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A modal proof theory for final polynomial coalgebras |
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| Authors: | David Friggens Robert Goldblatt |
| Affiliation: | aCentre for Logic, Language and Computation, Victoria University, P.O. Box 600, Wellington, New Zealand |
| Abstract: | An infinitary proof theory is developed for modal logics whose models are coalgebras of polynomial functors on the category of sets. The canonical model method from modal logic is adapted to construct a final coalgebra for any polynomial functor. The states of this final coalgebra are certain “maximal” sets of formulas that have natural syntactic closure properties. The syntax of these logics extends that of previously developed modal languages for polynomial coalgebras by adding formulas that express the “termination” of certain functions induced by transition paths. A completeness theorem is proven for the logic of functors which have the Lindenbaum property that every consistent set of formulas has a maximal extension. This property is shown to hold if the deducibility relation is generated by countably many inference rules. A counter-example to completeness is also given. This is a polynomial functor that is not Lindenbaum: it has an uncountable set of formulas that is deductively consistent but has no maximal extension and is unsatisfiable, even though all of its countable subsets are satisfiable. |
| Keywords: | Polynomial functor Final coalgebra Bisimulaton Modal logic Hennessy-Milner property Infinitary proof theory Inference rule Debucibility relation Maximally consistent set Canonical coalgebra Incompleteness Lindenbaum property |
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