German numerals and coordination

2026-04-30 14:52:51 -06:00 · 2006-01-05 21:37:53 +00:00
parent 37cfc1b012
commit 258e6e3aa9
8 changed files with 103 additions and 78 deletions
--- a/lib/resource-1.0/german/ConjunctionGer.gf
+++ b/lib/resource-1.0/german/ConjunctionGer.gf
@@ -1,45 +1,45 @@
 concrete ConjunctionGer of Conjunction = 
  CatGer ** open ResGer, Coordination, Prelude in {
--
--  flags optimize=all_subs ;
--
--  lin
--
--    ConjS = conjunctSS ;
--    DConjS = conjunctDistrSS ;
--
--    ConjAdv = conjunctSS ;
--    DConjAdv = conjunctDistrSS ;
--
--    ConjNP conj ss = conjunctTable Case conj ss ** {
--      a = {n = conjNumber conj.n ss.a.n ; p = ss.a.p}
--      } ;
--    DConjNP conj ss = conjunctDistrTable Case conj ss ** {
--      a = {n = conjNumber conj.n ss.a.n ; p = ss.a.p}
--      } ;
--
--    ConjAP conj ss = conjunctTable Agr conj ss ** {
--      isPre = ss.isPre
--      } ;
--    DConjAP conj ss = conjunctDistrTable Agr conj ss ** {
--      isPre = ss.isPre
--      } ;
--
---- These fun's are generated from the list cat's.
--
--    BaseS = twoSS ;
--    ConsS = consrSS comma ;
--    BaseAdv = twoSS ;
--    ConsAdv = consrSS comma ;
--    BaseNP x y = twoTable Case x y ** {a = conjAgr x.a y.a} ;
--    ConsNP xs x = consrTable Case comma xs x ** {a = conjAgr xs.a x.a} ;
--    BaseAP x y = twoTable Agr x y ** {isPre = andB x.isPre y.isPre} ;
--    ConsAP xs x = consrTable Agr comma xs x ** {isPre = andB xs.isPre x.isPre} ;
--
--  lincat
--    [S] = {s1,s2 : Str} ;
--    [Adv] = {s1,s2 : Str} ;
--    [NP] = {s1,s2 : Case => Str ; a : Agr} ;
--    [AP] = {s1,s2 : Agr => Str ; isPre : Bool} ;
--
+
+  flags optimize=all_subs ;
+
+  lin
+
+    ConjS conj ss =  conjunctTable Order conj ss ;
+    DConjS conj ss = conjunctDistrTable Order conj ss ;
+
+    ConjAdv conj ss = conjunctSS conj ss ;
+    DConjAdv conj ss = conjunctDistrSS conj ss ;
+
+    ConjNP conj ss = conjunctTable Case conj ss ** {
+      a = {n = conjNumber conj.n ss.a.n ; p = ss.a.p}
+      } ;
+    DConjNP conj ss = conjunctDistrTable Case conj ss ** {
+      a = {n = conjNumber conj.n ss.a.n ; p = ss.a.p}
+      } ;
+
+    ConjAP conj ss = conjunctTable AForm conj ss ** {
+      isPre = ss.isPre
+      } ;
+    DConjAP conj ss = conjunctDistrTable AForm conj ss ** {
+      isPre = ss.isPre
+      } ;
+
+-- These fun's are generated from the list cat's.
+
+    BaseS = twoTable Order ;
+    ConsS = consrTable Order comma ;
+    BaseAdv = twoSS ;
+    ConsAdv = consrSS comma ;
+    BaseNP x y = twoTable Case x y ** {a = conjAgr x.a y.a} ;
+    ConsNP xs x = consrTable Case comma xs x ** {a = conjAgr xs.a x.a} ;
+    BaseAP x y = twoTable AForm x y ** {isPre = andB x.isPre y.isPre} ;
+    ConsAP xs x = consrTable AForm comma xs x ** {isPre = andB xs.isPre x.isPre} ;
+
+  lincat
+    [S] = {s1,s2 : Order => Str} ;
+    [Adv] = {s1,s2 : Str} ;
+    [NP] = {s1,s2 : Case => Str ; a : Agr} ;
+    [AP] = {s1,s2 : AForm => Str ; isPre : Bool} ;
+
 }