We propose a cut-free cyclic system for Transitive Closure Logic (TCL) based on a form of hypersequents, suitable for automated reasoning via proof search. We show that previously proposed sequent systems are cut-free incomplete for basic validities from Kleene Algebra (KA) and Propositional Dynamic Logic (PDL), over standard translations. On the other hand, our system faithfully simulates known cyclic systems for KA and PDL, thereby inheriting their completeness results. A peculiarity of our system is its richer correctness criterion, exhibiting 'alternating traces' and necessitating a more intricate soundness argument than for traditional cyclic proofs.
翻译:我们建议为中转封闭逻辑(TCL)建立一个以高序列形式为基础的零碎循环系统(TCL),适合通过证据搜索进行自动推理。我们表明,先前提议的序列系统对于Kleene Algebra(KA)和Propositional Directive Locic(PDL)的基本有效性而言是完全不完全的。另一方面,我们的系统忠实地模拟KA和PDL已知的循环系统,从而继承其完整性结果。我们系统的一个特殊性是其更丰富的正确性标准,展示了“交替痕迹”和比传统的循环证据更复杂的正确性论点。
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