forked from GitHub/gf-rgl
Inari Listenmaa
@@ -82,7 +82,7 @@ concrete CatSom of Cat = CommonX - [Adv] ** open ResSom, Prelude in {
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--2 Structural words
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-- Constructed in StructuralSom.
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Conj = { s1,s2 : Str ; n : Number } ;
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Conj = {s2 : State => Str ; s1 : Str ; n : Number } ;
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Subj = SS ;
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Prep = ResSom.Prep ** {c2 : Preposition ; berri, sii, dhex : Str} ;
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@@ -96,7 +96,7 @@ concrete CatSom of Cat = CommonX - [Adv] ** open ResSom, Prelude in {
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V,
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-- TODO: eventually proper lincats
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VV, -- verb-phrase-complement verb e.g. "want"
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VS, -- sentence-complement verb e.g. "claim"
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VS, -- sentence-complement verb e.g. "claim" -- TODO: VPs that have VS use waxa as stm? see Nilsson p. 68
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VQ, -- question-complement verb e.g. "wonder"
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VA, -- adjective-complement verb e.g. "look"
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V2V, -- verb with NP and V complement e.g. "cause"
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@@ -37,17 +37,17 @@ lin
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ConsAdv, ConsAdV, ConsIAdv = consrSS comma ;
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ConjAdv, ConjAdV, ConjIAdv = conjunctDistrSS ;
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{-
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--RS depends on agreement, otherwise exactly like previous.
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--RS depends on gender and case, otherwise exactly like previous.
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lincat
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[RS] = {s1,s2 : Agr => Str } ;
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[RS] = {s1,s2 : Gender => Case => Str} ;
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lin
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BaseRS x y = twoTable Agr x y ;
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ConsRS xs x = consrTable Agr comma xs x ;
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ConjRS co xs = conjunctDistrTable Agr co xs ;
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BaseRS x y = twoTable2 Gender Case x y ;
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ConsRS xs x = consrTable2 Gender Case comma xs x ;
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ConjRS co xs = conjunctDistrTable2' Gender Case co xs ;
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{-
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lincat
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[S] = {} ;
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@@ -80,11 +80,11 @@ lin
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BaseDAP x y = x ** { pref2 = y.pref } ;
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ConsDAP xs x = xs ** { pref2 = x.pref } ;
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ConjDet conj xs = xs ** { pref = conj.s1 ++ xs.pref ++ conj.s2 ++ xs.pref2 } ;
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-}
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-- Noun phrases
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lincat
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[NP] = { s1,s2 : Case => Str } ** NPLight ;
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[NP] = {s1,s2 : Case => Str} ** BaseNP ;
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lin
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BaseNP x y = twoTable Case x y ** consNP x y ;
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@@ -93,24 +93,36 @@ lin
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oper
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--NP without the s field; just to avoid copypaste and make things easier to change
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NPLight : Type = { } ;
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ConjDistr : Type = {s2 : State => Str ; s1 : Str} ;
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consNP : NPLight -> NPLight -> NPLight = \x,y ->
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x ** { agr = conjAgr x.agr (getNum y.agr) } ;
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conjunctDistrSS : ConjDistr -> ListX -> SS = \or,xs ->
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ss (or.s1 ++ xs.s1 ++ or.s2 ! Indefinite ++ xs.s2) ;
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conjNP : NPLight -> Conj -> NPLight = \xs,conj ->
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xs ** { agr = conjAgr xs.agr conj.nbr } ;
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conjunctDistrTable' :
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(P : PType) -> ConjDistr -> ListTable P -> {s : P => Str} = \P,or,xs ->
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{s = table P {p => or.s1 ++ xs.s1 ! p ++ or.s2 ! Indefinite ++ xs.s2 ! p}} ;
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conjunctDistrTable2' :
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(P,Q : PType) -> ConjDistr -> ListTable2 P Q -> {s : P => Q => Str} =
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\P,Q,or,xs ->
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{s =
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table P {p => table Q {q => or.s1 ++ xs.s1 ! p ! q ++ or.s2 ! Indefinite ++ xs.s2 ! p ! q}}} ;
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-- Like conjunctTable from prelude/Coordination.gf,
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-- but forces the first argument into absolutive.
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conjunctNPTable : Conj -> ListTable Case -> {s : Case => Str} = \co,xs ->
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{ s = table { cas => co.s1 ++ xs.s1 ! Abs ++ co.s2 ++ xs.s2 ! cas } } ;
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conjunctNPTable : ConjDistr -> ({s1,s2 : Case => Str} ** BaseNP) -> {s : Case => Str ; st : State} = \co,xs -> xs **
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{s = -- TODO if xs is a pronoun, make them use (pronTable ! xs.a).sp
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table { cas => co.s1 ++ xs.s1 ! Abs ++ co.s2 ! xs.st ++ xs.s2 ! cas}} ;
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conjAgr : Agr -> Number -> Agr = \a,n ->
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consNP : BaseNP -> BaseNP -> BaseNP = \x,y ->
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x ** { agr = conjAgr x.agr (getNum y.agr) } ;
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conjNP : BaseNP -> Conj -> BaseNP = \xs,conj ->
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xs ** { agr = conjAgr xs.agr conj.nbr } ;
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conjAgr : Agreement -> Number -> Agreement = \a,n ->
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case n of { Pl => plAgr a ; _ => a } ;
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conjNbr : Number -> Number -> Number = \n,m ->
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case n of { Pl => Pl ; _ => m } ;
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-}
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}
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@@ -7,7 +7,11 @@ concrete ExtendSom of Extend = CatSom
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lin
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-- : NP -> SSlash -> Utt ; -- her I love -- Sayeed p. 189-
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FocusObj np sslash =
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FocusObj np sslash = -- FIXME: preposition disappears in negative sentences
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let ss = sslash.s ! False ;
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ssSub = sslash.s ! True ; -- the negative particle is the same as subordinate, but verb forms come from main clause
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obj = objpron np ! Abs ;
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in {s = ssSub.beforeSTM ++ "waxa" ++ ssSub.stm ++ ss.afterSTM ++ obj} ;
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-- FocusAdv : Adv -> S -> Utt ; -- today I will sleep
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-- FocusAdV : AdV -> S -> Utt ; -- never will I sleep
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@@ -52,7 +52,7 @@ lin bread_N = mkN "rooti" ; --masc/fem
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-- lin brown_A = mkA "" ;
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-- lin burn_V = mkV "" ;
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-- lin butter_N = mkN "" ;
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lin buy_V2 = mkV2 "iibsa" ;
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lin buy_V2 = mkV2 "iibso" ;
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----
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-- C
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@@ -9,6 +9,7 @@ concrete NounSom of Noun = CatSom ** open ResSom, Prelude in {
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-- : Det -> CN -> NP
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DetCN det cn = useN cn ** {
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s = sTable ;
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st = det.st ;
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a = getAgr det.n (gender cn) } where {
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sTable : Case => Str = \\c =>
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let nfc : {nf : NForm ; c : Case} =
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@@ -45,11 +46,12 @@ concrete NounSom of Noun = CatSom ** open ResSom, Prelude in {
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UsePN pn = pn ** {
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s = \\c => pn.s ;
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isPron = False ;
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st = Definite ;
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empty = [] ;
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} ;
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-- : Pron -> NP ;
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UsePron pron = pron ;
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UsePron pron = pron ** {st = Definite} ;
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-- : Predet -> NP -> NP ; -- only the man
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PredetNP predet np = np ** {
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@@ -70,7 +72,8 @@ concrete NounSom of Noun = CatSom ** open ResSom, Prelude in {
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-- : NP -> RS -> NP ; -- Paris, which is here
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RelNP np rs = np ** {
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s = \\c => np.s ! c ++ rs.s ! npgender np ! c
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s = \\c => objpron np ! c ++ rs.s ! npgender np ! c ;
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isPron = False ;
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} ;
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-- Determiners can form noun phrases directly.
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@@ -198,7 +201,7 @@ concrete NounSom of Noun = CatSom ** open ResSom, Prelude in {
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True => qnt.shortPoss ! art ;
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_ => qnt.s ! sg n2.gda ! Abs } ;
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noun = case np.isPron of {
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True => (pronTable ! np.a).sp ; -- long subject pronoun
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True => (pronTable ! np.a).sp ! Abs ; -- long subject pronoun
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False => np.s ! Abs }
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in noun ++ cn.s ! Def num ++ BIND ++ det ;
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isPoss = True} ;
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@@ -156,6 +156,12 @@ oper
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getNum : Agreement -> Number = \a ->
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case a of { Sg1|Sg2|Sg3 _ => Sg ; _ => Pl } ;
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plAgr : Agreement -> Agreement = \agr ->
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case agr of { Sg1 => Pl1 Excl ;
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Sg2 => Pl2 ;
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Sg3 _ => Pl3 ;
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agr => agr } ;
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agr2pagr : Agreement -> PrepAgr = \a -> case a of {
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Sg1 => Sg1_Prep ;
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Sg2 => Sg2_Prep ;
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@@ -164,6 +170,14 @@ oper
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_ => P3_Prep
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} ;
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pagr2agr : PrepAgr -> Agreement = \a -> case a of {
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Sg1_Prep => Sg1 ;
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Sg2_Prep => Sg2 ;
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Pl1_Prep i => Pl1 i ;
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Pl2_Prep => Pl2 ;
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_ => Pl3
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} ;
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isP3 = overload {
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isP3 : Agreement -> Bool = \agr ->
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case agr of {Sg3 _ | Pl3 => True ; _ => False} ;
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@@ -23,7 +23,7 @@ concrete PhraseSom of Phrase = CatSom ** open Prelude, ResSom in {
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UttInterj i = i ;
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NoPConj = {s = []} ;
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PConjConj conj = { s = conj.s1 ++ conj.s2 } ;
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PConjConj conj = {s = conj.s1 ++ conj.s2 ! Indefinite} ;
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NoVoc = {s = []} ;
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VocNP np = { s = "," ++ np.s ! Abs } ; --TODO: vocative exists
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@@ -9,8 +9,8 @@ lin
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{-
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-- Sayeed p. 95-96 + ch 8
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Reduced present general in relative clauses; as absolutive
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1/2SG/3SG M/2PL/3PL sugá -- same as imperative (TODO check if for all conjugations)
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3 SG F sugtá -- not yet in the grammar
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1/2SG/3SG M/2PL/3PL sugá (VRel Masc)
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3 SG F sugtá (VRel Fem)
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1PL sugná -- not yet in the grammar
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(18) (a) nimánka buugágga keená men-the books-the bring
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@@ -134,6 +134,7 @@ oper
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BaseNP : Type = {
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a : Agreement ;
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isPron : Bool ;
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st : State ;
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empty : Str ;
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} ;
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@@ -145,13 +146,17 @@ oper
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let pagr : PrepAgr = agr2pagr np.a in
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case <np.isPron,isP3 np.a> of {
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<False,_> => {s = np.s ! Abs ; a = pagr} ;
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-- <True,True> => {s = np.empty ++ (pronTable ! np.a).sp ; a = pagr} ; -- uncomment if you want to add long object pronoun for 3rd person object
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-- <True,True> => {s = objpron np ! Abs ; a = pagr} ; -- uncomment if you want to add long object pronoun for 3rd person object
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_ => {s = np.empty ; a = pagr} } ; -- no long object for other pronouns
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objpron : NounPhrase -> Case => Str = \np -> case np.isPron of {
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True => \\c => np.empty ++ (pronTable ! np.a).sp ! c ;
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False => np.s} ;
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useN : Noun -> CNoun ** BaseNP = \n -> n **
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{ mod = \\_,_ => [] ; hasMod = False ;
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a = Sg3 (gender n) ; isPron,isPoss = False ;
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empty = [] ;
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empty = [] ; st = Indefinite
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} ;
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emptyNP : NounPhrase = {
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@@ -159,6 +164,7 @@ oper
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a = Pl3 ;
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isPron = False ;
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empty = [] ;
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st = Indefinite
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} ;
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impersNP : NounPhrase = emptyNP ** {
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@@ -175,62 +181,62 @@ oper
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sp : GenNum => Str ; -- independent forms, e.g. M:kayga F:tayda Pl:kuwayga
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short : DefArticle => Str -- short possessive suffix: e.g. family members, my/your name
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} ;
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sp : Str ;
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sp : Case => Str ;
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} ;
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pronTable : Agreement => Pronoun = table {
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Sg1 => {
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s = table {Nom => "aan" ; Abs => "i"} ;
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a = Sg1 ; isPron = True ; sp = "aniga" ;
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empty = [] ;
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a = Sg1 ; isPron = True ; sp = table {Nom => "anigu" ; _ =>"aniga"} ;
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empty = [] ; st = Definite ;
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poss = {s = quantTable "ayg" "ayd" ; short = quantTable "ay" ; sp = gnTable "ayg" "ayd" "uwayg"}
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} ;
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Sg2 => {
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s = table {Nom => "aad" ; Abs => "ku"} ;
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a = Sg2 ; isPron = True ; sp ="adiga" ;
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empty = [] ;
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a = Sg2 ; isPron = True ; sp = table {Nom => "adigu" ; _ => "adiga"} ;
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empty = [] ; st = Definite ;
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poss = {s = quantTable "aag" "aad" ; short = quantTable "aa" ; sp = gnTable "aag" "aad" "uwaag"}
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} ;
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Sg3 Masc => {
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s = table {Nom => "uu" ; Abs => []} ;
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a = Sg3 Masc ; isPron = True ; sp ="isaga" ;
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empty = [] ;
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a = Sg3 Masc ; isPron = True ; sp = table {Nom => "isagu" ; _ => "isaga"} ;
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empty = [] ; st = Definite ;
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poss = {s, short = quantTable "iis" ; sp = gnTable "iis" "iis" "uwiis"}
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} ;
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Sg3 Fem => {
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s = table {Nom => "ay" ; Abs => []} ;
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a = Sg3 Fem ; isPron = True ; sp = "iyada" ;
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empty = [] ;
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a = Sg3 Fem ; isPron = True ; sp = table {Nom => "iyadu" ; _ => "iyada"} ;
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empty = [] ; st = Definite ;
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poss = {s, short = quantTable "eed" ; sp = gnTable "eed" "eed" "uweed"}
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} ;
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Pl1 Excl => {
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s = table {Nom => "aan" ; Abs => "na"} ;
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a = Pl1 Excl ; isPron = True ; sp ="annaga" ;
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empty = [] ;
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a = Pl1 Excl ; isPron = True ; sp = table {Nom => "annagu" ; _ => "annaga"} ;
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empty = [] ; st = Definite ;
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poss = {s = quantTable "eenn" ; short = quantTable "een" ; sp = gnTable "eenn" "eenn" "uweenn"}
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} ;
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Pl1 Incl => {
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s = table {Nom => "aynu" ; Abs => "ina"} ;
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a = Pl1 Incl ; isPron = True ; sp ="innaga" ;
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empty = [] ;
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a = Pl1 Incl ; isPron = True ; sp = table {Nom => "innagu" ; _ => "innaga"} ;
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empty = [] ; st = Definite ;
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poss = {s = quantTable "eenn" ; short = quantTable "een" ; sp = gnTable "eenn" "eenn" "uweenn"}
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} ;
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Pl2 => {
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s = table {Nom => "aad" ; Abs => "idin"} ;
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a = Pl2 ; isPron = True ; sp ="idinka" ;
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empty = [] ;
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a = Pl2 ; isPron = True ; sp = table {Nom => "idinku" ; _ => "idinka"} ;
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empty = [] ; st = Definite ;
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poss = {s = quantTable "iinn" ; short = quantTable "iin" ; sp = gnTable "iinn" "iinn" "uwiinn"}
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} ;
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Pl3 => {
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s = table {Nom => "ay" ; Abs => []} ;
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a = Pl3 ; isPron = True ; sp = "iyaga" ;
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empty = [] ;
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a = Pl3 ; isPron = True ; sp = table {Nom => "iyagu" ; _ => "iyaga"} ;
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empty = [] ; st = Definite ;
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poss = {s, short = quantTable "ood" ; sp = gnTable "ood" "ood" "uwood"}
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} ;
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Impers => {
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s = table {Nom => "la" ; Abs => "la"} ;
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a = Impers ; isPron = True ; sp = "" ;
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empty = [] ;
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a = Impers ; isPron = True ; sp = \\_ => "" ;
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empty = [] ; st = Definite ;
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poss = {s, short = quantTable "??" ; sp = gnTable "??" "??" "??"}
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}
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} ;
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@@ -798,13 +804,14 @@ oper
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_ => o
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-- object pronoun, prepositions and negation all contract
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} ;
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stm : Str = case cltyp of {
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Subord => if_then_Pol p [] "aan" ++ subjpron ; -- if we form a ClSlash, no sentence type marker; negation with aan (Sayeed p. 210)
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Question => "ma" ; -- TODO find out how negative questions work
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stm : {p1,p2 : Str} = case cltyp of {
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||||
Subord => {p1 = if_then_Pol p [] "aan" ; -- if we form a ClSlash, no sentence type marker; negation with aan (Sayeed p. 210)
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p2 = if_then_Pol p subjpron []} ;
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Question => {p1 = "ma" ; p2 = []} ; -- TODO find out how negative questions work
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Statement => case <p,vp.pred,subj.a> of {
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<Pos,Copula|NoCopula,Sg3 _|Impers> => "waa" ;
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<Pos,Copula|NoCopula,Sg3 _|Impers> => {p1 = "waa" ; p2 = []} ;
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_ => stmarkerNoContr ! subj.a ! p }} ;
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in wordOrder subjnoun subjpron stm obj pred vp ;
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in (wordOrder subjnoun subjpron stm obj pred vp) ;
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} where {
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vp = case isPassive vps of {
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True => complSlash (insertComp vps np) ;
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@@ -812,13 +819,14 @@ oper
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subj = case isPassive vps of {True => impersNP ; _ => np}
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} ;
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wordOrder : (sn,sp,stm : Str) -> {p1,p2 : Str} -> {fin,inf : Str} -> VerbPhrase -> BaseCl =
|
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wordOrder : (sn,sp : Str) -> (stm,obj : {p1,p2 : Str}) -> {fin,inf : Str} -> VerbPhrase -> BaseCl =
|
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\subjnoun,subjpron,stm,obj,pred,vp -> {
|
||||
beforeSTM = vp.berri -- AdV
|
||||
++ subjnoun -- subject if it's a noun
|
||||
++ obj.p1 ; -- object if it's a noun
|
||||
stm = stm ; -- sentence type marker + possible subj. pronoun
|
||||
afterSTM = obj.p2 -- object if it's a pronoun
|
||||
stm = stm.p1 ; -- sentence type marker
|
||||
afterSTM = stm.p2 -- possible subj. pronoun
|
||||
++ obj.p2 -- object if it's a pronoun
|
||||
++ vp.sii -- restricted set of particles
|
||||
++ vp.dhex -- restricted set of nouns/adverbials
|
||||
++ vp.secObj -- "second object"
|
||||
@@ -866,10 +874,10 @@ oper
|
||||
let stm = if_then_Pol b "w" "m"
|
||||
in stm + subjpron ! a ;
|
||||
|
||||
stmarkerNoContr : Agreement => Polarity => Str = \\a,p =>
|
||||
stmarkerNoContr : Agreement => Polarity => {p1,p2 : Str} = \\a,p =>
|
||||
case p of {
|
||||
Pos => "waa" ++ subjpron ! a ;
|
||||
Neg => "ma" } ;
|
||||
Pos => {p1 = "waa" ; p2 = subjpron ! a} ;
|
||||
Neg => {p1 = "ma" ; p2 = []} } ;
|
||||
|
||||
subjpron : Agreement => Str = table {
|
||||
Sg1|Pl1 Excl => "aan" ;
|
||||
@@ -884,8 +892,9 @@ oper
|
||||
|
||||
oper
|
||||
linVP : VForm -> VerbPhrase -> Str = \vf,vp ->
|
||||
let inf = {inf = vp.s ! vf ; fin=[]} ;
|
||||
wo = wordOrder [] [] [] (vp.comp ! Pl3) inf vp ;
|
||||
let vp' = complSlash vp ;
|
||||
inf = {inf = vp.s ! vf ; fin=[]} ;
|
||||
wo = wordOrder [] [] {p1,p2=[]} (vp'.comp ! pagr2agr vp.obj2.a) inf vp' ;
|
||||
in wo.beforeSTM ++ wo.afterSTM ;
|
||||
|
||||
linCN : CNoun -> Str = \cn -> cn.s ! NomSg ++ cn.mod ! Sg ! Abs ;
|
||||
|
||||
@@ -27,7 +27,10 @@ lin
|
||||
|
||||
-}
|
||||
-- : Temp -> Pol -> ClSlash -> SSlash ; -- (that) she had not seen
|
||||
--UseSlash t p cls = {s = \\b => t.s ++ p.s ++ cls.s ! b ! t.t ! t.a ! p.p} ;
|
||||
UseSlash t p cls = {s = \\b =>
|
||||
let sent = cls.s ! b ! t.t ! t.a ! p.p in
|
||||
sent ** {beforeSTM = t.s ++ p.s ++ sent.beforeSTM}
|
||||
} ;
|
||||
|
||||
--2 Imperatives
|
||||
-- : VP -> Imp ;
|
||||
|
||||
@@ -38,8 +38,8 @@ lin there_Adv = ss "" ;
|
||||
-------
|
||||
-- Conj
|
||||
|
||||
lin and_Conj = {s1 = "oo" ; s2 = [] ; n = Pl} ;
|
||||
lin or_Conj = {s1 = "ama" ; s2 = [] ; n = Sg} ; -- mise with interrogatives
|
||||
lin and_Conj = {s2 = table {Definite => "ee" ; Indefinite => "oo"} ; s1 = [] ; n = Pl} ;
|
||||
lin or_Conj = {s2 = \\_ => "ama" ; s1 = [] ; n = Sg} ; -- mise with interrogatives
|
||||
-- lin if_then_Conj = mkConj
|
||||
-- lin both7and_DConj = mkConj "" "" pl ;
|
||||
-- lin either7or_DConj = mkConj "" "" pl ;
|
||||
@@ -118,7 +118,7 @@ lin with_Prep = mkPrep la ;
|
||||
-- Pron
|
||||
|
||||
-- Pronouns are closed class, no constructor in ParadigmsSom.
|
||||
it_Pron = he_Pron ** {s = \\_ => [] ; sp = [] ; a = Impers} ;
|
||||
it_Pron = he_Pron ** {s = \\_ => [] ; sp = \\_ => [] ; a = Impers} ;
|
||||
i_Pron = pronTable ! Sg1 ;
|
||||
youPol_Pron,
|
||||
youSg_Pron = pronTable ! Sg2 ;
|
||||
|
||||
Reference in New Issue
Block a user