Tricategorical Universal Properties Via Enriched Homotopy Theory

Adrian Miranda
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Abstract

We develop the theory of tricategorical limits and colimits, and show that they can be modelled up to biequivalence via certain homotopically well-behaved limits and colimits enriched over the monoidal model category $\mathbf{Gray}$ of $2$-categories and $2$-functors. This categorifies the relationship that bicategorical limits and colimits have with the so called `flexible' enriched limits in $2$-category theory. As examples, we establish the tricategorical universal properties of Kleisli constructions for pseudomonads, Eilenberg-Moore and Kleisli constructions for (op)monoidal pseudomonads, centre constructions for $\mathbf{Gray}$-monoids, and strictifications of bicategories and pseudo-double categories.
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通过丰富同调理论实现三类普遍属性
我们发展了三分类极限和列极限的理论,并证明它们可以通过某些在 2 元范畴和 2 元函数的单元模型范畴 $\mathbf{Gray}$ 上富集的同拓扑性良好的极限和列极限来建模到等价。这就把二分类极限和列极限与 2 元范畴理论中所谓 "灵活的 "丰富极限的关系归类了。作为例子,我们建立了假单子的克莱斯利构造、(开)单体假单子的艾伦伯格-摩尔和克莱斯利构造、$\mathbf{Gray}$-单体的中心构造以及二元范畴和伪二元范畴的严格化的三元通用性质。
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