On the logarithmic slice filtration

arXiv - MATH - K-Theory and Homology Pub Date : 2024-03-05 DOI:arxiv-2403.03056
Federico Binda, Doosung Park, Paul Arne Østvær
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引用次数: 0

Abstract

We consider slice filtrations in logarithmic motivic homotopy theory. Our main results establish conjectured compatibilities with the Beilinson, BMS, and HKR filtrations on (topological, log) Hochschild homology and related invariants. In the case of perfect fields admitting resolution of singularities, the motivic trace map is compatible with the slice and BMS filtrations, yielding a natural morphism from the motivic Atiyah-Hirzerbruch spectral sequence to the BMS spectral sequence. Finally, we consider the Kummer \'etale hypersheafification of logarithmic $K$-theory and show that its very effective slices compute Lichtenbaum \'etale motivic cohomology.
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关于对数切片过滤
我们考虑对数动机同调理论中的切片滤波。我们的主要结果建立了猜想中的与(拓扑,对数)霍希尔德同调及相关变量上的贝林森、BMS 和HKR filtrations 的兼容性。在完备场允许解析奇异性的情况下,动机迹图与切片和 BMS filtrations 兼容,从而产生了从动机 Atiyah-Hirzerbruch 光谱序列到 BMS 光谱序列的自然变形。最后,我们考虑了对数 $K$ 理论的 Kummer\'etale hypersheafification,并证明其非常有效切片计算 Lichtenbaum \'etale motivic cohomology。
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arXiv - MATH - K-Theory and Homology
arXiv - MATH - K-Theory and Homology
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