Extension of Gorenstein weighted projective 3-spaces and characterization of the primitive curves of their surface sections

Abstract

We investigate the Gorenstein weighted projective spaces of dimension 3. Given such a space P, our first focus is its maximal extension in its anticanonical model P ⊂ Pg+1, i.e., the variety Y⊂ Pg+1+r of largest dimension such that Y is not a cone and P is a linear section of Y. In [DS23] Thomas Dedieu and Edoardo Sernesi have computed the dimension of Y by cohomological computations on the canonical curves inside P. We give an explicit description of Y in the cases where it was not known. Next, we examine the general anticanonical divisors of P. These are K3 surfaces, not necessarily primitively polarized. We give a geometric characterization of the curve sections in their primitive polarization.