Reichenbach量子力学逻辑的完整表演算

IF 0.7 1区 哲学 0 PHILOSOPHY
Pablo Caballero, Pablo Valencia
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引用次数: 0

摘要

1944年Hans Reichenbach发展了一个三值命题逻辑(RQML),以解释量子力学中的某些因果异常。在这种逻辑中,不确定的真值被赋予那些描述不能用因果关系理解的物理现象的陈述。然而,Reichenbach并没有为这种逻辑发展出演绎法。本文的目的是通过一级蕴涵逻辑(FDE)来发展这样一个演算,并证明它在RQML语义方面是健全和完整的。在第1节中,我们将解释RQML的主要物理和哲学动机。接下来,在第2节和第3节中,我们分别介绍RQML和FDE的语法和语义,并解释这两种逻辑之间的关系。第4节介绍\(\varvec{\mathcal {Q}}\)演算,这是一种基于fde的RQML表演算。在第5节中,我们证明\(\varvec{\mathcal {Q}}\)演算对于RQML三值语义是健全和完备的。最后,在第6节中,我们考虑\(\varvec{\mathcal {Q}}\)微积分的一些主要优点,并将其应用于Reichenbach对因果异常的分析。
本文章由计算机程序翻译,如有差异,请以英文原文为准。

A Sound and Complete Tableaux Calculus for Reichenbach’s Quantum Mechanics Logic

A Sound and Complete Tableaux Calculus for Reichenbach’s Quantum Mechanics Logic

In 1944 Hans Reichenbach developed a three-valued propositional logic (RQML) in order to account for certain causal anomalies in quantum mechanics. In this logic, the truth-value indeterminate is assigned to those statements describing physical phenomena that cannot be understood in causal terms. However, Reichenbach did not develop a deductive calculus for this logic. The aim of this paper is to develop such a calculus by means of First Degree Entailment logic (FDE) and to prove it sound and complete with respect to RQML semantics. In Section 1 we explain the main physical and philosophical motivations of RQML. Next, in Sections 2 and 3, respectively, we present RQML and FDE syntax and semantics and explain the relation between both logics. Section 4 introduces \(\varvec{\mathcal {Q}}\) calculus, an FDE-based tableaux calculus for RQML. In Section 5 we prove that \(\varvec{\mathcal {Q}}\) calculus is sound and complete with respect to RQML three-valued semantics. Finally, in Section 6 we consider some of the main advantages of \(\varvec{\mathcal {Q}}\) calculus and we apply it to Reichenbach’s analysis of causal anomalies.

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来源期刊
CiteScore
2.50
自引率
20.00%
发文量
43
期刊介绍: The Journal of Philosophical Logic aims to provide a forum for work at the crossroads of philosophy and logic, old and new, with contributions ranging from conceptual to technical.  Accordingly, the Journal invites papers in all of the traditional areas of philosophical logic, including but not limited to: various versions of modal, temporal, epistemic, and deontic logic; constructive logics; relevance and other sub-classical logics; many-valued logics; logics of conditionals; quantum logic; decision theory, inductive logic, logics of belief change, and formal epistemology; defeasible and nonmonotonic logics; formal philosophy of language; vagueness; and theories of truth and validity. In addition to publishing papers on philosophical logic in this familiar sense of the term, the Journal also invites papers on extensions of logic to new areas of application, and on the philosophical issues to which these give rise. The Journal places a special emphasis on the applications of philosophical logic in other disciplines, not only in mathematics and the natural sciences but also, for example, in computer science, artificial intelligence, cognitive science, linguistics, jurisprudence, and the social sciences, such as economics, sociology, and political science.
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