∞-Groupoid Generated by an Arbitrary Topological λ-Model

Log. J. IGPL Pub Date : 2021-04-16 DOI:10.1093/JIGPAL/JZAB015

Daniel O. Martínez-Rivillas, R. D. Queiroz

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引用次数: 6

Abstract

The lambda calculus is a universal programming language. It can represent the computable functions, and such offers a formal counterpart to the point of view of functions as rules. Terms represent functions and this allows for the application of a term/function to any other term/function, including itself. The calculus can be seen as a formal theory with certain pre-established axioms and inference rules, which can be interpreted by models. Dana Scott proposed the first non-trivial model of the extensional lambda calculus, known as $ D_{\infty }$, to represent the $\lambda $-terms as the typical functions of set theory, where it is not allowed to apply a function to itself. Here we propose a construction of an $\infty $-groupoid from any lambda model endowed with a topology. We apply this construction for the particular case $D_{\infty }$, and we see that the Scott topology does not provide enough information about the relationship between higher homotopies. This motivates a new line of research focused on the exploration of $\lambda $-models with the structure of a non-trivial $\infty $-groupoid to generalize the proofs of term conversion (e.g., $\beta $-equality, $\eta $-equality) to higher-proofs in $\lambda $-calculus.

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由任意拓扑λ-模型生成的∞-群

lambda演算是一种通用的编程语言。它可以表示可计算函数，这样就提供了函数作为规则的观点的正式对应物。术语代表函数，这允许将术语/函数应用于任何其他术语/函数，包括其本身。微积分可以看作是一种形式理论，具有某些预先建立的公理和推理规则，可以用模型来解释。达纳·斯科特提出了扩展λ演算的第一个非平凡模型，称为$ D_{\infty }$，将$\lambda $项表示为集合论的典型函数，其中不允许将函数应用于自身。在这里，我们提出了一个构造$\infty $ -groupoid的方法，该方法是由任意具有拓扑的lambda模型构造的。我们将这种构造应用于$D_{\infty }$这种特殊情况，我们看到Scott拓扑不能提供关于高同伦之间关系的足够信息。这激发了一条新的研究路线，专注于探索具有非平凡$\infty $ -groupoid结构的$\lambda $ -模型，将项转换的证明(例如，$\beta $ -相等，$\eta $ -相等)推广到$\lambda $ -微积分中的更高证明。

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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Log. J. IGPL

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