Propositional Logics Complexity and the Sub-Formula Property

Dialogues in cardiovascular medicine : DCM Pub Date : 2014-01-31 DOI:10.4204/EPTCS.179.1

E. Haeusler

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引用次数: 16

Abstract

In 1979 Richard Statman proved, using proof-theory, that the purely implicational fragment of Intuitionistic Logic (M-imply) is PSPACE-complete. He showed a polynomially bounded translation from full Intuitionistic Propositional Logic into its implicational fragment. By the PSPACE-completeness of S4, proved by Ladner, and the Goedel translation from S4 into Intuitionistic Logic, the PSPACE- completeness of M-imply is drawn. The sub-formula principle for a deductive system for a logic L states that whenever F1,...,Fk proves A, there is a proof in which each formula occurrence is either a sub-formula of A or of some of Fi. In this work we extend Statman result and show that any propositional (possibly modal) structural logic satisfying a particular formulation of the sub-formula principle is in PSPACE. If the logic includes the minimal purely implicational logic then it is PSPACE-complete. As a consequence, EXPTIME-complete propositional logics, such as PDL and the common-knowledge epistemic logic with at least 2 agents satisfy this particular sub-formula principle, if and only if, PSPACE=EXPTIME. We also show how our technique can be used to prove that any finitely many-valued logic has the set of its tautologies in PSPACE.

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命题逻辑复杂性与子公式性质

1979年，Richard Statman用证明理论证明了直觉逻辑的纯蕴涵片段(m -蕴涵)是pspace完备的。他展示了一个多项式有界的翻译，从完整的直觉命题逻辑到它的蕴涵片段。通过Ladner证明的S4的PSPACE-完备性，以及从S4到直觉逻辑的Goedel转换，给出了M-imply的PSPACE-完备性。逻辑L的演绎系统的子公式原理表明，每当F1，…，Fk证明了A，存在一个证明，其中每个公式要么是A的子公式要么是Fi的某个子公式。在这项工作中，我们推广了Statman结果，并证明了任何满足子公式原理的特定表述的命题(可能是模态)结构逻辑都在PSPACE中。如果逻辑包含最小的纯蕴涵逻辑，那么它是pspace完备的。因此，当且仅当PSPACE=EXPTIME时，EXPTIME完备的命题逻辑，如PDL和至少有2个智能体的公共知识认知逻辑满足这个特殊的子公式原则。我们还展示了如何使用我们的技术来证明任何有限多值逻辑在PSPACE中具有其重言式集。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Dialogues in cardiovascular medicine : DCM

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