Koszul duality and a classification of stable Weiss towers

arXiv - MATH - K-Theory and Homology Pub Date : 2024-09-02 DOI:arxiv-2409.01335
Connor Malin, Niall Taggart
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引用次数: 0

Abstract

We introduce a version of Koszul duality for categories, which extends the Koszul duality of operads and right modules. We demonstrate that the derivatives which appear in Weiss calculus (with values in spectra) form a right module over the Koszul dual of the category of vector spaces and orthogonal surjections, resolving conjectures of Arone--Ching and Espic. Using categorical Fourier transforms, we then classify Weiss towers. In particular, we describe the $n$-th polynomial approximation as a pullback of the $(n-1)$-st polynomial approximation along a ``generalized norm map''.
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科斯祖尔对偶性和稳定魏斯塔的分类
我们为范畴引入了一个科斯祖尔对偶性版本,它扩展了操作数和右模块的科斯祖尔对偶性。我们证明了韦斯微积分中出现的衍生物(在谱中有值)构成了向量空间和正交射影范畴的科斯祖尔对偶的右模块,解决了阿罗尼-程和埃斯皮克的猜想。利用分类傅立叶变换,我们对魏斯塔进行了分类。特别是,我们将 $n$-th 多项式近似描述为沿 "广义规范映射 "的 $(n-1)$-st 多项式近似的回拉。
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arXiv - MATH - K-Theory and Homology
arXiv - MATH - K-Theory and Homology
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