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concrete SentencesIta of Sentences = NumeralIta ** SentencesI - [
IsMass,
IFemale, YouFamFemale, YouPolFemale, IMale, YouFamMale, YouPolMale,
WeMale, WeFemale, YouPlurFamMale, YouPlurFamFemale, YouPlurPolFemale, YouPlurPolMale, TheyMale, TheyFemale,
mkPerson, Superlative, SHaveNoMass
]
with
(Syntax = SyntaxIta),
(Symbolic = SymbolicIta),
(Lexicon = LexiconIta) **
open SyntaxIta, ExtraIta, Prelude in {
lincat
Place = NPPlace ; -- {name : NP ; at : Adv ; to : Adv ; } ;
Superlative = {s : A ; isPre : Bool} ;
lin
IsMass m q = mkCl (mkNP the_Det m) q ; -- le vin allemand est bon
IFemale =
{name = mkNP (ProDrop i8fem_Pron) ; isPron = True ; poss = PossFamQuant i_Pron} ;
IMale =
{name = mkNP (ProDrop i_Pron) ; isPron = True ; poss = PossFamQuant i_Pron} ;
YouFamMale =
{name = mkNP (ProDrop youSg_Pron) ; isPron = True ; poss = PossFamQuant youSg_Pron} ;
YouFamFemale =
{name = mkNP (ProDrop youSg8fem_Pron) ; isPron = True ; poss = PossFamQuant youSg_Pron} ;
YouPolMale =
{name = mkNP (ProDrop youPol_Pron) ; isPron = True ; poss = PossFamQuant youPol_Pron} ;
YouPolFemale =
{name = mkNP (ProDrop youPol8fem_Pron) ; isPron = True ; poss = PossFamQuant youPol_Pron};
He =
{name = mkNP (ProDrop he_Pron) ; isPron = True ; poss = PossFamQuant he_Pron} ;
She =
{name = mkNP (ProDrop she_Pron) ; isPron = True ; poss = PossFamQuant she_Pron} ;
WeMale =
{name = mkNP (ProDrop we_Pron) ; isPron = True ; poss = PossFamQuant we_Pron} ;
WeFemale =
{name = mkNP (ProDrop we8fem_Pron) ; isPron = True ; poss = PossFamQuant we_Pron} ;
YouPlurFamMale =
{name = mkNP (ProDrop youPl_Pron) ; isPron = True ; poss = PossFamQuant youPl_Pron} ;
YouPlurFamFemale =
{name = mkNP (ProDrop youPl8fem_Pron) ; isPron = True ; poss = PossFamQuant youPl_Pron} ;
YouPlurPolMale =
{name = mkNP (ProDrop youPolPl_Pron) ; isPron = True ; poss = PossFamQuant youPolPl_Pron} ;
YouPlurPolFemale =
{name = mkNP (ProDrop youPolPl8fem_Pron) ; isPron = True ; poss = PossFamQuant youPolPl_Pron};
TheyMale =
{name = mkNP (ProDrop they_Pron) ; isPron = True ; poss = PossFamQuant they_Pron} ;
TheyFemale =
{name = mkNP (ProDrop they8fem_Pron) ; isPron = True ; poss = PossFamQuant they_Pron} ;
SHaveNoMass p k = mkS negativePol (mkCl p.name (ComplCN have_V2 k)) ;
oper
CNPlace : Type = {name : CN ; at : Prep ; to : Prep } ;
mkCNPlace : CN -> Prep -> Prep -> CNPlace = \p,i,t -> {
name = p ;
at = i ;
to = t ;
} ;
placeNP : Det -> CNPlace -> NPPlace = \det,kind ->
let name : NP = mkNP det kind.name in {
name = name ;
at = mkAdv kind.at name ;
to = mkAdv kind.to name
} ;
mkPerson : Pron -> {name : NP ; isPron : Bool ; poss : Quant} = \p ->
{name = mkNP p ; isPron = True ; poss = PossFamQuant p} ;
}
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