Infinitary Action Logic: Complexity, Models and Grammars |
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| Authors: | Wojciech Buszkowski Ewa Palka |
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| Affiliation: | (1) Faculty of Mathematics and Computer Science, Adam Mickiewicz University in Poznań Research Group on Mathematical Linguistics Rovira i Virgili University in Tarragona, Poland, Spain;(2) Faculty of Mathematics and Computer Science, Adam Mickiewicz University, Poznań, Poland |
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| Abstract: | Action logic of Pratt [21] can be presented as Full Lambek Calculus FL [14, 17] enriched with Kleene star *; it is equivalent to the equational theory of residuated Kleene algebras (lattices). Some results on axiom systems, complexity and models of this logic were obtained in [4, 3, 18]. Here we prove a stronger form of *-elimination for the logic of *-continuous action lattices and the  –completeness of the equational theories of action lattices of subsets of a finite monoid and action lattices of binary relations on a finite universe. We also discuss possible applications in linguistics. Presented by Jacek Malinowski |
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| Keywords: | Kleene algebra action algebra relation algebra categorial grammar |
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