Convergence, Continuity and Recurrence in Dynamic Epistemic Logic

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In Alexandru Baltag, Jeremy Seligman & Tomoyuki Yamada (eds.), Logic, Rationality, and Interaction (LORI 2017, Sapporo, Japan). Springer. pp. 108-122 (2017)
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Abstract

The paper analyzes dynamic epistemic logic from a topological perspective. The main contribution consists of a framework in which dynamic epistemic logic satisfies the requirements for being a topological dynamical system thus interfacing discrete dynamic logics with continuous mappings of dynamical systems. The setting is based on a notion of logical convergence, demonstratively equivalent with convergence in Stone topology. Presented is a flexible, parametrized family of metrics inducing the latter, used as an analytical aid. We show maps induced by action model transformations continuous with respect to the Stone topology and present results on the recurrent behavior of said maps.

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10.1007/978-3-662-55665-8_8

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Author Profiles

Dominik Klein
Utrecht University
Rasmus K. Rendsvig
University of Copenhagen

Citations of this work

Collective Opinion as Tendency Towards Consensus.Chenwei Shi - 2020 - Journal of Philosophical Logic 50 (3):593-613.

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References found in this work

Logics of public communications.Jan Plaza - 2007 - Synthese 158 (2):165 - 179.
Dynamic logic for belief revision.Johan van Benthem - 2007 - Journal of Applied Non-Classical Logics 17 (2):129-155.

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