Final coalgebras and the Hennessy–Milner property

Annals of Pure and Applied Logic 138 (1):77-93 (2006)
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Abstract

The existence of a final coalgebra is equivalent to the existence of a formal logic with a set of formulas that has the Hennessy–Milner property of distinguishing coalgebraic states up to bisimilarity. This applies to coalgebras of any functor on the category of sets for which the bisimilarity relation is transitive. There are cases of functors that do have logics with the Hennessy–Milner property, but the only such logics have a proper class of formulas. The main theorem gives a representation of states of the final coalgebra as certain satisfiable sets of formulas. The key technical fact used is that any function between coalgebras that is truth-preserving and has a simple codomain must be a coalgebraic morphism

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10.1016/j.apal.2005.06.006

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Citations of this work

Non-wellfounded set theory.Lawrence S. Moss - 2008 - Stanford Encyclopedia of Philosophy.
Coalgerbraic Lindströom Theorems.Alexander Kurz & Yde Venema - 1998 - In Marcus Kracht, Maarten de Rijke, Heinrich Wansing & Michael Zakharyaschev (eds.), Advances in Modal Logic. CSLI Publications. pp. 292-309.
A Hennessy-Milner Property for Many-Valued Modal Logics.Michel Marti & George Metcalfe - 2014 - In Rajeev Goré, Barteld Kooi & Agi Kurucz (eds.), Advances in Modal Logic, Volume 10. CSLI Publications. pp. 407-420.

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References found in this work

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An introduction to modal logic: the Lemmon notes.E. J. Lemmon - 1977 - Oxford: Blackwell. Edited by Dana S. Scott.
Non-Well-Founded Sets.Peter Aczel - 1988 - Palo Alto, CA, USA: Csli Lecture Notes.

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