Dynamic Epistemic Logic (DEL) is a logic that models information change in a multi-agent setting through the use of action models with pre- and post-conditions. In a recent work, DEL has been extended to first-order epistemic logic (DFOEL), with a proof that the resulting Epistemic Planning Problem is decidable, as long as action models pre- and post-conditions are non-modal and the first-order domain is finite. Our contribution highlights the role post-conditions have in DFOEL. We show that the Epistemic Planning Problem with possibly infinite first-order domains is undecidable if the non-modal event post-conditions may contain first-order quantifiers, while, on the contrary, the problem becomes decidable when event post-conditions are quantifier-free. The latter result is non-trivial and makes an extensive use of automatic structures.
翻译:动态理论(DEL)是一个逻辑,它通过使用带有先决条件和后期条件的动作模型,在多试剂环境中进行信息变化模型。在最近的一项工作中,DEL已扩展至第一阶缩写逻辑(DFOEL),并证明由此产生的孔径规划问题是可以破解的,只要行动模型前和后状态是非现代的,而第一阶域是有限的。我们的贡献凸显了后端条件在DFOEL中的作用。我们表明,如果非现代事件后状态可能包含第一阶的修饰符,那么如果非现代事件后状态可能包含第一阶的修饰符,那么,在事件后状态是没有限定的时,问题就会破解。后端结果是非三维的,并广泛使用自动结构。
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