A Construction of the Lie Algebra of a Lie Group in Isabelle/HOL

arXiv - CS - Logic in Computer Science Pub Date : 2024-07-27 DOI:arxiv-2407.19211

Richard Schmoetten, Jacques D. Fleuriot

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Abstract

This paper describes a formal theory of smooth vector fields, Lie groups and the Lie algebra of a Lie group in the theorem prover Isabelle. Lie groups are abstract structures that are composable, invertible and differentiable. They are pervasive as models of continuous transformations and symmetries in areas from theoretical particle physics, where they underpin gauge theories such as the Standard Model, to the study of differential equations and robotics. Formalisation of mathematics in an interactive theorem prover, such as Isabelle, provides strong correctness guarantees by expressing definitions and theorems in a logic that can be checked by a computer. Many libraries of formalised mathematics lack significant development of textbook material beyond undergraduate level, and this contribution to mathematics in Isabelle aims to reduce that gap, particularly in differential geometry. We comment on representational choices and challenges faced when integrating complex formalisations, such as smoothness of vector fields, with the restrictions of the simple type theory of HOL. This contribution paves the way for extensions both in advanced mathematics, and in formalisations in natural science.

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用 Isabelle/HOL 构建 Lie 群的 Lie 代数

本文描述了定理证明器 Isabelle 中的光滑向量场、李群和李群的李代数的形式理论。李群是可组合、可反转和可微分的抽象结构。作为连续变换和对称性的模型，它们在理论粒子物理学（它们是标准模型等规规理论的基础）、微分方程研究和机器人学等领域无处不在。在交互式定理证明器（如 Isabelle）中的数学形式化，通过用可由计算机检查的逻辑表达定义和定理，提供了强大的正确性保证。许多规范化数学图书馆都缺乏本科以上水平的教科书材料，而本论文对伊莎贝尔数学的贡献旨在缩小这一差距，尤其是在微分几何方面。我们评论了将复杂形式化（如向量场的平滑性）与 HOL 简单类型理论的限制相结合时所面临的表述选择和挑战。这一贡献为高等数学和自然科学形式化的扩展铺平了道路。

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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arXiv - CS - Logic in Computer Science

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