Reasoning from hypotheses in *-continuous action lattices

arXiv - MATH - Logic Pub Date : 2024-08-04 DOI:arxiv-2408.02118

Stepan L. Kuznetsov, Tikhon Pshenitsyn, Stanislav O. Speranski

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Abstract

The class of all $\ast$-continuous Kleene algebras, whose description includes an infinitary condition on the iteration operator, plays an important role in computer science. The complexity of reasoning in such algebras - ranging from the equational theory to the Horn one, with restricted fragments of the latter in between - was analyzed by Kozen (2002). This paper deals with similar problems for $\ast$-continuous residuated Kleene lattices, also called $\ast$-continuous action lattices, where the product operation is augmented by adding residuals. We prove that in the presence of residuals the fragment of the corresponding Horn theory with $\ast$-free hypotheses has the same complexity as the $\omega^\omega$ iteration of the halting problem, and hence is properly hyperarithmetical. We also prove that if only commutativity conditions are allowed as hypotheses, then the complexity drops down to $\Pi^0_1$ (i.e. the complement of the halting problem), which is the same as that for $\ast$-continuous Kleene algebras. In fact, we get stronger upper bound results: the fragments under consideration are translated into suitable fragments of infinitary action logic with exponentiation, and the upper bounds are obtained for the latter ones.

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从*连续作用网格中的假设推理

所有$\ast$-连续克莱因布拉的描述都包括迭代算子的无穷条件，这类布拉在计算机科学中发挥着重要作用。Kozen (2002)分析了在这类代数中推理的复杂性--从等式理论到霍恩理论，中间还有后者的有限片段。本文讨论了 $\ast$-continuous residuated Kleene lattices（也称为 $\ast$-continuous action lattices）的类似问题，其中乘积运算是通过添加残差来增强的。我们证明，在有残差的情况下，相应的无$\ast$假设的霍恩理论片段具有与停止问题的$\omega^\omega$迭代相同的复杂性，因此是适当的超算术的。我们还证明，如果只允许交换性条件作为假设，那么复杂度会下降到$/Pi^0_1$（即停止问题的补码），这与$/ast$-连续克莱因代数的复杂度相同。事实上，我们得到了更强的上界结果：所考虑的片段被转化为带指数化的无穷行动逻辑的合适片段，而上界是针对后一种片段得到的。

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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arXiv - MATH - Logic

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