An $\infty$-Category of 2-Segal Spaces

Jonte Gödicke
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Abstract

Algebra objects in $\infty$-categories of spans admit a description in terms of $2$-Segal objects. We introduce a notion of span between $2$-Segal objects and extend this correspondence to an equivalence of $\infty$-categories. Additionally, for every $\infty$-category with finite limits $\mathcal{C}$, we introduce a notion of a birelative $2$-Segal object in $\mathcal{C}$ and establish a similar equivalence with the $\infty$-category of bimodule objects in spans. Examples of these concepts arise from algebraic and hermitian K-theory through the corresponding Waldhausen $S_{\bullet}$-construction. Apart from their categorical relevance, these concepts can be used to construct homotopy coherent representations of Hall algebras.
2-Segal空间的一个$infty$类别
跨度的$\infty$类中的代数对象可以用$2$-Segal对象来描述。此外,对于每一个具有有限极限$\mathcal{C}$的$\infty$类,我们引入了$\mathcal{C}$中的2$Segal对象的双向概念,并建立了与$\infty$类中的双模对象的类似等价关系。通过相应的瓦尔德豪森$S_{\bullet}$构造,这些概念的例子出现在代数理论和赫米特K理论中。除了它们的分类相关性之外,这些概念还可以用来构造霍尔代数的同调相干表示。
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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