CCGWeb - Wer zum Teufel bist du?

Wer

S[wq]/(S[dcl]\NP)

zum

(S[to]\NP)/(S[b]\NP)

Teufel

S[b]\NP

S[to]\NP

> ⁰

S[dcl]/S[dcl]

bist

(S[dcl]/NP)\NP

S[dcl]\(S[dcl]/NP)

T ^<

S[dcl]\NP

< ¹

S[dcl]\S[dcl]

S[dcl]\NP

< ¹

S[dcl]\NP

> ¹_×

S[wq]

> ⁰

 <div class="der">
<table class="constituent binaryrule" data-cat="S[wq]">
<tr class="daughters">
<td class="daughter daughter-left"><table class="constituent lex" data-token="Wer" data-from="0" data-to="3" data-cat="S[wq]/(S[dcl]\NP)">
<tr><td class="token">Wer</td></tr>
<tr><td class="cat" tabindex="0">S[wq]/(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]">
<tr class="daughters"><td class="daughter daughter-only"><table class="constituent binaryrule" data-cat="S[to]\NP">
<tr class="daughters">
<td class="daughter daughter-left"><table class="constituent lex" data-token="zum" data-from="4" data-to="7" data-cat="(S[to]\NP)/(S[b]\NP)">
<tr><td class="token">zum</td></tr>
<tr><td class="cat" tabindex="0">(S[to]\NP)/(S[b]\NP)</td></tr>
<tr><td class="span-swiper"> </td></tr>
</table></td>
<td class="daughter daughter-right"><table class="constituent lex" data-token="Teufel" data-from="8" data-to="14" data-cat="S[b]\NP">
<tr><td class="token">Teufel</td></tr>
<tr><td class="cat" tabindex="0">S[b]\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[to]\NP</div>
<div class="rule" title="Forward Application">&gt; <sup>0</sup>
</div>
</div></td></tr>
</table></td></tr>
<tr><td class="rulecat"><div class="rulecat">
<div class="cat">S[dcl]/S[dcl]</div>
<div class="rule" title="Type Changing">
									*
								</div>
</div></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">
<tr class="daughters">
<td class="daughter daughter-left"><table class="constituent lex" data-token="bist" data-from="15" data-to="19" data-cat="(S[dcl]/NP)\NP">
<tr><td class="token">bist</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 unaryrule" data-cat="S[dcl]\(S[dcl]/NP)">
<tr class="daughters"><td class="daughter daughter-only"><table class="constituent lex" data-token="du" data-from="20" data-to="22" data-cat="NP">
<tr><td class="token">du</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="Backward Type Raising">
									T <sup>&lt;</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="Backward Composition">&lt; <sup>1</sup>
</div>
</div></td></tr>
</table></td>
<td class="daughter daughter-right"><table class="constituent lex" data-token="?" data-from="22" data-to="23" 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]\NP</div>
<div class="rule" title="Backward Composition">&lt; <sup>1</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 Crossed Composition">&gt; <sup>1</sup><sub>×</sub>
</div>
</div></td></tr>
</table></td>
</tr>
<tr><td colspan="2" class="rulecat"><div class="rulecat">
<div class="cat">S[wq]</div>
<div class="rule" title="Forward Application">&gt; <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*{idm8}{Wer}{\catS[wq]/(\catS[dcl]\?\catNP)}{} \&
		\lexnode*{idm39}{zum}{(\catS[to]\?\catNP)/(\catS[b]\?\catNP)}{} \&
		\lexnode*{idm53}{Teufel}{\catS[b]\?\catNP}{} \&
		\lexnode*{idm77}{bist}{(\catS[dcl]/\catNP)\?\catNP}{} \&
		\lexnode*{idm96}{du}{\catNP}{} \&
		\lexnode*{idm104}{?}{\catS[dcl]\?\catS[dcl]}{} \\
	};
	\binnode*{idm32}{idm39-cat}{idm53-cat}{\FC{0}}{\catS[to]\?\catNP}{}
	\unnode*{idm27}{idm32}{*}{\catS[dcl]/\catS[dcl]}{}
	\unnode*{idm89}{idm96-cat}{*}{\catS[dcl]\?(\catS[dcl]/\catNP)}{}
	\binnode*{idm70}{idm77-cat}{idm89}{\BC{1}}{\catS[dcl]\?\catNP}{}
	\binnode*{idm63}{idm70}{idm104-cat}{\BC{1}}{\catS[dcl]\?\catNP}{}
	\binnode*{idm20}{idm27}{idm63}{\FXC{1}}{\catS[dcl]\?\catNP}{}
	\binnode*{idm3}{idm8-cat}{idm20}{\FC{0}}{\catS[wq]}{}
\end{tikzpicture}

Use with ccgsym.sty and tikzlibraryccgder.code.tex.

Sentence

Parse

Translations