无指向类别的代数 K0

Pub Date : 2024-05-25 DOI:10.1142/s0219498825502743

Felix Küng

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引用次数: 0

摘要

我们利用布雷津斯基（Brezinzki）最近提出的 "堆"（heaps）概念，构建了格罗内迪克群（Grothendieck group K0）的自然广义，使其适用于可能无指向的、允许推出的范畴。在一元范畴的情况下，定义的 K0 被证明是一个桁。结果表明，随着群沿着零对象的同构类缩回，这种构造概括了经典的无性类 K0。最后，我们将这一构造应用于构建整数的加法和乘法，作为有限集的解归类，并证明在这个 K0(Top̲) 中，我们可以将一个 CW 复数与它的单元的迭积相鉴别。

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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Algebraic K0 for unpointed categories

We construct a natural generalization of the Grothendieck group $K_{0}$ to the case of possibly unpointed categories admitting pushouts by using the concept of heaps recently introduced by Brezinzki. In case of a monoidal category, the defined K0 is shown to be a truss. It is shown that the construction generalizes the classical $K_{0}$ of an abelian category as the group retract along the isomorphism class of the zero object. We finish by applying this construction to construct the integers with addition and multiplication as the decategorification of finite sets and show that in this $K_{0} (\underset{̲}{Top})$ one can identify a CW-complex with the iterated product of its cells.

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