Rule {Satz} S -> NP VP (PP): = = = = = . ;Kongruenz zwischen Subjekt und finitem Verb Rule {NP} NP -> Name / Pron / Det (AP) N (PP): = = = = = = = . ;Spezifikator-Kopf-Kongruenz Rule {VP intransitiv} VP -> V: = = i. Rule {VP transitiv} VP -> V NP: = = t = . Rule {VP transitiv mit PP} VP -> V NP PP: = = tp = = . Rule {VP ditransitiv} VP -> V NP_1 NP_2: = = t2 = = . Rule {VP mit PP} VP -> V PP: = = p = . Rule {VP mit Vc} VP -> V {NP / AP / PP}: = = c = = = . Rule {AP} AP -> (Adv) A: = = . Rule {PP} PP -> P NP: =
= . Parameter: Attribute order is cat subcat lex subj pred spec adj head adj2 obj2 obj pobj predcomp. Let V be [cat: V]. Let Vi be V [subcat: i]. Let Vt be V [subcat: t]. Let Vtp be V [subcat: tp]. Let Vt2 be V [subcat: t2]. Let Vp be V [subcat: p]. Let Vc be V [subcat: c]. Let N be [num: !sg pers: 3]. Let sg be [num: sg]. Let pl be [num: pl]. Let Det be [num: !sg]. Let sg/pl be {[sg] [pl]}. Let 1sg be sg [pers: 1]. Let 2sg be sg [pers: 2]. Let 3sg be sg [pers: 3]. Let 1pl be pl [pers: 1]. Let 2pl be pl [pers: 2]. Let 3pl be pl [pers: 3]. Let 2sg/pl be {[2sg] [pl]}. ;are, were Let 1sg/2sg/pl be {[1sg] [2sg] [pl]}. ;Präsens regelmäßig: sing Let 1sg/3sg be {[1sg] [3sg]}. ;was Let 2per be sg/pl [pers: 2] ;you