concrete NumeralKam of Numeral = CatKam [Numeral,Digits] ** open Prelude,CommonBantu,DiffKam, MorphoKam in { lincat Digit = {s : DForm => CardOrd => Gender => Str} ; Sub10 = {s : DForm => CardOrd => Gender => Str ; n : Number} ; Sub100 = {s : CardOrd => Gender => Str ; n : Number} ; Sub1000 = {s : CardOrd => Gender => Str ; n : Number} ; Sub1000000 = {s : CardOrd => Gender => Str ; n : Number} ; lin num x = x ; lin n2 = mkNumn "li" "ili" "eli" "keli" ; lin n3 = mkNum "tatu" "itatu" " atatu" "katatu" ; lin n4 = mkNum "nya" "ina" "ana" "kana" ; lin n5 = mkNum "tano" "itano" "atano" "katano" ; lin n6 = regNum "nthathatu" ; lin n7 = regNum "muonza" ; lin n8 = regNum "nyanya" ; lin n9 = regNum "kenda" ; lin pot01 = mkNume "mwe" " yimwe" "mbee" ** {n = Sg} ; lin pot0 d = d ** {n = Pl} ; lin pot110 = regCardOrd "ikumi" ** {n = Pl} ; lin pot111 = regCardone "ikumi na" "mwe" ** {n = Pl} ; lin pot1to19 d = {s = d.s ! teen} ** {n = Pl} ; lin pot0as1 n = {s = n.s ! unit} ** {n = n.n} ; lin pot1 d = {s = d.s ! ten} ** {n = Pl} ; lin pot1plus d e = { s = table { NCard => \\g => d.s ! ten ! NCard ! g ++ "na"++ e.s ! unit ! NCard ! g ; NOrd => \\g =>Ordprefix g++ d.s ! ten ! NCard ! g ++ "na"++ e.s ! unit ! NCard ! g } ; n = Pl} ; lin pot1as2 n = n ; lin pot2 d = {s = d.s ! hund} ** {n = Pl} ; lin pot2plus d e = {s = table { NCard => \\g => d.s ! hund ! NCard ! g ++ "na" ++ e.s !NCard ! g ; NOrd => \\g =>Ordprefix g++ d.s ! hund ! NCard ! g ++ "na" ++ e.s ! NCard ! g } ; n = Pl} ; lin pot2as3 n = n ; lin pot3 n = { s = table { NCard => \\g => mkCard NCard "ngili" ! g ++ n.s ! NCard ! g ; NOrd => \\g =>Ordprefix g++ mkCard NCard "ngili" ! g ++ n.s ! NCard ! g } ; n = Pl} ; lin pot3plus n m = { s = table { NCard => \\g => "ngili" ++ n.s ! NCard !g ++ m.s ! NCard ! g ; NOrd => \\g =>Ordprefix g++ "ngili" ++ n.s ! NCard !g ++ m.s ! NCard ! g} ; n = Pl} ; -- numerals as sequences of digits0' lincat Dig = TDigit ; lin IDig d = d ; IIDig d i = { s = table {NCard => \\g => d.s! NCard ! g ++ BIND ++ i.s ! NCard ! g ; NOrd => \\g => d.s! NOrd! g ++ BIND ++ i.s !NCard! g } ; n = Pl } ; D_0 = mkDig "0" ; D_1 = mk3Dig "1" "1" Sg ; D_2 = mkDig "2" ; D_3 = mkDig "3" ; D_4 = mkDig "4" ; D_5 = mkDig "5" ; D_6 = mkDig "6" ; D_7 = mkDig "7" ; D_8 = mkDig "8" ; D_9 = mkDig "9" ; PosDecimal d = d ** {hasDot=False} ; NegDecimal d = { s = \\o,g => "-" ++ BIND ++ d.s ! o ! g ; n = Pl ; hasDot=False } ; IFrac d i = { s = \\o,g => d.s ! NCard ! g ++ if_then_Str d.hasDot BIND (BIND++"."++BIND) ++ i.s ! o ! g ; n = Pl ; hasDot=True } ; oper mk2Dig : Str -> Str -> TDigit = \c,o -> mk3Dig c o Pl ; mkDig : Str -> TDigit = \c -> mk2Dig c (c ) ; mk3Dig : Str -> Str -> Number -> TDigit = \c,o,n -> { s = table {NCard => \\g => c ; NOrd => \\g =>Ordprefix g ++ o} ; --Ordprefix g ++ n = n} ; TDigit = { n : Number ; s : CardOrd => Gender => Str } ; }