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Sentence
ara
bul
dan
eng
est
deu
fra
hin
ind
ita
kan
ltz
mar
nld
pol
por
ron
rus
spa
srp
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Ich
NP
weiß
(S[dcl]\NP)/NP
nicht
(S[dcl]\NP)\(S[dcl]\NP)
(S[dcl]\NP)/NP
<
1
×
,
(S[dcl]\NP)\(S[dcl]\NP)
(S[dcl]\NP)/NP
<
1
×
was
NP/(S[dcl]/NP)
das
NP
S[dcl]/(S[dcl]\NP)
T
>
ist
(S[dcl]\NP)/NP
S[dcl]/NP
>
1
NP
>
0
S[dcl]\NP
>
0
S[dcl]
<
0
.
S[dcl]\S[dcl]
S[dcl]
<
0
<div class="der"> <table class="constituent binaryrule" data-cat="S[dcl]"> <tr class="daughters"> <td class="daughter daughter-left"><table class="constituent binaryrule" data-cat="S[dcl]"> <tr class="daughters"> <td class="daughter daughter-left"><table class="constituent lex" data-token="Ich" data-from="0" data-to="3" data-cat="NP"> <tr><td class="token">Ich</td></tr> <tr><td class="cat" tabindex="0">NP</td></tr> <tr><td class="span-swiper"> </td></tr> </table></td> <td class="daughter daughter-right"><table class="constituent binaryrule" data-cat="S[dcl]\NP"> <tr class="daughters"> <td class="daughter daughter-left"><table class="constituent binaryrule" data-cat="(S[dcl]\NP)/NP"> <tr class="daughters"> <td class="daughter daughter-left"><table class="constituent binaryrule" data-cat="(S[dcl]\NP)/NP"> <tr class="daughters"> <td class="daughter daughter-left"><table class="constituent lex" data-token="weiß" data-from="4" data-to="8" data-cat="(S[dcl]\NP)/NP"> <tr><td class="token">weiß</td></tr> <tr><td class="cat" tabindex="0">(S[dcl]\NP)/NP</td></tr> <tr><td class="span-swiper"> </td></tr> </table></td> <td class="daughter daughter-right"><table class="constituent lex" data-token="nicht" data-from="9" data-to="14" data-cat="(S[dcl]\NP)\(S[dcl]\NP)"> <tr><td class="token">nicht</td></tr> <tr><td class="cat" tabindex="0">(S[dcl]\NP)\(S[dcl]\NP)</td></tr> <tr><td class="span-swiper"> </td></tr> </table></td> </tr> <tr><td colspan="2" class="rulecat"><div class="rulecat"> <div class="cat">(S[dcl]\NP)/NP</div> <div class="rule" title="Backward Crossed Composition">< <sup>1</sup><sub>×</sub> </div> </div></td></tr> </table></td> <td class="daughter daughter-right"><table class="constituent lex" data-token="," data-from="14" data-to="15" data-cat="(S[dcl]\NP)\(S[dcl]\NP)"> <tr><td class="token">,</td></tr> <tr><td class="cat" tabindex="0">(S[dcl]\NP)\(S[dcl]\NP)</td></tr> <tr><td class="span-swiper"> </td></tr> </table></td> </tr> <tr><td colspan="2" class="rulecat"><div class="rulecat"> <div class="cat">(S[dcl]\NP)/NP</div> <div class="rule" title="Backward Crossed Composition">< <sup>1</sup><sub>×</sub> </div> </div></td></tr> </table></td> <td class="daughter daughter-right"><table class="constituent binaryrule" data-cat="NP"> <tr class="daughters"> <td class="daughter daughter-left"><table class="constituent lex" data-token="was" data-from="16" data-to="19" data-cat="NP/(S[dcl]/NP)"> <tr><td class="token">was</td></tr> <tr><td class="cat" tabindex="0">NP/(S[dcl]/NP)</td></tr> <tr><td class="span-swiper"> </td></tr> </table></td> <td class="daughter daughter-right"><table class="constituent binaryrule" data-cat="S[dcl]/NP"> <tr class="daughters"> <td class="daughter daughter-left"><table class="constituent unaryrule" data-cat="S[dcl]/(S[dcl]\NP)"> <tr class="daughters"><td class="daughter daughter-only"><table class="constituent lex" data-token="das" data-from="20" data-to="23" data-cat="NP"> <tr><td class="token">das</td></tr> <tr><td class="cat" tabindex="0">NP</td></tr> <tr><td class="span-swiper"> </td></tr> </table></td></tr> <tr><td class="rulecat"><div class="rulecat"> <div class="cat">S[dcl]/(S[dcl]\NP)</div> <div class="rule" title="Forward Type Raising"> T <sup>></sup> </div> </div></td></tr> </table></td> <td class="daughter daughter-right"><table class="constituent lex" data-token="ist" data-from="24" data-to="27" data-cat="(S[dcl]\NP)/NP"> <tr><td class="token">ist</td></tr> <tr><td class="cat" tabindex="0">(S[dcl]\NP)/NP</td></tr> <tr><td class="span-swiper"> </td></tr> </table></td> </tr> <tr><td colspan="2" class="rulecat"><div class="rulecat"> <div class="cat">S[dcl]/NP</div> <div class="rule" title="Forward Composition">> <sup>1</sup> </div> </div></td></tr> </table></td> </tr> <tr><td colspan="2" class="rulecat"><div class="rulecat"> <div class="cat">NP</div> <div class="rule" title="Forward Application">> <sup>0</sup> </div> </div></td></tr> </table></td> </tr> <tr><td colspan="2" class="rulecat"><div class="rulecat"> <div class="cat">S[dcl]\NP</div> <div class="rule" title="Forward Application">> <sup>0</sup> </div> </div></td></tr> </table></td> </tr> <tr><td colspan="2" class="rulecat"><div class="rulecat"> <div class="cat">S[dcl]</div> <div class="rule" title="Backward Application">< <sup>0</sup> </div> </div></td></tr> </table></td> <td class="daughter daughter-right"><table class="constituent lex" data-token="." data-from="27" data-to="28" data-cat="S[dcl]\S[dcl]"> <tr><td class="token">.</td></tr> <tr><td class="cat" tabindex="0">S[dcl]\S[dcl]</td></tr> <tr><td class="span-swiper"> </td></tr> </table></td> </tr> <tr><td colspan="2" class="rulecat"><div class="rulecat"> <div class="cat">S[dcl]</div> <div class="rule" title="Backward Application">< <sup>0</sup> </div> </div></td></tr> </table> </div>
Use with
der.css
.
\begin{tikzpicture}[ampersand replacement=\&] \matrix [column sep=9pt] at (0, 0) { \lexnode*{idm13}{Ich}{\catNP}{} \& \lexnode*{idm46}{weiß}{(\catS[dcl]\?\catNP)/\catNP}{} \& \lexnode*{idm58}{nicht}{(\catS[dcl]\?\catNP)\?(\catS[dcl]\?\catNP)}{} \& \lexnode*{idm72}{,}{(\catS[dcl]\?\catNP)\?(\catS[dcl]\?\catNP)}{} \& \lexnode*{idm91}{was}{\catNP/(\catS[dcl]/\catNP)}{} \& \lexnode*{idm117}{das}{\catNP}{} \& \lexnode*{idm125}{ist}{(\catS[dcl]\?\catNP)/\catNP}{} \& \lexnode*{idm137}{.}{\catS[dcl]\?\catS[dcl]}{} \\ }; \binnode*{idm37}{idm46-cat}{idm58-cat}{\BXC{1}}{(\catS[dcl]\?\catNP)/\catNP}{} \binnode*{idm28}{idm37}{idm72-cat}{\BXC{1}}{(\catS[dcl]\?\catNP)/\catNP}{} \unnode*{idm110}{idm117-cat}{\FTR}{\catS[dcl]/(\catS[dcl]\?\catNP)}{} \binnode*{idm103}{idm110}{idm125-cat}{\FC{1}}{\catS[dcl]/\catNP}{} \binnode*{idm86}{idm91-cat}{idm103}{\FC{0}}{\catNP}{} \binnode*{idm21}{idm28}{idm86}{\FC{0}}{\catS[dcl]\?\catNP}{} \binnode*{idm8}{idm13-cat}{idm21}{\BC{0}}{\catS[dcl]}{} \binnode*{idm3}{idm8}{idm137-cat}{\BC{0}}{\catS[dcl]}{} \end{tikzpicture}
Use with
ccgsym.sty
and
tikzlibraryccgder.code.tex
.
Translations
eng
I don't know what that is.
eng
I don't know what this is.
eng
I don't know what that thing is.
eng
I don't know what it is.
fra
Je ne sais pas ce que c'est.
fra
J'ignore ce que c'est.
fra
Je ne sais pas ce que c’est.
fra
J'ignore ce dont il s'agit.
ita
Non so cosa esso sia.
nld
Ik weet niet wat dat is.
por
Eu não sei o que é isso.
por
Não sei o que é isso.
rus
Я не знаю, что это.
spa
No sé qué es eso.
spa
No sé lo que es.
ukr
Я не знаю, що це.