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  1. Deontic logic as a study of conditions of rationality in norm-related activities.Berislav Žarnić - 2016 - In Olivier Roy, Allard Tamminga & Malte Willer (eds.), Deontic Logic and Normative Systems. London, UK: College Publications. pp. 272-287.
    The program put forward in von Wright's last works defines deontic logic as ``a study of conditions which must be satisfied in rational norm-giving activity'' and thus introduces the perspective of logical pragmatics. In this paper a formal explication for von Wright's program is proposed within the framework of set-theoretic approach and extended to a two-sets model which allows for the separate treatment of obligation-norms and permission norms. The three translation functions connecting the language of deontic logic with the language (...)
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  • (1 other version)Deontic logic.Paul McNamara - 2010 - Stanford Encyclopedia of Philosophy.
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  • Obligation as weakest permission: A strongly complete axiomatization.Frederik van de Putte - 2016 - Review of Symbolic Logic 9 (2):370-379.
    In, a deontic logic is proposed which explicates the idea that a formulaφis obligatory if and only if it is the weakest permission. We give a sound and strongly complete, Hilbert style axiomatization for this logic. As a corollary, it is compact, contradicting earlier claims from Anglbergeret al.. In addition, we prove that our axiomatization is equivalent to Anglberger et al.’s infinitary proof system, and show that our results are robust w.r.t. certain changes in the underlying semantics.
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  • Pooling Modalities and Pointwise Intersection: Semantics, Expressivity, and Dynamics.Frederik Van De Putte & Dominik Klein - 2022 - Journal of Philosophical Logic 51 (3):485-523.
    We study classical modal logics with pooling modalities, i.e. unary modal operators that allow one to express properties of sets obtained by the pointwise intersection of neighbourhoods. We discuss salient properties of these modalities, situate the logics in the broader area of modal logics, establish key properties concerning their expressive power, discuss dynamic extensions of these logics and provide reduction axioms for the latter.
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