一个概率时间认知逻辑:可决性

Pub Date : 2023-09-04 DOI:10.1093/jigpal/jzac080
Zoran Ognjanović, Angelina Ilić Stepić, Aleksandar Perović
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引用次数: 0

摘要

摘要研究了一个命题概率时间认知逻辑$\textbf {PTEL}$,该逻辑具有未来和过去时间算子,具有非刚性的智能体集合,以及智能体知识和共同知识的算子,概率定义在运行集和可能世界集上。语义由类${\scriptsize{\rm Mod}}$提供,该类具有可能世界的类kripke模型。通过证明${\scriptsize{\rm Mod}}$中一个公式的可满足性等价于${\scriptsize{\rm Mod}}$中一个公式的可满足性,证明了$\textbf {PTEL}$的可判定性。同样的过程可以应用于所有同步${\scriptsize{\rm Mod}}$-models的类。我们给出了${\scriptsize{\rm Mod}}$的可满足性问题的一个上复杂度界。
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A probabilistic temporal epistemic logic: Decidability
Abstract We study a propositional probabilistic temporal epistemic logic $\textbf {PTEL}$ with both future and past temporal operators, with non-rigid set of agents and the operators for agents’ knowledge and for common knowledge and with probabilities defined on the sets of runs and on the sets of possible worlds. A semantics is given by a class ${\scriptsize{\rm Mod}}$ of Kripke-like models with possible worlds. We prove decidability of $\textbf {PTEL}$ by showing that checking satisfiability of a formula in ${\scriptsize{\rm Mod}}$ is equivalent to checking its satisfiability in a finite set of finitely representable structures. The same procedure can be applied to the class of all synchronous ${\scriptsize{\rm Mod}}$-models. We give an upper complexity bound for the satisfiability problem for ${\scriptsize{\rm Mod}}$.
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