| W04-0408 | well-formedness conditions for | XDG analyses | are determined by principles |
| W04-1510 | well-formedness conditions of | XDG analyses | are stipulated by principles |
| W04-1510 | thereby synchronizing them . An | XDG analysis | is licensed by Lex iff ( F1 ( |
| W04-0408 | her out . ( 3 ) We display the | XDG analysis | of ( 3 ) in ( 4 ) . Again , the |
| W06-0406 | , but the 1D components of an | XDG analysis | interact in fact . It is exactly |
| W04-0408 | thereby synchronizing them . An | XDG analysis | is licensed by Lex iff ( F1 ( |
| C04-1026 | semantic descriptions from partial | XDG analyses | . We will briefly demonstrate |
| C04-1026 | constrains all dimensions at once . An | XDG analysis | is licenced by Lex iff ( F1 ( |
| C04-1026 | formulas from fully specified | XDG analyses | to an extraction of underspecified |
| W06-0406 | synchronize all 1D components of an | XDG analysis | . Lexical synchronization is |
| J11-1003 | parametric principles . A feasible | XDG analysis | amounts to a labeled graph in |
| W04-1510 | principles Pri , and a lexicon Lex . An | XDG analysis | ( V , Ei , Fi ) n i = 1 is an |
| W06-0406 | figuring as one single node in | XDG analyses | as usual in spite of potentially |
| C04-1026 | principles Pri , and a lexicon Lex . An | XDG analysis | ( V , Ei , Fi ) ni = 1 is an |
| W04-0408 | principles Pri , and a lexicon Lex . An | XDG analysis | ( V , Ei , Fi ) ni = 1 is an |
| W06-0406 | holistic or multidimensional ) | XDG analysis | consists of a set of concurrent |
| C04-1026 | type-theoretic expression from an | XDG analysis | , we assign each node v two semantic |
| W06-0406 | Figure 2 presents a sample 5D | XDG analysis | involving the most standard dimensions |
