迈向刚性解析空间的 $\mathbb{A}^1$ 同调理论

arXiv - MATH - K-Theory and Homology Pub Date : 2024-07-12 DOI:arxiv-2407.09606

Christian Dahlhausen, Can Yaylali

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引用次数: 0

摘要

对于任何刚性解析空间（在藤原-加藤的意义上），我们都会分配一个在任何可呈现范畴中具有系数的$mathbb{A}^1$不变刚性解析同调范畴。我们展示了这个赋值作为刚性解析空间范畴上的一个函子的一些函子性质。此外，我们通过唤起阿尤布（Ayoub）的论题，证明了与分析化函子的前组合存在一个完整的六函子形式主义。作为应用，我们用$\mathbb{Z}\times\mathrm{BGL}$和连通代数K理论的分析化来识别不稳定同调范畴中的连通分析K理论。因此，我们得到了光凝聚谱中系数的可表示性声明。

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Towards $\mathbb{A}^1$-homotopy theory of rigid analytic spaces

To any rigid analytic space (in the sense of Fujiwara-Kato) we assign an $\mathbb{A}^1$-invariant rigid analytic homotopy category with coefficients in any presentable category. We show some functorial properties of this assignment as a functor on the category of rigid analytic spaces. Moreover, we show that there exists a full six functor formalism for the precomposition with the analytification functor by evoking Ayoub's thesis. As an application, we identify connective analytic K-theory in the unstable homotopy category with both $\mathbb{Z}\times\mathrm{BGL}$ and the analytification of connective algebraic K-theory. As a consequence, we get a representability statement for coefficients in light condensed spectra.

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arXiv - MATH - K-Theory and Homology

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