A Constructive Examination of a Russell-Style Ramified Type Theory

Pub Date : 2017-04-22 DOI:10.1017/bsl.2018.4
Erik Palmgren
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引用次数: 5

Abstract

In this paper we examine the natural interpretation of a ramified type hierarchy into Martin-L\"of type theory with an infinite sequence of universes. It is shown that under this predicative interpretation some useful special cases of Russell's reducibility axiom are valid, namely functional reducibility. This is sufficient to make the type hierarchy usable for development of constructive mathematics. We present a ramified type theory suitable for this purpose. One may regard the results of this paper as an alternative solution to the problems of Russell's theory, which avoids impredicativity, but instead imposes constructive logic. The intuitionistic ramified type theory introduced here, also suggests that there is a natural associated notion of predicative elementary topos.
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罗素式分支类型理论的建构性检验
本文研究了具有无限宇宙序列的分支型层次对类型论的马丁- l \ '的自然解释。在这种谓词解释下,证明了罗素可约性公理的一些有用的特例是成立的,即泛函可约性。这足以使类型层次可用于构造数学的发展。我们提出了一个适合于此目的的分支类型理论。人们可以将本文的结果视为罗素理论问题的另一种解决方案,它避免了不可预测性,而是施加了建设性的逻辑。这里介绍的直觉主义分支类型理论也表明,存在一个自然关联的谓词基本拓扑概念。
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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