通过项链丰富类别的神经

arXiv - MATH - Category Theory Pub Date : 2024-08-19 DOI:arxiv-2408.10049

Arne Mertens

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引用次数: 0

摘要

我们介绍了从丰富范畴到简单集的颈神经函子，其中包括科迪埃的同调相干、卢里的微分级数和勒格里努的立方神经。研究表明，每一个立方神经都可以转移到 arXiv:2302.02484v2 的简单对象。在杜格和斯皮瓦克工作的基础上，我们给出了充分条件，在这些条件下可以更明确地描述颈项神经的左连接。作为应用，我们获得了 dg 神经和立方神经左接头的新颖而简单的表达式。

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Nerves of enriched categories via necklaces

We introduce necklicial nerve functors from enriched categories to simplicial sets, which include Cordier's homotopy coherent, Lurie's differential graded and Le Grignou's cubical nerves. It is shown that every necklicial nerve can be lifted to the templicial objects of arXiv:2302.02484v2. Building on the work of Dugger and Spivak, we give sufficient conditions under which the left-adjoint of a necklicial nerve can be described more explicitly. As an application, we obtain novel and simple expressions for the left-adjoints of the dg-nerve and cubical nerve.

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arXiv - MATH - Category Theory

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