A Fibrational Theory of First Order Differential Structures

arXiv - MATH - Category Theory Pub Date : 2024-09-09 DOI:arxiv-2409.05763
Matteo Capucci, Geoffrey S. H. Cruttwell, Neil Ghani, Fabio Zanasi
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Abstract

We develop a categorical framework for reasoning about abstract properties of differentiation, based on the theory of fibrations. Our work encompasses the first-order fragments of several existing categorical structures for differentiation, including cartesian differential categories, generalised cartesian differential categories, tangent categories, as well as the versions of these categories axiomatising reverse derivatives. We explain uniformly and concisely the requirements expressed by these structures, using sections of suitable fibrations as unifying concept. Our perspective sheds light on their similarities and differences, as well as simplifying certain constructions from the literature.
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一阶微分结构的振动理论
我们以纤维理论为基础,为推理微分的抽象属性建立了一个分类框架。我们的工作涵盖了现有的几种微分分类结构的一阶片段,包括笛卡尔微分范畴、广义笛卡尔微分范畴、切线范畴,以及这些范畴公理化反向导数的版本。我们使用合适纤维的截面作为统一概念,统一而精确地解释了这些结构所表达的要求。我们的观点揭示了它们的异同,并简化了文献中的某些构造。
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arXiv - MATH - Category Theory
arXiv - MATH - Category Theory
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Cyclic Segal Spaces Unbiased multicategory theory Multivariate functorial difference A Fibrational Theory of First Order Differential Structures A local-global principle for parametrized $\infty$-categories
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