Mordell-Weil groups and Zariski triples

Abstract

We prove the existence of three irreducible curves C12,m of degree 12 with the same number of cusps and different Alexander polynomials. This exhibits a Zariski triple. Moreover we provide a set of generators for the elliptic threefold with constant j-invariant 0 and discriminant curve C12,m. Finally we consider general degree d base change of C12d,m and calculate the dimension of the equisingular deformation space.