CCGWeb - „Seid Tom und du denn nun ...?“ – „Was?“ – „Ach, du weißt schon!“ – „Nein, das weiß ich nicht. Sprich dich aus!“ – „Na, zusammen!“ – „Wie? Tom und ich? Quatsch! Wie kommst du denn darauf?“

„

(S[dcl]\NP)/NP

Seid

S[dcl]/S[dcl]

Tom

und

(NP\NP)/NP

NP\NP

> ⁰

denn

S[adj]\NP

< ¹

N\N

< ⁰

nun

S[adj]\NP

...

(S[adj]\NP)\(S[adj]\NP)

S[adj]\NP

< ⁰

N\N

< ⁰

NP\NP

< ⁰

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

T ^>

“

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

T ^<

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

> ¹_×

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

> ¹_×

S[dcl]

< ⁰

–

„

NP/NP

Was

> ⁰

NP\NP

< ⁰

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

T ^>

“

(S[dcl]\NP)/NP

S[dcl]/NP

> ¹

N\N

< ⁰

–

NP/NP

„

(S[dcl]/S[dcl])/(S[dcl]/S[dcl])

Ach

S[dcl]/S[dcl]

> ⁰

(NP\NP)/NP

NP\NP

> ⁰

weißt

S[dcl]\NP

schon

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

S[dcl]\NP

< ⁰

S[dcl]\NP

< ¹

S[dcl]\S[dcl]

S[dcl]\NP

< ¹

S[dcl]\NP

> ¹_×

S[dcl]/NP

< ¹_×

“

S[dcl]

> ⁰

–

NP/NP

„

NP/NP

> ¹

Nein

S[dcl]/S[dcl]

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

S[dcl]/S[dcl]

< ⁰

das

NP\(NP/NP)

T ^<

weiß

(S[dcl]\NP)\NP

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

< ¹

ich

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

T ^>

nicht

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

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

> ¹_×

S[dcl]\(NP/NP)

< ¹

S[dcl]\(NP/NP)

> ¹_×

S[dcl]

< ⁰

S[dcl]\S[dcl]

S[dcl]

< ⁰

Sprich

NP/(NP\NP)

T ^>

dich

(S[dcl]\NP)/PR

aus

S[dcl]\NP

> ⁰

S[dcl]/(NP\NP)

< ¹_×

NP\NP

“

(NP\NP)\(NP\NP)

NP\NP

< ⁰

S[dcl]

> ⁰

–

N/N

„

N/N

> ⁰

NP/(NP\NP)

T ^>

(NP\NP)/NP

NP/NP

> ¹

zusammen

NP\NP

NP/NP

< ¹_×

NP\NP

NP/NP

< ¹_×

“

> ⁰

–

S[wq]/S[wq]

„

S[wq]/S[wq]

Wie

S[wq]

S[wq]\S[wq]

S[wq]

< ⁰

S[wq]

> ⁰

S[wq]

> ⁰

Tom

und

(NP\NP)/NP

ich

NP\NP

> ⁰

< ⁰

NP\NP

< ⁰

Quatsch

NP\NP

< ⁰

Wie

S[wq]/S[q]

kommst

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

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

> ⁰

denn

S[adj]\NP

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

T ^>

darauf

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

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

< ¹_×

S[q]/((S[b]\NP)\(S[adj]\NP))

> ¹

S[q]\S[q]

S[q]/((S[b]\NP)\(S[adj]\NP))

< ¹_×

“

(S[b]\NP)\(S[adj]\NP)

S[q]

> ⁰

S[wq]

> ⁰

 <div class="der">
<table class="constituent binaryrule" data-cat="S[dcl]">
<tr class="daughters">
<td class="daughter daughter-left"><table class="constituent lex" data-token="„" data-from="0" data-to="1" data-cat="(S[dcl]\NP)/NP">
<tr><td class="token">„</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 binaryrule" data-cat="S[dcl]\((S[dcl]\NP)/NP)">
<tr class="daughters">
<td class="daughter daughter-left"><table class="constituent lex" data-token="Seid" data-from="1" data-to="5" data-cat="S[dcl]/S[dcl]">
<tr><td class="token">Seid</td></tr>
<tr><td class="cat" tabindex="0">S[dcl]/S[dcl]</td></tr>
<tr><td class="span-swiper"> </td></tr>
</table></td>
<td class="daughter daughter-right"><table class="constituent binaryrule" data-cat="S[dcl]\((S[dcl]\NP)/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 binaryrule" data-cat="NP">
<tr class="daughters">
<td class="daughter daughter-left"><table class="constituent unaryrule" data-cat="NP">
<tr class="daughters"><td class="daughter daughter-only"><table class="constituent binaryrule" data-cat="N">
<tr class="daughters">
<td class="daughter daughter-left"><table class="constituent binaryrule" data-cat="N">
<tr class="daughters">
<td class="daughter daughter-left"><table class="constituent lex" data-token="Tom" data-from="6" data-to="9" data-cat="N">
<tr><td class="token">Tom</td></tr>
<tr><td class="cat" tabindex="0">N</td></tr>
<tr><td class="span-swiper"> </td></tr>
</table></td>
<td class="daughter daughter-right"><table class="constituent unaryrule" data-cat="N\N">
<tr class="daughters"><td class="daughter daughter-only"><table class="constituent binaryrule" data-cat="S[adj]\NP">
<tr class="daughters">
<td class="daughter daughter-left"><table class="constituent binaryrule" data-cat="NP\NP">
<tr class="daughters">
<td class="daughter daughter-left"><table class="constituent lex" data-token="und" data-from="10" data-to="13" data-cat="(NP\NP)/NP">
<tr><td class="token">und</td></tr>
<tr><td class="cat" tabindex="0">(NP\NP)/NP</td></tr>
<tr><td class="span-swiper"> </td></tr>
</table></td>
<td class="daughter daughter-right"><table class="constituent lex" data-token="du" data-from="14" data-to="16" 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 colspan="2" class="rulecat"><div class="rulecat">
<div class="cat">NP\NP</div>
<div class="rule" title="Forward Application">&gt; <sup>0</sup>
</div>
</div></td></tr>
</table></td>
<td class="daughter daughter-right"><table class="constituent lex" data-token="denn" data-from="17" data-to="21" data-cat="S[adj]\NP">
<tr><td class="token">denn</td></tr>
<tr><td class="cat" tabindex="0">S[adj]\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[adj]\NP</div>
<div class="rule" title="Backward Composition">&lt; <sup>1</sup>
</div>
</div></td></tr>
</table></td></tr>
<tr><td class="rulecat"><div class="rulecat">
<div class="cat">N\N</div>
<div class="rule" title="Type Changing">
									*
								</div>
</div></td></tr>
</table></td>
</tr>
<tr><td colspan="2" class="rulecat"><div class="rulecat">
<div class="cat">N</div>
<div class="rule" title="Backward Application">&lt; <sup>0</sup>
</div>
</div></td></tr>
</table></td>
<td class="daughter daughter-right"><table class="constituent unaryrule" data-cat="N\N">
<tr class="daughters"><td class="daughter daughter-only"><table class="constituent binaryrule" data-cat="S[adj]\NP">
<tr class="daughters">
<td class="daughter daughter-left"><table class="constituent lex" data-token="nun" data-from="22" data-to="26" data-cat="S[adj]\NP">
<tr><td class="token">nun</td></tr>
<tr><td class="cat" tabindex="0">S[adj]\NP</td></tr>
<tr><td class="span-swiper"> </td></tr>
</table></td>
<td class="daughter daughter-right"><table class="constituent lex" data-token="..." data-from="26" data-to="29" data-cat="(S[adj]\NP)\(S[adj]\NP)">
<tr><td class="token">...</td></tr>
<tr><td class="cat" tabindex="0">(S[adj]\NP)\(S[adj]\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[adj]\NP</div>
<div class="rule" title="Backward Application">&lt; <sup>0</sup>
</div>
</div></td></tr>
</table></td></tr>
<tr><td class="rulecat"><div class="rulecat">
<div class="cat">N\N</div>
<div class="rule" title="Type Changing">
									*
								</div>
</div></td></tr>
</table></td>
</tr>
<tr><td colspan="2" class="rulecat"><div class="rulecat">
<div class="cat">N</div>
<div class="rule" title="Backward Application">&lt; <sup>0</sup>
</div>
</div></td></tr>
</table></td></tr>
<tr><td class="rulecat"><div class="rulecat">
<div class="cat">NP</div>
<div class="rule" title="Type Changing">
									*
								</div>
</div></td></tr>
</table></td>
<td class="daughter daughter-right"><table class="constituent lex" data-token="?" data-from="29" data-to="30" data-cat="NP\NP">
<tr><td class="token">?</td></tr>
<tr><td class="cat" tabindex="0">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">NP</div>
<div class="rule" title="Backward Application">&lt; <sup>0</sup>
</div>
</div></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>&gt;</sup>
</div>
</div></td></tr>
</table></td>
<td class="daughter daughter-right"><table class="constituent unaryrule" data-cat="(S[dcl]\NP)\((S[dcl]\NP)/NP)">
<tr class="daughters"><td class="daughter daughter-only"><table class="constituent unaryrule" data-cat="NP">
<tr class="daughters"><td class="daughter daughter-only"><table class="constituent lex" data-token="“" data-from="30" data-to="31" data-cat="N">
<tr><td class="token">“</td></tr>
<tr><td class="cat" tabindex="0">N</td></tr>
<tr><td class="span-swiper"> </td></tr>
</table></td></tr>
<tr><td class="rulecat"><div class="rulecat">
<div class="cat">NP</div>
<div class="rule" title="Type Changing">
									*
								</div>
</div></td></tr>
</table></td></tr>
<tr><td class="rulecat"><div class="rulecat">
<div class="cat">(S[dcl]\NP)\((S[dcl]\NP)/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]\((S[dcl]\NP)/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[dcl]\((S[dcl]\NP)/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[dcl]</div>
<div class="rule" title="Backward Application">&lt; <sup>0</sup>
</div>
</div></td></tr>
</table> </div>
 <div class="der">
<table class="constituent unaryrule" data-cat="NP">
<tr class="daughters"><td class="daughter daughter-only"><table class="constituent binaryrule" data-cat="N">
<tr class="daughters">
<td class="daughter daughter-left"><table class="constituent lex" data-token="–" data-from="32" data-to="33" data-cat="N">
<tr><td class="token">–</td></tr>
<tr><td class="cat" tabindex="0">N</td></tr>
<tr><td class="span-swiper"> </td></tr>
</table></td>
<td class="daughter daughter-right"><table class="constituent unaryrule" data-cat="N\N">
<tr class="daughters"><td class="daughter daughter-only"><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 binaryrule" data-cat="NP">
<tr class="daughters">
<td class="daughter daughter-left"><table class="constituent binaryrule" data-cat="NP">
<tr class="daughters">
<td class="daughter daughter-left"><table class="constituent lex" data-token="„" data-from="34" data-to="35" data-cat="NP/NP">
<tr><td class="token">„</td></tr>
<tr><td class="cat" tabindex="0">NP/NP</td></tr>
<tr><td class="span-swiper"> </td></tr>
</table></td>
<td class="daughter daughter-right"><table class="constituent unaryrule" data-cat="NP">
<tr class="daughters"><td class="daughter daughter-only"><table class="constituent lex" data-token="Was" data-from="35" data-to="38" data-cat="N">
<tr><td class="token">Was</td></tr>
<tr><td class="cat" tabindex="0">N</td></tr>
<tr><td class="span-swiper"> </td></tr>
</table></td></tr>
<tr><td class="rulecat"><div class="rulecat">
<div class="cat">NP</div>
<div class="rule" title="Type Changing">
									*
								</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">&gt; <sup>0</sup>
</div>
</div></td></tr>
</table></td>
<td class="daughter daughter-right"><table class="constituent lex" data-token="?" data-from="38" data-to="39" data-cat="NP\NP">
<tr><td class="token">?</td></tr>
<tr><td class="cat" tabindex="0">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">NP</div>
<div class="rule" title="Backward Application">&lt; <sup>0</sup>
</div>
</div></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>&gt;</sup>
</div>
</div></td></tr>
</table></td>
<td class="daughter daughter-right"><table class="constituent lex" data-token="“" data-from="39" data-to="40" data-cat="(S[dcl]\NP)/NP">
<tr><td class="token">“</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">&gt; <sup>1</sup>
</div>
</div></td></tr>
</table></td></tr>
<tr><td class="rulecat"><div class="rulecat">
<div class="cat">N\N</div>
<div class="rule" title="Type Changing">
									*
								</div>
</div></td></tr>
</table></td>
</tr>
<tr><td colspan="2" class="rulecat"><div class="rulecat">
<div class="cat">N</div>
<div class="rule" title="Backward Application">&lt; <sup>0</sup>
</div>
</div></td></tr>
</table></td></tr>
<tr><td class="rulecat"><div class="rulecat">
<div class="cat">NP</div>
<div class="rule" title="Type Changing">
									*
								</div>
</div></td></tr>
</table> </div>
 <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]/NP">
<tr class="daughters">
<td class="daughter daughter-left"><table class="constituent lex" data-token="–" data-from="41" data-to="42" data-cat="NP/NP">
<tr><td class="token">–</td></tr>
<tr><td class="cat" tabindex="0">NP/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]/S[dcl]">
<tr class="daughters">
<td class="daughter daughter-left"><table class="constituent lex" data-token="„" data-from="43" data-to="44" data-cat="(S[dcl]/S[dcl])/(S[dcl]/S[dcl])">
<tr><td class="token">„</td></tr>
<tr><td class="cat" tabindex="0">(S[dcl]/S[dcl])/(S[dcl]/S[dcl])</td></tr>
<tr><td class="span-swiper"> </td></tr>
</table></td>
<td class="daughter daughter-right"><table class="constituent lex" data-token="Ach" data-from="44" data-to="47" data-cat="S[dcl]/S[dcl]">
<tr><td class="token">Ach</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]/S[dcl]</div>
<div class="rule" title="Forward Application">&gt; <sup>0</sup>
</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 binaryrule" data-cat="NP\NP">
<tr class="daughters">
<td class="daughter daughter-left"><table class="constituent lex" data-token="," data-from="47" data-to="48" data-cat="(NP\NP)/NP">
<tr><td class="token">,</td></tr>
<tr><td class="cat" tabindex="0">(NP\NP)/NP</td></tr>
<tr><td class="span-swiper"> </td></tr>
</table></td>
<td class="daughter daughter-right"><table class="constituent lex" data-token="du" data-from="49" data-to="51" 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 colspan="2" class="rulecat"><div class="rulecat">
<div class="cat">NP\NP</div>
<div class="rule" title="Forward Application">&gt; <sup>0</sup>
</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 lex" data-token="weißt" data-from="52" data-to="57" data-cat="S[dcl]\NP">
<tr><td class="token">weißt</td></tr>
<tr><td class="cat" tabindex="0">S[dcl]\NP</td></tr>
<tr><td class="span-swiper"> </td></tr>
</table></td>
<td class="daughter daughter-right"><table class="constituent lex" data-token="schon" data-from="58" data-to="63" data-cat="(S[dcl]\NP)\(S[dcl]\NP)">
<tr><td class="token">schon</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</div>
<div class="rule" title="Backward Application">&lt; <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="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="63" data-to="64" 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[dcl]/NP</div>
<div class="rule" title="Backward Crossed Composition">&lt; <sup>1</sup><sub>×</sub>
</div>
</div></td></tr>
</table></td>
<td class="daughter daughter-right"><table class="constituent lex" data-token="“" data-from="64" data-to="65" data-cat="NP">
<tr><td class="token">“</td></tr>
<tr><td class="cat" tabindex="0">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]</div>
<div class="rule" title="Forward Application">&gt; <sup>0</sup>
</div>
</div></td></tr>
</table> </div>
 <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 binaryrule" data-cat="NP/NP">
<tr class="daughters">
<td class="daughter daughter-left"><table class="constituent lex" data-token="–" data-from="66" data-to="67" data-cat="NP/NP">
<tr><td class="token">–</td></tr>
<tr><td class="cat" tabindex="0">NP/NP</td></tr>
<tr><td class="span-swiper"> </td></tr>
</table></td>
<td class="daughter daughter-right"><table class="constituent lex" data-token="„" data-from="68" data-to="69" data-cat="NP/NP">
<tr><td class="token">„</td></tr>
<tr><td class="cat" tabindex="0">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">NP/NP</div>
<div class="rule" title="Forward Composition">&gt; <sup>1</sup>
</div>
</div></td></tr>
</table></td>
<td class="daughter daughter-right"><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]/S[dcl]">
<tr class="daughters">
<td class="daughter daughter-left"><table class="constituent lex" data-token="Nein" data-from="69" data-to="73" data-cat="S[dcl]/S[dcl]">
<tr><td class="token">Nein</td></tr>
<tr><td class="cat" tabindex="0">S[dcl]/S[dcl]</td></tr>
<tr><td class="span-swiper"> </td></tr>
</table></td>
<td class="daughter daughter-right"><table class="constituent lex" data-token="," data-from="73" data-to="74" data-cat="(S[dcl]/S[dcl])\(S[dcl]/S[dcl])">
<tr><td class="token">,</td></tr>
<tr><td class="cat" tabindex="0">(S[dcl]/S[dcl])\(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]/S[dcl]</div>
<div class="rule" title="Backward Application">&lt; <sup>0</sup>
</div>
</div></td></tr>
</table></td>
<td class="daughter daughter-right"><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/NP)">
<tr class="daughters">
<td class="daughter daughter-left"><table class="constituent unaryrule" data-cat="NP\(NP/NP)">
<tr class="daughters"><td class="daughter daughter-only"><table class="constituent lex" data-token="das" data-from="75" data-to="78" 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">NP\(NP/NP)</div>
<div class="rule" title="Backward Type Raising">
									T <sup>&lt;</sup>
</div>
</div></td></tr>
</table></td>
<td class="daughter daughter-right"><table class="constituent lex" data-token="weiß" data-from="79" data-to="83" 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>
</tr>
<tr><td colspan="2" class="rulecat"><div class="rulecat">
<div class="cat">(S[dcl]\NP)\(NP/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 binaryrule" data-cat="S[dcl]\(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="ich" data-from="84" data-to="87" 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></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>&gt;</sup>
</div>
</div></td></tr>
</table></td>
<td class="daughter daughter-right"><table class="constituent lex" data-token="nicht" data-from="88" data-to="93" 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]\(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[dcl]\(NP/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/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[dcl]</div>
<div class="rule" title="Backward Application">&lt; <sup>0</sup>
</div>
</div></td></tr>
</table></td>
<td class="daughter daughter-right"><table class="constituent lex" data-token="." data-from="93" data-to="94" 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">&lt; <sup>0</sup>
</div>
</div></td></tr>
</table> </div>
 <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]/(NP\NP)">
<tr class="daughters">
<td class="daughter daughter-left"><table class="constituent unaryrule" data-cat="NP/(NP\NP)">
<tr class="daughters"><td class="daughter daughter-only"><table class="constituent unaryrule" data-cat="NP">
<tr class="daughters"><td class="daughter daughter-only"><table class="constituent lex" data-token="Sprich" data-from="95" data-to="101" data-cat="N">
<tr><td class="token">Sprich</td></tr>
<tr><td class="cat" tabindex="0">N</td></tr>
<tr><td class="span-swiper"> </td></tr>
</table></td></tr>
<tr><td class="rulecat"><div class="rulecat">
<div class="cat">NP</div>
<div class="rule" title="Type Changing">
									*
								</div>
</div></td></tr>
</table></td></tr>
<tr><td class="rulecat"><div class="rulecat">
<div class="cat">NP/(NP\NP)</div>
<div class="rule" title="Forward Type Raising">
									T <sup>&gt;</sup>
</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 lex" data-token="dich" data-from="102" data-to="106" data-cat="(S[dcl]\NP)/PR">
<tr><td class="token">dich</td></tr>
<tr><td class="cat" tabindex="0">(S[dcl]\NP)/PR</td></tr>
<tr><td class="span-swiper"> </td></tr>
</table></td>
<td class="daughter daughter-right"><table class="constituent lex" data-token="aus" data-from="107" data-to="110" data-cat="PR">
<tr><td class="token">aus</td></tr>
<tr><td class="cat" tabindex="0">PR</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 Application">&gt; <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\NP)</div>
<div class="rule" title="Backward Crossed Composition">&lt; <sup>1</sup><sub>×</sub>
</div>
</div></td></tr>
</table></td>
<td class="daughter daughter-right"><table class="constituent binaryrule" data-cat="NP\NP">
<tr class="daughters">
<td class="daughter daughter-left"><table class="constituent lex" data-token="!" data-from="110" data-to="111" data-cat="NP\NP">
<tr><td class="token">!</td></tr>
<tr><td class="cat" tabindex="0">NP\NP</td></tr>
<tr><td class="span-swiper"> </td></tr>
</table></td>
<td class="daughter daughter-right"><table class="constituent lex" data-token="“" data-from="111" data-to="112" data-cat="(NP\NP)\(NP\NP)">
<tr><td class="token">“</td></tr>
<tr><td class="cat" tabindex="0">(NP\NP)\(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">NP\NP</div>
<div class="rule" title="Backward Application">&lt; <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="Forward Application">&gt; <sup>0</sup>
</div>
</div></td></tr>
</table> </div>
 <div class="der">
<table class="constituent binaryrule" data-cat="NP">
<tr class="daughters">
<td class="daughter daughter-left"><table class="constituent binaryrule" data-cat="NP/NP">
<tr class="daughters">
<td class="daughter daughter-left"><table class="constituent binaryrule" data-cat="NP/NP">
<tr class="daughters">
<td class="daughter daughter-left"><table class="constituent binaryrule" data-cat="NP/NP">
<tr class="daughters">
<td class="daughter daughter-left"><table class="constituent unaryrule" data-cat="NP/(NP\NP)">
<tr class="daughters"><td class="daughter daughter-only"><table class="constituent unaryrule" data-cat="NP">
<tr class="daughters"><td class="daughter daughter-only"><table class="constituent binaryrule" data-cat="N">
<tr class="daughters">
<td class="daughter daughter-left"><table class="constituent lex" data-token="–" data-from="113" data-to="114" data-cat="N/N">
<tr><td class="token">–</td></tr>
<tr><td class="cat" tabindex="0">N/N</td></tr>
<tr><td class="span-swiper"> </td></tr>
</table></td>
<td class="daughter daughter-right"><table class="constituent binaryrule" data-cat="N">
<tr class="daughters">
<td class="daughter daughter-left"><table class="constituent lex" data-token="„" data-from="115" data-to="116" data-cat="N/N">
<tr><td class="token">„</td></tr>
<tr><td class="cat" tabindex="0">N/N</td></tr>
<tr><td class="span-swiper"> </td></tr>
</table></td>
<td class="daughter daughter-right"><table class="constituent lex" data-token="Na" data-from="116" data-to="118" data-cat="N">
<tr><td class="token">Na</td></tr>
<tr><td class="cat" tabindex="0">N</td></tr>
<tr><td class="span-swiper"> </td></tr>
</table></td>
</tr>
<tr><td colspan="2" class="rulecat"><div class="rulecat">
<div class="cat">N</div>
<div class="rule" title="Forward Application">&gt; <sup>0</sup>
</div>
</div></td></tr>
</table></td>
</tr>
<tr><td colspan="2" class="rulecat"><div class="rulecat">
<div class="cat">N</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">NP</div>
<div class="rule" title="Type Changing">
									*
								</div>
</div></td></tr>
</table></td></tr>
<tr><td class="rulecat"><div class="rulecat">
<div class="cat">NP/(NP\NP)</div>
<div class="rule" title="Forward Type Raising">
									T <sup>&gt;</sup>
</div>
</div></td></tr>
</table></td>
<td class="daughter daughter-right"><table class="constituent lex" data-token="," data-from="118" data-to="119" data-cat="(NP\NP)/NP">
<tr><td class="token">,</td></tr>
<tr><td class="cat" tabindex="0">(NP\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">NP/NP</div>
<div class="rule" title="Forward Composition">&gt; <sup>1</sup>
</div>
</div></td></tr>
</table></td>
<td class="daughter daughter-right"><table class="constituent lex" data-token="zusammen" data-from="120" data-to="128" data-cat="NP\NP">
<tr><td class="token">zusammen</td></tr>
<tr><td class="cat" tabindex="0">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">NP/NP</div>
<div class="rule" title="Backward Crossed Composition">&lt; <sup>1</sup><sub>×</sub>
</div>
</div></td></tr>
</table></td>
<td class="daughter daughter-right"><table class="constituent lex" data-token="!" data-from="128" data-to="129" data-cat="NP\NP">
<tr><td class="token">!</td></tr>
<tr><td class="cat" tabindex="0">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">NP/NP</div>
<div class="rule" title="Backward Crossed Composition">&lt; <sup>1</sup><sub>×</sub>
</div>
</div></td></tr>
</table></td>
<td class="daughter daughter-right"><table class="constituent lex" data-token="“" data-from="129" data-to="130" data-cat="NP">
<tr><td class="token">“</td></tr>
<tr><td class="cat" tabindex="0">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">NP</div>
<div class="rule" title="Forward Application">&gt; <sup>0</sup>
</div>
</div></td></tr>
</table> </div>
 <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="–" data-from="131" data-to="132" data-cat="S[wq]/S[wq]">
<tr><td class="token">–</td></tr>
<tr><td class="cat" tabindex="0">S[wq]/S[wq]</td></tr>
<tr><td class="span-swiper"> </td></tr>
</table></td>
<td class="daughter daughter-right"><table class="constituent binaryrule" data-cat="S[wq]">
<tr class="daughters">
<td class="daughter daughter-left"><table class="constituent lex" data-token="„" data-from="133" data-to="134" data-cat="S[wq]/S[wq]">
<tr><td class="token">„</td></tr>
<tr><td class="cat" tabindex="0">S[wq]/S[wq]</td></tr>
<tr><td class="span-swiper"> </td></tr>
</table></td>
<td class="daughter daughter-right"><table class="constituent binaryrule" data-cat="S[wq]">
<tr class="daughters">
<td class="daughter daughter-left"><table class="constituent lex" data-token="Wie" data-from="134" data-to="137" data-cat="S[wq]">
<tr><td class="token">Wie</td></tr>
<tr><td class="cat" tabindex="0">S[wq]</td></tr>
<tr><td class="span-swiper"> </td></tr>
</table></td>
<td class="daughter daughter-right"><table class="constituent lex" data-token="?" data-from="137" data-to="138" data-cat="S[wq]\S[wq]">
<tr><td class="token">?</td></tr>
<tr><td class="cat" tabindex="0">S[wq]\S[wq]</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[wq]</div>
<div class="rule" title="Backward Application">&lt; <sup>0</sup>
</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></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>
 <div class="der">
<table class="constituent binaryrule" data-cat="NP">
<tr class="daughters">
<td class="daughter daughter-left"><table class="constituent binaryrule" data-cat="NP">
<tr class="daughters">
<td class="daughter daughter-left"><table class="constituent unaryrule" data-cat="NP">
<tr class="daughters"><td class="daughter daughter-only"><table class="constituent lex" data-token="Tom" data-from="139" data-to="142" data-cat="N">
<tr><td class="token">Tom</td></tr>
<tr><td class="cat" tabindex="0">N</td></tr>
<tr><td class="span-swiper"> </td></tr>
</table></td></tr>
<tr><td class="rulecat"><div class="rulecat">
<div class="cat">NP</div>
<div class="rule" title="Type Changing">
									*
								</div>
</div></td></tr>
</table></td>
<td class="daughter daughter-right"><table class="constituent binaryrule" data-cat="NP\NP">
<tr class="daughters">
<td class="daughter daughter-left"><table class="constituent lex" data-token="und" data-from="143" data-to="146" data-cat="(NP\NP)/NP">
<tr><td class="token">und</td></tr>
<tr><td class="cat" tabindex="0">(NP\NP)/NP</td></tr>
<tr><td class="span-swiper"> </td></tr>
</table></td>
<td class="daughter daughter-right"><table class="constituent lex" data-token="ich" data-from="147" data-to="150" 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>
</tr>
<tr><td colspan="2" class="rulecat"><div class="rulecat">
<div class="cat">NP\NP</div>
<div class="rule" title="Forward Application">&gt; <sup>0</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="Backward Application">&lt; <sup>0</sup>
</div>
</div></td></tr>
</table></td>
<td class="daughter daughter-right"><table class="constituent lex" data-token="?" data-from="150" data-to="151" data-cat="NP\NP">
<tr><td class="token">?</td></tr>
<tr><td class="cat" tabindex="0">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">NP</div>
<div class="rule" title="Backward Application">&lt; <sup>0</sup>
</div>
</div></td></tr>
</table> </div>
 <div class="der">
<table class="constituent binaryrule" data-cat="NP">
<tr class="daughters">
<td class="daughter daughter-left"><table class="constituent unaryrule" data-cat="NP">
<tr class="daughters"><td class="daughter daughter-only"><table class="constituent lex" data-token="Quatsch" data-from="152" data-to="159" data-cat="N">
<tr><td class="token">Quatsch</td></tr>
<tr><td class="cat" tabindex="0">N</td></tr>
<tr><td class="span-swiper"> </td></tr>
</table></td></tr>
<tr><td class="rulecat"><div class="rulecat">
<div class="cat">NP</div>
<div class="rule" title="Type Changing">
									*
								</div>
</div></td></tr>
</table></td>
<td class="daughter daughter-right"><table class="constituent lex" data-token="!" data-from="159" data-to="160" data-cat="NP\NP">
<tr><td class="token">!</td></tr>
<tr><td class="cat" tabindex="0">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">NP</div>
<div class="rule" title="Backward Application">&lt; <sup>0</sup>
</div>
</div></td></tr>
</table> </div>
 <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="Wie" data-from="161" data-to="164" data-cat="S[wq]/S[q]">
<tr><td class="token">Wie</td></tr>
<tr><td class="cat" tabindex="0">S[wq]/S[q]</td></tr>
<tr><td class="span-swiper"> </td></tr>
</table></td>
<td class="daughter daughter-right"><table class="constituent binaryrule" data-cat="S[q]">
<tr class="daughters">
<td class="daughter daughter-left"><table class="constituent binaryrule" data-cat="S[q]/((S[b]\NP)\(S[adj]\NP))">
<tr class="daughters">
<td class="daughter daughter-left"><table class="constituent binaryrule" data-cat="S[q]/((S[b]\NP)\(S[adj]\NP))">
<tr class="daughters">
<td class="daughter daughter-left"><table class="constituent binaryrule" data-cat="S[q]/(S[b]\NP)">
<tr class="daughters">
<td class="daughter daughter-left"><table class="constituent lex" data-token="kommst" data-from="165" data-to="171" data-cat="(S[q]/(S[b]\NP))/NP">
<tr><td class="token">kommst</td></tr>
<tr><td class="cat" tabindex="0">(S[q]/(S[b]\NP))/NP</td></tr>
<tr><td class="span-swiper"> </td></tr>
</table></td>
<td class="daughter daughter-right"><table class="constituent lex" data-token="du" data-from="172" data-to="174" 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 colspan="2" class="rulecat"><div class="rulecat">
<div class="cat">S[q]/(S[b]\NP)</div>
<div class="rule" title="Forward Application">&gt; <sup>0</sup>
</div>
</div></td></tr>
</table></td>
<td class="daughter daughter-right"><table class="constituent binaryrule" data-cat="(S[b]\NP)/((S[b]\NP)\(S[adj]\NP))">
<tr class="daughters">
<td class="daughter daughter-left"><table class="constituent unaryrule" data-cat="(S[b]\NP)/((S[b]\NP)\(S[adj]\NP))">
<tr class="daughters"><td class="daughter daughter-only"><table class="constituent lex" data-token="denn" data-from="175" data-to="179" data-cat="S[adj]\NP">
<tr><td class="token">denn</td></tr>
<tr><td class="cat" tabindex="0">S[adj]\NP</td></tr>
<tr><td class="span-swiper"> </td></tr>
</table></td></tr>
<tr><td class="rulecat"><div class="rulecat">
<div class="cat">(S[b]\NP)/((S[b]\NP)\(S[adj]\NP))</div>
<div class="rule" title="Forward Type Raising">
									T <sup>&gt;</sup>
</div>
</div></td></tr>
</table></td>
<td class="daughter daughter-right"><table class="constituent lex" data-token="darauf" data-from="180" data-to="186" data-cat="(S[b]\NP)\(S[b]\NP)">
<tr><td class="token">darauf</td></tr>
<tr><td class="cat" tabindex="0">(S[b]\NP)\(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[b]\NP)/((S[b]\NP)\(S[adj]\NP))</div>
<div class="rule" title="Backward Crossed Composition">&lt; <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[q]/((S[b]\NP)\(S[adj]\NP))</div>
<div class="rule" title="Forward Composition">&gt; <sup>1</sup>
</div>
</div></td></tr>
</table></td>
<td class="daughter daughter-right"><table class="constituent lex" data-token="?" data-from="186" data-to="187" data-cat="S[q]\S[q]">
<tr><td class="token">?</td></tr>
<tr><td class="cat" tabindex="0">S[q]\S[q]</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[q]/((S[b]\NP)\(S[adj]\NP))</div>
<div class="rule" title="Backward Crossed Composition">&lt; <sup>1</sup><sub>×</sub>
</div>
</div></td></tr>
</table></td>
<td class="daughter daughter-right"><table class="constituent lex" data-token="“" data-from="187" data-to="188" data-cat="(S[b]\NP)\(S[adj]\NP)">
<tr><td class="token">“</td></tr>
<tr><td class="cat" tabindex="0">(S[b]\NP)\(S[adj]\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[q]</div>
<div class="rule" title="Forward Application">&gt; <sup>0</sup>
</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}{„}{(\catS[dcl]\?\catNP)/\catNP}{} \&
		\lexnode*{idm31}{Seid}{\catS[dcl]/\catS[dcl]}{} \&
		\lexnode*{idm77}{Tom}{\catN}{} \&
		\lexnode*{idm104}{und}{(\catNP\?\catNP)/\catNP}{} \&
		\lexnode*{idm116}{du}{\catNP}{} \&
		\lexnode*{idm124}{denn}{\catS[adj]\?\catNP}{} \&
		\lexnode*{idm146}{nun}{\catS[adj]\?\catNP}{} \&
		\lexnode*{idm156}{...}{(\catS[adj]\?\catNP)\?(\catS[adj]\?\catNP)}{} \&
		\lexnode*{idm170}{?}{\catNP\?\catNP}{} \&
		\lexnode*{idm194}{“}{\catN}{} \\
	};
	\binnode*{idm97}{idm104-cat}{idm116-cat}{\FC{0}}{\catNP\?\catNP}{}
	\binnode*{idm90}{idm97}{idm124-cat}{\BC{1}}{\catS[adj]\?\catNP}{}
	\unnode*{idm85}{idm90}{*}{\catN\?\catN}{}
	\binnode*{idm72}{idm77-cat}{idm85}{\BC{0}}{\catN}{}
	\binnode*{idm139}{idm146-cat}{idm156-cat}{\BC{0}}{\catS[adj]\?\catNP}{}
	\unnode*{idm134}{idm139}{*}{\catN\?\catN}{}
	\binnode*{idm67}{idm72}{idm134}{\BC{0}}{\catN}{}
	\unnode*{idm64}{idm67}{*}{\catNP}{}
	\binnode*{idm59}{idm64}{idm170-cat}{\BC{0}}{\catNP}{}
	\unnode*{idm52}{idm59}{\FTR}{\catS[dcl]/(\catS[dcl]\?\catNP)}{}
	\unnode*{idm191}{idm194-cat}{*}{\catNP}{}
	\unnode*{idm180}{idm191}{*}{(\catS[dcl]\?\catNP)\?((\catS[dcl]\?\catNP)/\catNP)}{}
	\binnode*{idm41}{idm52}{idm180}{\FXC{1}}{\catS[dcl]\?((\catS[dcl]\?\catNP)/\catNP)}{}
	\binnode*{idm20}{idm31-cat}{idm41}{\FXC{1}}{\catS[dcl]\?((\catS[dcl]\?\catNP)/\catNP)}{}
	\binnode*{idm3}{idm8-cat}{idm20}{\BC{0}}{\catS[dcl]}{}
\end{tikzpicture}\begin{tikzpicture}[ampersand replacement=\&]
	\matrix [column sep=9pt] at (0, 0) {
		\lexnode*{idm211}{–}{\catN}{} \&
		\lexnode*{idm248}{„}{\catNP/\catNP}{} \&
		\lexnode*{idm261}{Was}{\catN}{} \&
		\lexnode*{idm269}{?}{\catNP\?\catNP}{} \&
		\lexnode*{idm279}{“}{(\catS[dcl]\?\catNP)/\catNP}{} \\
	};
	\unnode*{idm258}{idm261-cat}{*}{\catNP}{}
	\binnode*{idm243}{idm248-cat}{idm258}{\FC{0}}{\catNP}{}
	\binnode*{idm238}{idm243}{idm269-cat}{\BC{0}}{\catNP}{}
	\unnode*{idm231}{idm238}{\FTR}{\catS[dcl]/(\catS[dcl]\?\catNP)}{}
	\binnode*{idm224}{idm231}{idm279-cat}{\FC{1}}{\catS[dcl]/\catNP}{}
	\unnode*{idm219}{idm224}{*}{\catN\?\catN}{}
	\binnode*{idm206}{idm211-cat}{idm219}{\BC{0}}{\catN}{}
	\unnode*{idm203}{idm206}{*}{\catNP}{}
\end{tikzpicture}\begin{tikzpicture}[ampersand replacement=\&]
	\matrix [column sep=9pt] at (0, 0) {
		\lexnode*{idm304}{–}{\catNP/\catNP}{} \&
		\lexnode*{idm328}{„}{(\catS[dcl]/\catS[dcl])/(\catS[dcl]/\catS[dcl])}{} \&
		\lexnode*{idm342}{Ach}{\catS[dcl]/\catS[dcl]}{} \&
		\lexnode*{idm373}{,}{(\catNP\?\catNP)/\catNP}{} \&
		\lexnode*{idm385}{du}{\catNP}{} \&
		\lexnode*{idm400}{weißt}{\catS[dcl]\?\catNP}{} \&
		\lexnode*{idm410}{schon}{(\catS[dcl]\?\catNP)\?(\catS[dcl]\?\catNP)}{} \&
		\lexnode*{idm424}{!}{\catS[dcl]\?\catS[dcl]}{} \&
		\lexnode*{idm434}{“}{\catNP}{} \\
	};
	\binnode*{idm321}{idm328-cat}{idm342-cat}{\FC{0}}{\catS[dcl]/\catS[dcl]}{}
	\binnode*{idm366}{idm373-cat}{idm385-cat}{\FC{0}}{\catNP\?\catNP}{}
	\binnode*{idm393}{idm400-cat}{idm410-cat}{\BC{0}}{\catS[dcl]\?\catNP}{}
	\binnode*{idm359}{idm366}{idm393}{\BC{1}}{\catS[dcl]\?\catNP}{}
	\binnode*{idm352}{idm359}{idm424-cat}{\BC{1}}{\catS[dcl]\?\catNP}{}
	\binnode*{idm314}{idm321}{idm352}{\FXC{1}}{\catS[dcl]\?\catNP}{}
	\binnode*{idm297}{idm304-cat}{idm314}{\BXC{1}}{\catS[dcl]/\catNP}{}
	\binnode*{idm292}{idm297}{idm434-cat}{\FC{0}}{\catS[dcl]}{}
\end{tikzpicture}\begin{tikzpicture}[ampersand replacement=\&]
	\matrix [column sep=9pt] at (0, 0) {
		\lexnode*{idm460}{–}{\catNP/\catNP}{} \&
		\lexnode*{idm470}{„}{\catNP/\catNP}{} \&
		\lexnode*{idm496}{Nein}{\catS[dcl]/\catS[dcl]}{} \&
		\lexnode*{idm506}{,}{(\catS[dcl]/\catS[dcl])\?(\catS[dcl]/\catS[dcl])}{} \&
		\lexnode*{idm547}{das}{\catNP}{} \&
		\lexnode*{idm555}{weiß}{(\catS[dcl]\?\catNP)\?\catNP}{} \&
		\lexnode*{idm583}{ich}{\catNP}{} \&
		\lexnode*{idm591}{nicht}{(\catS[dcl]\?\catNP)\?(\catS[dcl]\?\catNP)}{} \&
		\lexnode*{idm605}{.}{\catS[dcl]\?\catS[dcl]}{} \\
	};
	\binnode*{idm453}{idm460-cat}{idm470-cat}{\FC{1}}{\catNP/\catNP}{}
	\binnode*{idm489}{idm496-cat}{idm506-cat}{\BC{0}}{\catS[dcl]/\catS[dcl]}{}
	\unnode*{idm540}{idm547-cat}{*}{\catNP\?(\catNP/\catNP)}{}
	\binnode*{idm529}{idm540}{idm555-cat}{\BC{1}}{(\catS[dcl]\?\catNP)\?(\catNP/\catNP)}{}
	\unnode*{idm576}{idm583-cat}{\FTR}{\catS[dcl]/(\catS[dcl]\?\catNP)}{}
	\binnode*{idm567}{idm576}{idm591-cat}{\FXC{1}}{\catS[dcl]\?(\catS[dcl]\?\catNP)}{}
	\binnode*{idm520}{idm529}{idm567}{\BC{1}}{\catS[dcl]\?(\catNP/\catNP)}{}
	\binnode*{idm480}{idm489}{idm520}{\FXC{1}}{\catS[dcl]\?(\catNP/\catNP)}{}
	\binnode*{idm448}{idm453}{idm480}{\BC{0}}{\catS[dcl]}{}
	\binnode*{idm443}{idm448}{idm605-cat}{\BC{0}}{\catS[dcl]}{}
\end{tikzpicture}\begin{tikzpicture}[ampersand replacement=\&]
	\matrix [column sep=9pt] at (0, 0) {
		\lexnode*{idm640}{Sprich}{\catN}{} \&
		\lexnode*{idm655}{dich}{(\catS[dcl]\?\catNP)/\catPR}{} \&
		\lexnode*{idm667}{aus}{\catPR}{} \&
		\lexnode*{idm682}{!}{\catNP\?\catNP}{} \&
		\lexnode*{idm692}{“}{(\catNP\?\catNP)\?(\catNP\?\catNP)}{} \\
	};
	\unnode*{idm637}{idm640-cat}{*}{\catNP}{}
	\unnode*{idm630}{idm637}{\FTR}{\catNP/(\catNP\?\catNP)}{}
	\binnode*{idm648}{idm655-cat}{idm667-cat}{\FC{0}}{\catS[dcl]\?\catNP}{}
	\binnode*{idm621}{idm630}{idm648}{\BXC{1}}{\catS[dcl]/(\catNP\?\catNP)}{}
	\binnode*{idm675}{idm682-cat}{idm692-cat}{\BC{0}}{\catNP\?\catNP}{}
	\binnode*{idm616}{idm621}{idm675}{\FC{0}}{\catS[dcl]}{}
\end{tikzpicture}\begin{tikzpicture}[ampersand replacement=\&]
	\matrix [column sep=9pt] at (0, 0) {
		\lexnode*{idm748}{–}{\catN/\catN}{} \&
		\lexnode*{idm763}{„}{\catN/\catN}{} \&
		\lexnode*{idm773}{Na}{\catN}{} \&
		\lexnode*{idm781}{,}{(\catNP\?\catNP)/\catNP}{} \&
		\lexnode*{idm793}{zusammen}{\catNP\?\catNP}{} \&
		\lexnode*{idm803}{!}{\catNP\?\catNP}{} \&
		\lexnode*{idm813}{“}{\catNP}{} \\
	};
	\binnode*{idm758}{idm763-cat}{idm773-cat}{\FC{0}}{\catN}{}
	\binnode*{idm743}{idm748-cat}{idm758}{\FC{0}}{\catN}{}
	\unnode*{idm740}{idm743}{*}{\catNP}{}
	\unnode*{idm733}{idm740}{\FTR}{\catNP/(\catNP\?\catNP)}{}
	\binnode*{idm726}{idm733}{idm781-cat}{\FC{1}}{\catNP/\catNP}{}
	\binnode*{idm719}{idm726}{idm793-cat}{\BXC{1}}{\catNP/\catNP}{}
	\binnode*{idm712}{idm719}{idm803-cat}{\BXC{1}}{\catNP/\catNP}{}
	\binnode*{idm707}{idm712}{idm813-cat}{\FC{0}}{\catNP}{}
\end{tikzpicture}\begin{tikzpicture}[ampersand replacement=\&]
	\matrix [column sep=9pt] at (0, 0) {
		\lexnode*{idm827}{–}{\catS[wq]/\catS[wq]}{} \&
		\lexnode*{idm842}{„}{\catS[wq]/\catS[wq]}{} \&
		\lexnode*{idm857}{Wie}{\catS[wq]}{} \&
		\lexnode*{idm865}{?}{\catS[wq]\?\catS[wq]}{} \\
	};
	\binnode*{idm852}{idm857-cat}{idm865-cat}{\BC{0}}{\catS[wq]}{}
	\binnode*{idm837}{idm842-cat}{idm852}{\FC{0}}{\catS[wq]}{}
	\binnode*{idm822}{idm827-cat}{idm837}{\FC{0}}{\catS[wq]}{}
\end{tikzpicture}\begin{tikzpicture}[ampersand replacement=\&]
	\matrix [column sep=9pt] at (0, 0) {
		\lexnode*{idm889}{Tom}{\catN}{} \&
		\lexnode*{idm904}{und}{(\catNP\?\catNP)/\catNP}{} \&
		\lexnode*{idm916}{ich}{\catNP}{} \&
		\lexnode*{idm924}{?}{\catNP\?\catNP}{} \\
	};
	\unnode*{idm886}{idm889-cat}{*}{\catNP}{}
	\binnode*{idm897}{idm904-cat}{idm916-cat}{\FC{0}}{\catNP\?\catNP}{}
	\binnode*{idm881}{idm886}{idm897}{\BC{0}}{\catNP}{}
	\binnode*{idm876}{idm881}{idm924-cat}{\BC{0}}{\catNP}{}
\end{tikzpicture}\begin{tikzpicture}[ampersand replacement=\&]
	\matrix [column sep=9pt] at (0, 0) {
		\lexnode*{idm943}{Quatsch}{\catN}{} \&
		\lexnode*{idm951}{!}{\catNP\?\catNP}{} \\
	};
	\unnode*{idm940}{idm943-cat}{*}{\catNP}{}
	\binnode*{idm935}{idm940}{idm951-cat}{\BC{0}}{\catNP}{}
\end{tikzpicture}\begin{tikzpicture}[ampersand replacement=\&]
	\matrix [column sep=9pt] at (0, 0) {
		\lexnode*{idm967}{Wie}{\catS[wq]/\catS[q]}{} \&
		\lexnode*{idm1017}{kommst}{(\catS[q]/(\catS[b]\?\catNP))/\catNP}{} \&
		\lexnode*{idm1031}{du}{\catNP}{} \&
		\lexnode*{idm1067}{denn}{\catS[adj]\?\catNP}{} \&
		\lexnode*{idm1077}{darauf}{(\catS[b]\?\catNP)\?(\catS[b]\?\catNP)}{} \&
		\lexnode*{idm1091}{?}{\catS[q]\?\catS[q]}{} \&
		\lexnode*{idm1101}{“}{(\catS[b]\?\catNP)\?(\catS[adj]\?\catNP)}{} \\
	};
	\binnode*{idm1008}{idm1017-cat}{idm1031-cat}{\FC{0}}{\catS[q]/(\catS[b]\?\catNP)}{}
	\unnode*{idm1054}{idm1067-cat}{\FTR}{(\catS[b]\?\catNP)/((\catS[b]\?\catNP)\?(\catS[adj]\?\catNP))}{}
	\binnode*{idm1039}{idm1054}{idm1077-cat}{\BXC{1}}{(\catS[b]\?\catNP)/((\catS[b]\?\catNP)\?(\catS[adj]\?\catNP))}{}
	\binnode*{idm995}{idm1008}{idm1039}{\FC{1}}{\catS[q]/((\catS[b]\?\catNP)\?(\catS[adj]\?\catNP))}{}
	\binnode*{idm982}{idm995}{idm1091-cat}{\BXC{1}}{\catS[q]/((\catS[b]\?\catNP)\?(\catS[adj]\?\catNP))}{}
	\binnode*{idm977}{idm982}{idm1101-cat}{\FC{0}}{\catS[q]}{}
	\binnode*{idm962}{idm967-cat}{idm977}{\FC{0}}{\catS[wq]}{}
\end{tikzpicture}

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

Sentence

Parse

Translations