Construction of Nikulin configurations on some Kummer surfaces and applications

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 C, then X is a Kummer surface X=Km(B) where B is an Abelian surface determined by C. Let B be a generic Abelian surface having a polarization M with M2=k(k+1) (for k>0 an integer) and let X=Km(B) be the associated Kummer surface. To the natural Nikulin configuration C on X=Km(B), we associate another Nikulin configuration C'; we denote by B' the Abelian surface associated to C', so that we have also X=Km(B'). For k≥2 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 C, C', there exists a natural bi-double cover S 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.