Linguistics, Logic, and Finite Trees
Publication date
1993-12
Authors
Blackburn, P.
Meyer-Viol, W.
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Supervisors
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Document Type
Preprint
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Abstract
A modal logic is developed to deal with finite ordered binary trees as
they are used in (computational) linguistics. A modal language is introduced with operators for the 'mother of', 'first daughter of' and 'second
daughter of' relations together with their transitive reflexive closures. The
relevant class of tree models is defined and three linguistic applications of
this language are discussed: context free grammars, command relations, and trees decorated with feature structures. An axiomatic proof system
is given for which completeness is shown with respect to the class of finite
ordered binary trees. A number of decidability results follow.