Full Development of Tarski's Geometry of Solids

IF 0.7 3区数学 Q1 LOGIC

Bulletin of Symbolic Logic Pub Date : 2008-12-01 DOI:10.2178/bsl/1231081462

Rafał Gruszczyński, A. Pietruszczak

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引用次数: 25

Abstract

Abstract In this paper we give probably an exhaustive analysis of the geometry of solids which was sketched by Tarski in his short paper [20, 21]. We show that in order to prove theorems stated in [20, 21] one must enrich Tarski's theory with a new postulate asserting that the universe of discourse of the geometry of solids coincides with arbitrary mereological sums of balls, i.e., with solids. We show that once having adopted such a solution Tarski's Postulate 4 can be omitted, together with its versions 4′ and 4″. We also prove that the equivalence of postulates 4, 4′ and 4″ is not provable in any theory whose domain contains objects other than solids. Moreover, we show that the concentricity relation as defined by Tarski must be transitive in the largest class of structures satisfying Tarski's axioms. We build a model (in three-dimensional Euclidean space) of the theory of so called T*-structures and present the proof of the fact that this is the only (up to isomorphism) model of this theory. Moreover, we propose different categorical axiomatizations of the geometry of solids. In the final part of the paper we answer the question concerning the logical status (within the theory of T*-structures) of the definition of the concentricity relation given by Tarski.

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塔斯基立体几何的全面发展

在本文中，我们可能给出了一个详尽的分析固体的几何，这是由塔尔斯基在他的短论文[20,21]勾画。我们证明，为了证明[20,21]中所述的定理，必须用一个新的假设来丰富Tarski的理论，该假设断言固体几何的话语域与球的任意流变和一致，即与固体一致。我们证明，一旦采用了这样的解，塔斯基的公设4可以被省略，连同它的版本4 '和4″。我们还证明了公设4、4′和4″的等价性在除固体以外的任何理论中都是不可证明的。此外，我们还证明了由塔斯基定义的同心性关系在满足塔斯基公理的最大结构类中必须是可传递的。我们建立了一个模型(在三维欧几里得空间)的理论，所谓的T*结构，并提出了这一事实的证明，这是唯一的(到同构)模型的理论。此外，我们提出了固体几何的不同范畴公理化。在本文的最后部分，我们回答了塔斯基关于同心性关系定义的逻辑地位问题(在T*结构理论中)。

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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来源期刊

Bulletin of Symbolic Logic 数学-数学

CiteScore

0.60

自引率

0.00%

发文量

审稿时长

>12 weeks

期刊介绍： The Bulletin of Symbolic Logic was established in 1995 by the Association for Symbolic Logic to provide a journal of high standards that would be both accessible and of interest to as wide an audience as possible. It is designed to cover all areas within the purview of the ASL: mathematical logic and its applications, philosophical and non-classical logic and its applications, history and philosophy of logic, and philosophy and methodology of mathematics.