Models for the common knowledge logic

Abstract

In this paper, we discuss models of the common knowledge logic. The common knowledge logic is a multi-modal logic that includes the modal operators Ki (i∈I, where I is a finite set of agents) and C in the language. The intended meanings of Kiφ (i∈I) and Cφ are ''the agent i knows φ'' (i∈I) and ''φ is common knowledge among I'', respectively. Semantically, this can be expressed as follows: Cφ is true if and only if all of φ, Eφ, E2φ, E3φ,… are true, where Eφ=i∈IKiφ. A Kripke frame that satisfies the condition is W,RKi (i∈I), RC, where RC is the reflexive and transitive closure of RE=i∈IRKi. We refer to such Kripke frames as CKL-frames. An algebra that satisfies the condition is a modal algebra with modal operators Ki (i∈I) and C, which satisfies that Cx≤ x, C x≤EC x, and C x is the greatest lower bound of the set \En x n∈ω\, where E x=i∈I Ki x. We refer to such modal algebras as CKL-algebras. In this paper, we show that the class of CKL-frames is modally definable, whereas the class of CKL-algebras is not. That is, the class of CKL-algebras does not form a variety, and there exists a modal algebra in which the common knowledge logic is valid, but Cx is not the greatest lower bound of the set \En x n∈ω\.

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