Computational paths - a weak groupoid

IF 0.7 4区数学 Q3 COMPUTER SCIENCE, THEORY & METHODS

Journal of Logic and Computation Pub Date : 2023-11-24 DOI:10.1093/logcom/exad071

Tiago M L de Veras, Arthur F Ramos, Ruy J G B de Queiroz, Anjolina G de Oliveira

引用次数: 0

Abstract

On the basis of a labelled deduction system (LND$_{ED-}$TRS), we demonstrate how to formalize the concept of computational paths (sequences of rewrites) as equalities between two terms of the same type. This has allowed us to carry out a formal counterpart to equality between paths which is dealt with in homotopy theory, but this time with an approach using the device of term-rewriting paths. Using such formal calculus dealing with paths, we construct the fundamental groupoid of a path-connected $ X $ type and we define the concept of isomorphism between types. Next, we show that the computational paths determine a weak category, which will be called $ \mathcal {C}_{paths} $. Finally, we show that the weak category $ \mathcal {C}_{paths} $ determines a weak groupoid.

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计算路径——一个弱群

在标记演绎系统(LND$_{ED-}$TRS)的基础上，我们演示了如何将计算路径(重写序列)的概念形式化为相同类型的两个项之间的等式。这使我们能够实现同伦理论中处理的路径间相等的形式化对应物，但这次使用了一种使用项重写路径的方法。利用这种处理路径的形式演算，构造了路径连通类型X的基本群，并定义了类型间同构的概念。接下来，我们将展示计算路径确定一个弱类别，它将被称为$ \mathcal {C}_{paths} $。最后，我们证明弱类别$ \mathcal {C}_{paths} $决定一个弱类群。

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

Journal of Logic and Computation 工程技术-计算机：理论方法

CiteScore

1.90

自引率

14.30%

发文量

审稿时长

6-12 weeks

期刊介绍： Logic has found application in virtually all aspects of Information Technology, from software engineering and hardware to programming and artificial intelligence. Indeed, logic, artificial intelligence and theoretical computing are influencing each other to the extent that a new interdisciplinary area of Logic and Computation is emerging. The Journal of Logic and Computation aims to promote the growth of logic and computing, including, among others, the following areas of interest: Logical Systems, such as classical and non-classical logic, constructive logic, categorical logic, modal logic, type theory, feasible maths.... Logical issues in logic programming, knowledge-based systems and automated reasoning; logical issues in knowledge representation, such as non-monotonic reasoning and systems of knowledge and belief; logics and semantics of programming; specification and verification of programs and systems; applications of logic in hardware and VLSI, natural language, concurrent computation, planning, and databases. The bulk of the content is technical scientific papers, although letters, reviews, and discussions, as well as relevant conference reviews, are included.