Bibliographic Details
| Title: |
Jacobian elliptic fibrations on K3s with a non‐symplectic automorphism of order 3. |
| Authors: |
Meira, Felipe Zingali1 (AUTHOR) f.zingali.meira@rug.nl |
| Source: |
Mathematische Nachrichten. May2025, Vol. 298 Issue 5, p1758-1788. 31p. |
| Subject Terms: |
*PICARD number, *AUTOMORPHISMS, *ALGEBRAIC surfaces, *SYMPLECTIC manifolds |
| Abstract: |
Let X$X$ be a K3 surface admitting a non‐symplectic automorphism σ$\sigma$ of order 3. Building on work by Garbagnati and Salgado, we classify the Jacobian elliptic fibrations on X$X$ with respect to the action of σ$\sigma$ on their fibers. If the fiber class of a Jacobian elliptic fibration on NS(X)$\operatorname{NS}(X)$ is fixed by σ$\sigma$, we determine the possible configurations of its singular fibers and present the equation for its generic fiber. When the Picard number of X$X$ is at least 12 and σ$\sigma$ acts trivially on NS(X)$\operatorname{NS}(X)$, we apply the Kneser–Nishiyama method to find its Jacobian elliptic fibrations up to J2$\mathcal {J}_2$‐equivalence. We use our method to classify them with respect to any non‐symplectic automorphism of order 3 in Aut(X)$\operatorname{Aut}(X)$. [ABSTRACT FROM AUTHOR] |
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