Tarski语义的保守内延

Z. Majkic
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引用次数: 4

摘要

我们考虑了一阶逻辑(FOL)由Bealer的内涵抽象算子的扩展。当代对“内涵”一词的使用源于传统的逻辑弗雷格-罗素学说,即一个观念(逻辑公式)既具有外延,又具有内涵。尽管在表述上存在分歧,但人们普遍认为,一个概念的“外延”由该概念所适用的主体组成,而“内涵”由该概念所隐含的属性组成。从蒙太古的观点来看,一个观念的意义可以被看作是在不同可能世界中的特定延伸。在标准FOL的情况下,我们得到了一个交换同态图,它在每个给定的可能世界中都是有效的:从FOL语法的自由代数,到它的概念的内涵代数,然后依次到扩展关系代数(不同于圆柱代数)。然后,我们证明了这种组合符合塔斯基对这个可能世界中标准外延FOL的解释。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Conservative Intensional Extension of Tarski's Semantics
We considered an extension of the first-order logic (FOL) by Bealer's intensional abstraction operator. Contemporary use of the term "intension" derives from the traditional logical Frege-Russell doctrine that an idea (logic formula) has both an extension and an intension. Although there is divergence in formulation, it is accepted that the "extension" of an idea consists of the subjects to which the idea applies, and the "intension" consists of the attributes implied by the idea. From the Montague's point of view, the meaning of an idea can be considered as particular extensions in different possible worlds. In the case of standard FOL, we obtain a commutative homomorphic diagram, which is valid in each given possible world of an intensional FOL: from a free algebra of the FOL syntax, into its intensional algebra of concepts, and, successively, into an extensional relational algebra (different from Cylindric algebras). Then we show that this composition corresponds to the Tarski's interpretation of the standard extensional FOL in this possible world.
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