K3 surfaces with two involutions and low Picard number

Pub Date : 2024-03-13 DOI:10.1007/s10711-024-00900-8

Dino Festi, Wim Nijgh, Daniel Platt

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Abstract

Let X be a complex algebraic K3 surface of degree 2d and with Picard number \(\rho \). Assume that X admits two commuting involutions: one holomorphic and one anti-holomorphic. In that case, \(\rho \ge 1\) when \(d=1\) and \(\rho \ge 2\) when \(d \ge 2\). For \(d=1\), the first example defined over \({\mathbb {Q}}\) with \(\rho =1\) was produced already in 2008 by Elsenhans and Jahnel. A K3 surface provided by Kondō, also defined over \({\mathbb {Q}}\), can be used to realise the minimum \(\rho =2\) for all \(d\ge 2\). In these notes we construct new explicit examples of K3 surfaces over the rational numbers realising the minimum \(\rho =2\) for \(d=2,3,4\). We also show that a nodal quartic surface can be used to realise the minimum \(\rho =2\) for infinitely many different values of d. Finally, we strengthen a result of Morrison by showing that for any even lattice N of rank \(1\le r \le 10\) and signature \((1,r-1)\) there exists a K3 surface Y defined over \({\mathbb {R}}\) such that \({{\,\textrm{Pic}\,}}Y_{\mathbb {C}}={{\,\textrm{Pic}\,}}Y \cong N\).

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具有两个渐开线和低皮卡数的 K3 曲面

让 X 是一个度数为 2d 的复代数 K3 曲面，皮卡数为 \(\rho \)。假设 X 有两个相交的卷积：一个全纯，一个反全纯。在这种情况下，当（d=1）时是\(\rho \ge 1\) ，当（d \ge 2\ ）时是\(\rho \ge 2\) 。对于（d=1），第一个定义在（{\mathbb {Q}}\) 上的（\rho =1）的例子是埃尔森汉斯（Elsenhans）和贾内尔（Jahnel）在2008年提出的。Kondō 提供的一个 K3 曲面也是在（{\mathbb {Q}} ）上定义的，可以用来实现所有（d\ge 2\ ）的最小（\rho =2）。在这些注释中，我们构造了新的有理数上K3曲面的明确例子，这些曲面在（d=2,3,4）时实现了最小值（\rho =2）。我们还证明了节点四元数曲面可以用来实现无穷多个不同 d 值的\(\rho =2\)最小值。最后，我们加强了莫里森的一个结果，证明对于任何秩（1\le r \le 10\ ）和签名（（1、r-1）存在一个定义在（{\mathbb {R}}）上的K3曲面Y，使得（{{\textrm{Pic}\,}Y_{mathbb {C}}={{\,\textrm{Pic}\,}}Y \cong N\ ）。

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