Infinitary S5‐Epistemic Logic

Mathematical Logic Quarterly 43 (3):333-342 (1997)
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Abstract

It is known that a theory in S5‐epistemic logic with several agents may have numerous models. This is because each such model specifies also what an agent knows about infinite intersections of events, while the expressive power of the logic is limited to finite conjunctions of formulas. We show that this asymmetry between syntax and semantics persists also when infinite conjunctions (up to some given cardinality) are permitted in the language. We develop a strengthened S5‐axiomatic system for such infinitary logics, and prove a strong completeness theorem for them. Then we show that in every such logic there is always a theory with more than one model.

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10.1002/malq.19970430306

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Citations of this work

Iterative and fixed point common belief.Aviad Heifetz - 1999 - Journal of Philosophical Logic 28 (1):61-79.
Strong Completeness Theorems for Weak Logics of Common Belief.Lismont Luc & Mongin Philippe - 2003 - Journal of Philosophical Logic 32 (2):115-137.

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References found in this work

Modal Logic: An Introduction.Brian F. Chellas - 1980 - New York: Cambridge University Press.
A companion to modal logic.G. E. Hughes - 1984 - New York: Methuen. Edited by M. J. Cresswell.
Modal Logic. An Introduction.Zia Movahed - 2002 - Tehran: Hermes Publishers.

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