+

+ + +

Semantic conditions: -

- -

Concrete syntax modules

- +

+ + + +

Concrete syntax modules

+

Syntax: -

-incomplete? concrete C of A = -(C1,...,Cn **)? -(open O1,...,Ok in)? -{J1 ; ... ; Jm ; } - -

- +

+

+incomplete? concrete C of A = +(C1,...,Cn **)? +(open O1,...,Ok in)? +{J1 ; ... ; Jm ; } +

+

where -

- -

- -If the modifier incomplete appears, then any R in -an open specification may also be an interface. - -

- +

+ + +

+ where R is a resource, instance, or concrete, and Q is any identifier +

+ + +

+If the modifier incomplete appears, then any R in +an open specification may also be an interface or an abstract. +

+

Semantic conditions: -

+ + +

Resource modules

+

Syntax: -

-resource R = -(R1,...,Rn **)? -(open O1,...,Ok in)? -{J1 ; ... ; Jm ; } - -

+

+

+resource R = +(R1,...,Rn **)? +(open O1,...,Ok in)? +{J1 ; ... ; Jm ; } +

+

where -

- -

- +

+ + +

+ where P is a resource, instance, or concrete, and Q is any identifier +

+ + +

Semantic conditions: -

- - -

Interface modules

- +

+ + + +

Interface modules

+

Syntax: -

-interface R = -(R1,...,Rn **)? -(open O1,...,Ok in)? -{J1 ; ... ; Jm ; } - -

+

+

+interface R = +(R1,...,Rn **)? +(open O1,...,Ok in)? +{J1 ; ... ; Jm ; } +

+

where -

- -

- +

+ + +

+ where P is a resource, instance, or concrete, and Q is any identifier +

+ + +

Semantic conditions: -

- - - -

Instance modules

- +

+ + + +

Instance modules

+

Syntax: -

-instance R of I = -(R1,...,Rn **)? -(open O1,...,Ok in)? -{J1 ; ... ; Jm ; } - -

+

+

+instance R of I = +(R1,...,Rn **)? +(open O1,...,Ok in)? +{J1 ; ... ; Jm ; } +

+

where -

- -

- +

+ + +

+ where P is a resource, instance, or concrete, and Q is any identifier +

+ + +

Semantic conditions: -

- - -

Instantiated concrete syntax modules

- +

+ + + +

Instantiated concrete syntax modules

+

Syntax: -

-concrete C of A = -(C1,...,Cn **)? +

+

+concrete C of A = +(C1,...,Cn **)? B -with -(I1 =J1), ... -, (Im =Jm) ; - -

- +with +(I1 =J1), ... +, (Ip =Jp) +(-? [c1,...,cq ])? +(**? +(open O1,...,Ok in)? +{J1 ; ... ; Jm ; })? ; +

+

where -

- - - - +

+ + +

+ where R is a resource, instance, or concrete, and Q is any identifier +

+ + + + + + -- cgit v1.2.3