Deformations of hypersurfaces with non-constant Alexander polynomial

Abstract

Let X be an irreducible hypersurface in Pn of degree d≥ 3 with only isolated semi-weighted homogeneous singularities, such that exp(2π ik) is a zero of the Alexander polynomial. Then we show that the equianalytic deformation space of X is not T-smooth except for a finite list of triples (n,d,k). This result captures the very classical examples by B. Segre of families of degree 6m plane curves with 6m2, 7m2, 8m2 and 9m2 cusps, where m≥ 3. Moreover, we argue that many of the hypersurfaces with non-trivial Alexander polynomial are limits of constructions of hypersurfaces with not T-smooth deformation spaces. In many instances this description can be used to construct Alexander-equivalent Zariski pairs.