对直觉主义和其他否定的调查

Satoru Niki
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引用次数: 0

摘要

直观主义逻辑形式化了布朗尔的直观主义数学纲领的基本思想。它是最早的非经典逻辑之一,古典逻辑与直觉逻辑之间的区别可以解释为排中律,排中律主张命题为真或其否定为真。从建设性的观点来看,这一原则被认为是不可接受的,在建设性的观点中,对法律的理解意味着存在一个有效的程序来确定所有命题的真实性。这种对两种逻辑之间区别的理解支持了否定在直觉主义逻辑的形成中起着至关重要作用的观点。尽管如此,直觉主义逻辑中否定的形式化并没有被普遍接受,并且已经提出了许多关于否定的替代说法。一些人试图削弱或加强否定,而另一些人则积极支持不可能的否定推论。本文沿袭这一传统,探讨了直觉主义逻辑中否定的各个方面。首先,我们看一下H. Ishihara提出的一个问题,这个问题是通过假设非构造原理的原子类,如何有效地将经典定理的可演绎性保存到直觉逻辑中。本节给出的类在两个方面改进了K. Ishii先前给出的类:(a)不是排除中间定律的单一类,而是根据较弱的原则给出的两个类,允许更精细的分析;(b)守恒现在扩展到直觉逻辑的子系统,称为Glivenko逻辑。本节还讨论了将石原问题扩展到最小逻辑的问题。其次,我们研究了两种弱建设性否定框架,即D. Vakarelov的方法和A. Colacito、D. de Jongh和A. L. Vargas的次极小否定框架之间的关系。我们用后一种框架的语义捕捉了Vakarelov逻辑的一个版本,并阐明了这两个语义之间的关系。这也提供了证明理论的见解,这导致了上述系统的无切割序列演算的公式。第三,我们研究了用反直觉推理统一某些逻辑形式化的方法。该研究涉及R. Sylvan和A. B. Gordienko的副一致逻辑,以及G. Priest的共同否定逻辑和M. De和H. Omori的经验否定逻辑。以Sylvan系统为基本,给出了其他系统定义公理的框架条件。然后利用这些条件得到系统的无切割标记序演算。最后,我们考虑了L. Humberstone对于直觉逻辑的现实性算子,它可以看作是一个反直觉否定的二元化。给出了直觉逻辑与现实算子的竞争公理化,并对相关算子进行了比较。摘要由Satoru Niki准备。电子邮件:Satoru.Niki@rub.de
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Investigations into intuitionistic and other negations
Abstract Intuitionistic logic formalises the foundational ideas of L.E.J. Brouwer’s mathematical programme of intuitionism. It is one of the earliest non-classical logics, and the difference between classical and intuitionistic logic may be interpreted to lie in the law of the excluded middle, which asserts that either a proposition is true or its negation is true. This principle is deemed unacceptable from the constructive point of view, in whose understanding the law means that there is an effective procedure to determine the truth of all propositions. This understanding of the distinction between the two logics supports the view that negation plays a vital role in the formulation of intuitionistic logic. Nonetheless, the formalisation of negation in intuitionistic logic has not been universally accepted, and many alternative accounts of negation have been proposed. Some seek to weaken or strengthen the negation, and others actively supporting negative inferences that are impossible with it. This thesis follows this tradition and investigates various aspects of negation in intuitionistic logic. Firstly, we look at a problem proposed by H. Ishihara, which asks how effectively one can conserve the deducibility of classical theorems into intuitionistic logic, by assuming atomic classes of non-constructive principles. The classes given in this section improve a previous class given by K. Ishii in two respects: (a) instead of a single class for the law of the excluded middle, two classes are given in terms of weaker principles, allowing a finer analysis and (b) the conservation now extends to a subsystem of intuitionistic logic called Glivenko’s logic. This section also discusses the extension of Ishihara’s problem to minimal logic. Secondly, we study the relationship between two frameworks for weak constructive negation, the approach of D. Vakarelov on one hand and the framework of subminimal negation by A. Colacito, D. de Jongh, and A. L. Vargas on the other hand. We capture a version of Vakarelov’s logic with the semantics of the latter framework, and clarify the relationship between the two semantics. This also provides proof-theoretic insights, which results in the formulation of a cut-free sequent calculus for the aforementioned system. Thirdly, we investigate the ways to unify the formalisations of some logics with contra-intuitionistic inferences. The enquiry concerns paraconsistent logics by R. Sylvan and A. B. Gordienko, as well as the logic of co-negation by G. Priest and of empirical negation by M. De and H. Omori. We take Sylvan’s system as basic, and formulate the frame conditions of the defining axioms of the other systems. The conditions are then used to obtain cut-free labelled sequent calculi for the systems. Finally, we consider L. Humberstone’s actuality operator for intuitionistic logic, which can be seen as the dualisation of a contra-intuitionistic negation. A compete axiomatisation of intuitionistic logic with actuality operator is given, and comparisons are made for some related operators. Abstract prepared by Satoru Niki. E-mail: Satoru.Niki@rub.de
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