Identity in the Presence of Adjunction

Pub Date : 2024-08-22 DOI:10.1093/imrn/rnae166
Mateusz Stroiński
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Abstract

We develop a theory of adjunctions in semigroup categories, that is, monoidal categories without a unit object. We show that a rigid semigroup category is promonoidal, and thus one can naturally adjoin a unit object to it. This extends the previous results of Houston in the symmetric case, and addresses a question of his. It also extends the results in the non-symmetric case with additional finiteness assumptions, obtained by Benson–Etingof–Ostrik, Coulembier, and Ko–Mazorchuk–Zhang. We give an interpretation of these results using comonad cohomology, and, in the absence of finiteness conditions, using enriched traces of monoidal categories. As an application of our results, we give a characterization of finite tensor categories in terms of the finitary $2$-representation theory of Mazorchuk–Miemietz.
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兼容性中的身份认同
我们发展了半群范畴(即没有单位对象的单义范畴)中的邻接理论。我们证明了刚性半群范畴是原边范畴,因此可以自然地将一个单位对象邻接到它。这扩展了休斯顿之前在对称情况下的结果,并解决了他的一个问题。它还扩展了本森-埃廷戈夫-奥斯特里克、库伦比尔和科-马佐楚克-张在非对称情况下附加有限性假设的结果。我们用逗点同调对这些结果进行了解释,在没有有限性条件的情况下,我们用单义范畴的丰富迹线对这些结果进行了解释。作为我们结果的一个应用,我们给出了有限张量范畴在马佐楚克-米米兹的有限$2表示理论方面的特征。
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