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gf-core/lib/resource/german/NounGer.gf

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concrete NounGer of Noun = CatGer ** open ResGer, Prelude in {
flags optimize=all_subs ;
lin
DetCN det cn = {
s = \\c => det.s ! cn.g ! c ++ cn.s ! adjfCase det.a c ! det.n ! c ;
a = agrP3 det.n ;
isPron = False
} ;
DetNP det = {
s = \\c => det.s ! Neutr ! c ; ---- genders
a = agrP3 det.n ;
isPron = False
} ;
UsePN pn = pn ** {a = agrP3 Sg} ;
UsePron pron = {
s = \\c => pron.s ! NPCase c ;
a = pron.a
} ;
PredetNP pred np = {
s = \\c => pred.s ! np.a.n ! Masc ! c ++ np.s ! c ; ---- g
a = np.a
} ;
PPartNP np v2 = {
s = \\c => np.s ! c ++ v2.s ! VPastPart APred ; --- invar part
a = np.a
} ;
AdvNP np adv = {
s = \\c => np.s ! c ++ adv.s ;
a = np.a
} ;
DetQuantOrd quant num ord =
let
n = num.n ;
a = quant.a
in {
s = \\g,c => quant.s ! n ! g ! c ++
num.s!g!c ++ ord.s ! agrAdj g (adjfCase a c) n c ;
n = n ;
a = a
} ;
DetQuant quant num =
let
n = num.n ;
a = quant.a
in {
s = \\g,c => quant.s ! n ! g ! c ++ num.s!g!c ;
n = n ;
a = a
} ;
DetArtOrd quant num ord =
let
n = num.n ;
a = quant.a
in {
s = \\g,c => quant.s ! num.isNum ! n ! g ! c ++
num.s!g!c ++ ord.s ! agrAdj g (adjfCase a c) n c ;
n = n ;
a = a
} ;
DetArtCard quant num =
let
n = num.n ;
a = quant.a
in {
s = \\g,c => quant.s ! True ! n ! g ! c ++
num.s!g!c ;
n = n ;
a = a
} ;
DetArtPl det cn = {
s = \\c => det.s ! False ! Pl ! cn.g ! c ++ cn.s ! adjfCase det.a c ! Pl ! c ;
a = agrP3 Pl ;
isPron = False
} ;
DetArtSg det cn = {
s = \\c => det.s ! False ! Sg ! cn.g ! c ++ cn.s ! adjfCase det.a c ! Sg ! c ;
a = agrP3 Sg ;
isPron = False
} ;
PossPron p = {
s = \\n,g,c => p.s ! NPPoss (gennum g n) c ;
a = Strong --- need separately weak for Pl ?
} ;
NumCard n = n ** {isNum = True} ;
NumPl = {s = \\g,c => []; n = Pl ; isNum = False} ;
NumSg = {s = \\g,c => []; n = Sg ; isNum = False} ;
NumDigits numeral = {s = \\g,c => numeral.s ! NCard g c; n = numeral.n } ;
OrdDigits numeral = {s = \\af => numeral.s ! NOrd af} ;
NumNumeral numeral = {s = \\g,c => numeral.s ! NCard g c; n = numeral.n } ;
OrdNumeral numeral = {s = \\af => numeral.s ! NOrd af} ;
AdNum adn num = {s = \\g,c => adn.s ++ num.s!g!c; n = num.n } ;
OrdSuperl a = {s = a.s ! Superl} ;
DefArt = {
s = \\_,n,g,c => artDef ! gennum g n ! c ;
a = Weak
} ;
IndefArt = {
s = table {
True => \\_,_,_ => [] ;
False => table {
Sg => \\g,c => "ein" + pronEnding ! GSg g ! c ;
Pl => \\_,_ => []
}
} ;
a = Strong
} ;
MassNP cn = {
s = \\c => cn.s ! adjfCase Strong c ! Sg ! c ;
a = agrP3 Sg ;
isPron = False
} ;
UseN, UseN2 = \n -> {
s = \\_ => n.s ;
g = n.g
} ;
ComplN2 f x = {
s = \\_,n,c => f.s ! n ! c ++ appPrep f.c2 x.s ;
g = f.g
} ;
ComplN3 f x = {
s = \\n,c => f.s ! n ! c ++ appPrep f.c2 x.s ;
g = f.g ;
c2 = f.c3
} ;
Use2N3 f = {
s = f.s ;
g = f.g ;
c2 = f.c2
} ;
Use3N3 f = {
s = f.s ;
g = f.g ;
c2 = f.c3
} ;
AdjCN ap cn =
let
g = cn.g
in {
s = \\a,n,c =>
preOrPost ap.isPre
(ap.s ! agrAdj g a n c)
(cn.s ! a ! n ! c) ;
g = g
} ;
RelCN cn rs = {
s = \\a,n,c => cn.s ! a ! n ! c ++ rs.s ! gennum cn.g n ;
g = cn.g
} ;
RelNP np rs = {
s = \\c => np.s ! c ++ "," ++ rs.s ! gennum np.a.g np.a.n ;
a = np.a ;
isPron = False
} ;
SentCN cn s = {
s = \\a,n,c => cn.s ! a ! n ! c ++ s.s ;
g = cn.g
} ;
AdvCN cn s = {
s = \\a,n,c => cn.s ! a ! n ! c ++ s.s ;
g = cn.g
} ;
ApposCN cn np = let g = cn.g in {
s = \\a,n,c => cn.s ! a ! n ! c ++ np.s ! c ;
g = g ;
isMod = cn.isMod
} ;
}
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