Cut Elimination for Systems of Transparent Truth with Restricted Initial Sequents

Pub Date : 2020-06-14 DOI:10.1215/00294527-2021-0032
Carlo Nicolai
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引用次数: 2

Abstract

The paper studies a cluster of systems for fully disquotational truth based on the restriction of initial sequents. Unlike well-known alternative approaches, such systems display both a simple and intuitive model theory and remarkable proof-theoretic properties. We start by showing that, due to a strong form of invertibility of the truth rules, cut is eliminable in the systems via a standard strategy supplemented by a suitable measure of the number of applications of truth rules to formulas in derivations. Next, we notice that cut remains eliminable when suitable arithmetical axioms are added to the system. Finally, we establish a direct link between cut-free derivability in infinitary formulations of the systems considered and fixed-point semantics. Noticeably, unlike what happens with other background logics, such links are established without imposing any restriction to the premisses of the truth rules.
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具有受限初始序列的透明真系统的切消
本文研究了基于初始序列约束的一组完全无引文真值系统。与众所周知的替代方法不同,这种系统既具有简单直观的模型理论,又具有显著的证明理论性质。我们首先表明,由于真值规则的强可逆性形式,在系统中,通过一个标准策略,辅以对推导公式中真值规则的应用数量的适当度量,切割是可以消除的。接下来,我们注意到当适当的算术公理加入到系统中时,cut仍然是可消除的。最后,我们建立了所考虑的系统无穷公式的无割可导性与不动点语义之间的直接联系。值得注意的是,与其他背景逻辑不同,这种联系的建立没有对真理规则的前提施加任何限制。
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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