Construction of Nikulin configurations on some Kummer surfaces and applications

TL;DR

This paper constructs and analyzes Nikulin configurations on Kummer surfaces derived from Abelian surfaces with specific polarizations, revealing non-isomorphic Abelian surfaces, automorphisms, and related surfaces of general type.

Contribution

It introduces a new construction of Nikulin configurations on Kummer surfaces and explores their geometric and automorphic properties, including the creation of a bi-double cover surface.

Findings

B and B' are not isomorphic for k ≥ 2.

Constructed an infinite order automorphism of the Kummer surface.

Identified a natural bi-double cover surface of general type.

Abstract

A Nikulin configuration is the data of $16$ disjoint smooth rational curves on a K3 surface. According to a well known result of Nikulin, if a K3 surface contains a Nikulin configuration $\mathcal{C}$, then $X$ is a Kummer surface $X=Km(B)$ where $B$ is an Abelian surface determined by $\mathcal{C}$. Let $B$ be a generic Abelian surface having a polarization $M$ with $M^{2}=k(k+1)$ (for $k>0$ an integer) and let $X=Km(B)$ be the associated Kummer surface. To the natural Nikulin configuration $\mathcal{C}$ on $X=Km(B)$, we associate another Nikulin configuration $\mathcal{C}'$; we denote by $B'$ the Abelian surface associated to $\mathcal{C}'$, so that we have also $X=Km(B')$. For $k\geq2$ we prove that $B$ and $B'$ are not isomorphic. We then construct an infinite order automorphism of the Kummer surface $X$ that occurs naturally from our situation. Associated to the two Nikulin configurations $\mathcal{C},$ $\mathcal{C}'$, there exists a natural bi-double cover $S\to X$, which is a surface of general type. We study this surface which is a Lagrangian surface in the sense of Bogomolov-Tschinkel, and for $k=2$ is a Schoen surface.