各向同性动力类别中的细胞对象

Geometry & Topology Pub Date : 2021-02-09 DOI:10.2140/gt.2023.27.2013

Fabio Tanania

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引用次数: 2

摘要

我们的主要目的是描述柔性场上各向同性细胞光谱的类别。在[6]的指导下，我们证明了它作为一个具有$t$ -结构的稳定$\infty$ -范畴，等价于经典拓扑Steenrod代数对偶上左模的派生范畴。为了得到这一结果，还研究了各向同性元胞模在动力Brown-Peterson谱上的类别，并建立了各向同性Adams和Adams- novikov谱序列。因此，我们还计算了各向同性胞谱动机之间各向同性泰特动机类别中的家集。

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Cellular objects in isotropic motivic categories

Our main purpose is to describe the category of isotropic cellular spectra over flexible fields. Guided by [6], we show that it is equivalent, as a stable $\infty$-category equipped with a $t$-structure, to the derived category of left comodules over the dual of the classical topological Steenrod algebra. In order to obtain this result, the category of isotropic cellular modules over the motivic Brown-Peterson spectrum is also studied, and isotropic Adams and Adams-Novikov spectral sequences are developed. As a consequence, we also compute hom sets in the category of isotropic Tate motives between motives of isotropic cellular spectra.

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Geometry & Topology

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