Nodal rational curves on Enriques surfaces of base change type
Abstract
Using lattice theory, Hulek and Sch\"utt proved that for every m∈Z+ there exists a nine-dimensional family Fm of K3 surfaces covering Enriques surfaces having an elliptic pencil with a rational bisection of arithmetic genus m. We present a purely geometrical lattice free construction of these surfaces, that allows us to prove that generically the mentioned bisections are nodal. Moreover, we show that, for every m∈Z+, the very general Enriques surface covered by a K3 surface in Fm admits a countable set of nodal rational curves of arithmetic genus (4k2-4k+1)m+4k2-4k for every k∈Z+, that form a rank 8 subgroup of the automorphism group of the surface. As an application, we compute the linear class of the n-torsion multisection for every n∈N for a general rational elliptic surface.
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