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- Yuya Matsumoto
- Department of Mathematics, Faculty of Science and Technology, Tokyo University of Science, Noda, Chiba, Japan
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説明
A K3 surface $X$ over a $p$-adic field $K$ is said to have good reduction if it admits a proper smooth model over the ring of integers of $K$. Assuming this, we say that a subgroup $G$ of $\mathrm{Aut}(X)$ is extendable if $X$ admits a proper smooth model equipped with $G$-action (compatible with the action on $X$). We show that $G$ is extendable if it is of finite order prime to $p$ and acts symplectically (that is, preserves the global $2$-form on $X$). The proof relies on birational geometry of models of K3 surfaces, and equivariant simultaneous resolutions of certain singularities. We also give some examples of non-extendable actions.
38 pages / v2: 33 pages, proofs in Section 3 simplified
収録刊行物
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- Mathematical Research Letters
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Mathematical Research Letters 30 (3), 821-863, 2023
International Press of Boston
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詳細情報 詳細情報について
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- CRID
- 1360021389808947072
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- ISSN
- 1945001X
- 10732780
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- 資料種別
- journal article
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